tag:blogger.com,1999:blog-65271486031926372262024-03-13T08:34:45.129-05:007 GuitarrasTodo sobre Guitarras!! amplificadores, ejercicios, lecciones, ...Unknownnoreply@blogger.comBlogger154125tag:blogger.com,1999:blog-6527148603192637226.post-87559551268780885922021-09-25T01:10:00.004-05:002021-09-25T01:13:53.808-05:007 Guitarras de bajo presupuesto - Parte 1<p><span> </span>Hola amigos de 7 guitarras, en el articulo de hoy vamos a revisar algunas de las mejores guitarras de bajo presupuesto que hay en el mercado actualmente.</p><p>Gracias a la tecnologia y la mejora de los procesos de produccion las guitarras creadas en serie han mejorado mucho su calidad, comparandose con algunas de las mejores guitarras de hace unos 20 años. En el pasado era común desconfiar de las guitarras de bajo presupuesto, ya que estás siempre tenían algun desperfecto o problema, ahora esos problemas son muy raros de encontrar ya que las líneas de producción de guitarras han mejorado mucho.</p><p>En los últimos años incluso grandes marcas del mundo de las guitarras subcontratan fabricas para que estas fabriquen sus guitarras. Muchas de estás fabricas aprovechan sus equipos y maquinas para fabricar sus propias guitarras, que prácticamente son las mismas que las de otras grandes marcas, excepto que no tienen el logo y la públicidad, pero sí un precio más bajo. La principal diferencia en la mayoría de casos es la electronica de las guitarras, pero esto es algo en lo que nuestro luthier nos puede ayudar, o si eres habil con el cautín y soldando pues es un buen proyecto de fin de semana.</p><h1 style="text-align: left;">LyxPro - Telecaster </h1><div style="text-align: left;"><img alt="Lyxpro telecaster" height="170" 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" title="Lyxpro telecaster" width="400" /><br /> </div><div style="text-align: center;"> </div><div style="text-align: left;"> Las guitarras de LyxPro en su mayoría son de buena calidad y tienen buenas criticas, pero esta copia de Telecaster es la mejor de todas las LyxPro, el precio es de alrededor de $100 - $150. Se encuentra en el primer lugar de esta lista ya que la relación calidad precio es excelente, no necesita mejoras en la electronica, y el sonido de las pastillas es espectacular. Ademas de todo esto, esta guitarra ha sido la última en añadirse a mi colección de guitarras, y estoy muy feliz con ella.</div><div style="text-align: left;"><span style="font-size: medium;"><b><br /></b></span></div><div style="text-align: left;"><span style="font-size: small;"><b><a href="https://amzn.to/3u8ASL8" target="_blank">Enlace de compra en Amazon - LINK</a></b></span></div><div style="text-align: left;"><b> </b></div><div style="text-align: left;"><b> </b></div><div style="text-align: left;"><h1 style="text-align: left;"><b> IYV - ITF400</b></h1><h1 style="text-align: left;"><b><img alt="IYV ITF 400" height="173" 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" title="IYV ITF 400" width="400" /></b></h1></div><div style="text-align: left;"><div style="text-align: left;"><span class="a-size-large product-title-word-break" id="productTitle"> </span></div><div style="text-align: left;"><span class="a-size-large product-title-word-break" id="productTitle">Esta es otra de las guitarras de bajo presupuesto que me encantan, igua la la anterior no es necesario modificar la electronica y las pastillas que incluye son excelentes. Las pastillas son unas </span><span class="a-size-large product-title-word-break" id="productTitle"><span class="cr-widget-FocalReviews" data-hook="cr-widget-FocalReviews"><span class="a-size-base review-text" data-hook="review-body"><span class="cr-original-review-content">P90s, las cuales son un poco inusuales para guitarras de bajo presupuesto, estas poseen un sonido mucho más brillante que las single coil normales. Ademas al ser una especie de semi hueca con sus dos efes, el peso de la guitarra se reduce mucho, y la hace una guitarra muy comoda. El precio de unos $150 - $170<br /></span></span></span></span></div><p style="text-align: left;"><span style="font-size: small;"><b><a href="https://amzn.to/3kHixBY" target="_blank"><span class="a-size-large product-title-word-break" id="productTitle"><span class="cr-widget-FocalReviews" data-hook="cr-widget-FocalReviews"><span class="a-size-base review-text" data-hook="review-body"><span class="cr-original-review-content">Enlace de compra en Amazon - LINK </span></span></span></span></a></b></span></p><p style="text-align: left;"><b><span class="a-size-large product-title-word-break" id="productTitle"><span class="cr-widget-FocalReviews" data-hook="cr-widget-FocalReviews"><span class="a-size-base review-text" data-hook="review-body"><span class="cr-original-review-content"> </span></span></span> </span></b></p><h1 style="text-align: left;"><span class="a-size-large product-title-word-break" id="productTitle"> Grote - </span><span class="a-size-large product-title-word-break" id="productTitle"><span class="a-size-base review-text review-text-content" data-hook="review-body"><span class="cr-original-review-content">Semi hollow</span></span></span></h1><h2 style="text-align: left;"><span class="a-size-large product-title-word-break" id="productTitle"><span class="a-size-base review-text review-text-content" data-hook="review-body"><span class="cr-original-review-content"> <img alt="Grote - semi hollow" height="182" 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" title="Grote - semi hollow" width="400" /></span></span></span></h2><h2 style="text-align: left;"><span class="a-size-large product-title-word-break" id="productTitle"><span class="a-size-base review-text review-text-content" data-hook="review-body"></span></span></h2><p style="text-align: left;"><span class="a-size-large product-title-word-break" id="productTitle"><span class="a-size-base review-text review-text-content" data-hook="review-body"><span class="cr-original-review-content">De las 3 guitarras que hemos visto el día de hoy, la Grote semi hollow es mi opción principal para tocar metal, aunque es tan versatil que la puedes usar desde rock, jazz, hasta metal. Las pastillas son las mejores que he escuchado en una guitarra de bajo presupuesto, y el cuerpo hueco la hace muy comoda. El precio es de alrededor de $180, el cual es un gran precio para este estilo de guirarra, así cambiamos un poco de usar las strats y super-strats.</span></span></span></p><p style="text-align: left;"><span style="font-size: medium;"><span class="a-size-large product-title-word-break" id="productTitle"><span class="a-size-base review-text review-text-content" data-hook="review-body"><span class="cr-original-review-content"><b><a href="https://amzn.to/3ENmtsK" target="_blank">Enlace de compra en Amazon - LINK</a></b></span></span></span></span></p><div style="text-align: left;"><div style="text-align: left;"><span class="a-size-large product-title-word-break" id="productTitle"> </span></div></div><p style="text-align: left;"><span class="a-size-large product-title-word-break" id="productTitle"><span class="a-size-base review-text review-text-content" data-hook="review-body"><span class="cr-original-review-content">Muchas gracias por leer y continuar apoyando 7 Guitarras, espero prontamente compartirles la continuación de este top de guitarras. Cualquier pregunta o duda pueden enviarla a <b>consultas@7guitarras.com</b> o dejarla en los comentarios.</span></span></span></p><p style="text-align: left;"><span class="a-size-large product-title-word-break" id="productTitle"><span class="a-size-base review-text review-text-content" data-hook="review-body"><span class="cr-original-review-content"><br /></span></span></span></p><p style="text-align: left;"><span class="a-size-large product-title-word-break" id="productTitle"><span class="a-size-base review-text review-text-content" data-hook="review-body"><span class="cr-original-review-content"><br /></span></span></span></p></div><p style="text-align: left;"></p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-6527148603192637226.post-34075352901297683742019-06-30T02:48:00.005-05:002021-09-25T01:26:32.894-05:00Música académica en Amazon Music UnlimitedUn poco de publicidad para el servicio de música que estoy utilizando actualmente. Amazon music es de los servicios más populares de “steaming” de música, y posee una gran cantidad de canciones en cuanto a la música culta, académica o música clásica. <br />
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<h2>
Periodo de prueba</h2>
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El servicio da un período de prueba de 30 días, el cual es genial para probar todas las funciones. Tienes que colocar un método de pago valido para obtener los 30 días gratis, pero si al final el servicio no te convence puedes cancelar antes de que termine el periodo de prueba y no te cobraran nada.<br />
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<blockquote>
<a href="https://www.amazon.es/gp/product/B004FRX0MY/ref=as_li_tl?ie=UTF8&tag=7guita-21&camp=3638&creative=24630&linkCode=as2&creativeASIN=B004FRX0MY&linkId=2d934a93cf47355b3723931a254deb40">Amazon Music Unlimited – periodo de prueba (30 días)</a><br />
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<h2>
Promoción España</h2>
También hay una genial promoción para los usuarios de España, ya que están ofreciendo 4 meses de uso por solo €0.99. Tienes hasta el 16 de julio del 2019 para obtener la promoción.<br /><br />
<iframe border="0" frameborder="0" height="250" marginwidth="0" scrolling="no" src="https://rcm-eu.amazon-adsystem.com/e/cm?o=30&p=12&l=ur1&category=amu&banner=0Z4WJ5SKD9F9YVSN6PR2&f=ifr&linkID=aeda361f973c80bf4f580c2e0722730c&t=7guita-21&tracking_id=7guita-21" style="border: none;" width="300"></iframe>
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<h2>
</h2>
<h2>
</h2>
<a name='more'></a><h2>
Listas de reproducción</h2>
<div class="separator" style="clear: both; text-align: center;">
<a href="https://www.amazon.com/Cool-Down-Classical/dp/B07LGGK2FL/" style="margin-left: 1em; margin-right: 1em;"></a></div>
<div class="separator" style="clear: both; text-align: center;">
<a href="https://www.amazon.com/Cool-Down-Classical/dp/B07LGGK2FL/" style="margin-left: 1em; margin-right: 1em;"></a></div>
Las listas de reproducción que posee Amazon están muy bien diseñadas, estas son algunas de las que más he utilizado:<br />
<a href="https://www.amazon.com/Cool-Down-Classical/dp/B07LGGK2FL/"><img alt="Lista 1" border="0" height="364" src="https://1.bp.blogspot.com/-Vt-jw7Zd4Ls/XRhlNklyYWI/AAAAAAAAd2U/PGUVdpPvjOwlK3_o6rp-EFoQxfa4MceGQCLcBGAs/s1600/1.png" style="background-image: none; display: inline;" title="Lista 1" width="1028" /></a><br />
Incluye piezas de Beethoven, Schubert, Mozart, Haydn, entre otros.<br />
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<a href="https://www.amazon.com/Chopins-Nocturnes-and-More/dp/B07959DKBJ/"><img alt="Lista 2" border="0" height="333" src="https://1.bp.blogspot.com/-flTBuHrGmIk/XRhlPMfHrOI/AAAAAAAAd2k/Fl53gqHo8oUQqQXabU8dS1vAzGhOWVHjACLcBGAs/s1600/6.png" style="background-image: none; display: inline;" title="Lista 2" width="1028" /></a><br />
Esta lista incluye todos los nocturnos de Chopin, y los preludios de Debussy<br />
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<a href="https://www.amazon.com/Classical-Ballets/dp/B07G3KDYXH/"><img alt="Lista 3" border="0" height="333" src="https://4.bp.blogspot.com/-HATVyHE5dh4/XRhlNqjYPhI/AAAAAAAAd2o/g-KhFRXqvXkHZQgAh4mC_cLYELmyyaCpQCPcBGAYYCw/s320/3.png" style="background-image: none; display: inline;" title="Lista 3" width="1028" /></a><br />
Esta lista me gusto mucho, incluye los principales movimientos de los ballets mas conocidos.<br />
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<a href="https://www.amazon.com/Cool-Down-Classical/dp/B07LGGK2FL/" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"></a><a href="https://www.amazon.com/Cool-Down-Classical/dp/B07LGGK2FL/" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"></a><a href="https://www.amazon.com/Classical-Violin/dp/B07R18M21R/"><img alt="Lista 4" border="0" height="333" src="https://3.bp.blogspot.com/-KiLExL_29eU/XRhlNg1FM9I/AAAAAAAAd2s/KiyE5fE7UQgR0EgV6x7qJY2t4BGArePzgCPcBGAYYCw/s1600/2.png" style="background-image: none; display: inline;" title="Lista 4" width="1028" /></a><br />
Una gran cantidad de arreglos y piezas para violín, por los mejores violinistas.<br />
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<a href="https://www.amazon.com/100-Classical-Acoustic-Guitar-Songs/dp/B00DIM11SW/"><img alt="Lista 5" border="0" height="333" src="https://2.bp.blogspot.com/-sEWxRwCAeRY/XRhlOpDITkI/AAAAAAAAd2w/4P8FmzrlybESWus4qWbM3Lm9zz9m2vhCACPcBGAYYCw/s320/5.png" style="background-image: none; display: inline;" title="Lista 5" width="1028" /></a><br />
Las canciones que todo guitarrista clásico tiene que haber escuchado están en esta lista.<br />
<br />
<a href="https://www.amazon.com/Cool-Down-Classical/dp/B07LGGK2FL/" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><a href="https://www.amazon.com/Cool-Down-Classical/dp/B07LGGK2FL/" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><a href="https://www.amazon.com/Ultimate-Guitar-Collection-John-Williams/dp/B00138J3LK/"><img alt="Lista 6" border="0" height="333" src="https://1.bp.blogspot.com/-Fcy66cu6wX0/XRhlOcZClEI/AAAAAAAAd2w/CE7e7Zs7-_QTPSK2iOJN9A8bjqWu83e3QCPcBGAYYCw/s320/4.png" style="background-image: none; display: inline;" title="Lista 6" width="1028" /></a><br />
Si amas la guitarra clásica, esta lista de encantará con las principales piezas ejecutadas por el príncipe de la guitarra, John Williams
Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-6527148603192637226.post-90170934076487406222018-12-22T15:55:00.001-06:002018-12-23T01:37:22.321-06:00Regalos navideños para guitarristas<p>¡Felices fiestas amigos! En este articulo les mostraremos algunas recomendaciones de regalos con los que hacer feliz a cualquier guitarrista. En esta época de compartir, no hay como demostrar tu afecto a tus amigos músicos con un regalo que sea de su agrado, y no por ello significa que tienes que dar el regalo más costoso.</p><p><br></p><h1>Cuerdas</h1><p>Todo guitarrista apreciará este presente, por lo que es un genial regalo. Puedes preguntar cual es su marca de cuerdas favorita y su calibre, si no puedes preguntarle solo necesitas saber que tipo de guitarra posee, puedes ver esta guía para saber las diferencias: <a href="https://www.7guitarras.com/2011/09/tipos-de-guitarraclasica-y-acustica.html">Tipos de guitarras</a></p><a name='more'></a><p>Una vez conozcas el tipo de guitarra aquí te dejamos unas opciones estándar de muy buenas marcas y calidad:</p><p><br></p><h2>Para guitarra eléctrica</h2><p>Las cuerdas Ernie Ball son una de las más famosas, dan una muy buena calidad de sonido y la línea RPS están reforzadas y dan una duración mayor:</p><p><a href="https://www.amazon.es/gp/product/B0002DUW1C/ref=as_li_tl?ie=UTF8&camp=3638&creative=24630&creativeASIN=B0002DUW1C&linkCode=as2&tag=7guita-21&linkId=a4612050f91f10b7f0424ab59d15b637"><img width="244" height="244" title="Cuerdas Ernie Ball RPS" style="display: inline; background-image: none;" alt="Cuerdas Ernie Ball RPS" src="https://lh3.googleusercontent.com/-gxM3ekhiTxY/XB6yxKfgYlI/AAAAAAAAdOY/9fv0ZYw5HFw3WObqBXF6h8OJacFLE3HjACHMYCw/71c9eyKqqcL._SL1350_%255B3%255D?imgmax=800" border="0"></a></p><p>COMPRA AQUI:<strong><font size="2"> </font></strong><a href="https://www.amazon.es/gp/product/B0002DUW1C/ref=as_li_tl?ie=UTF8&camp=3638&creative=24630&creativeASIN=B0002DUW1C&linkCode=as2&tag=7guita-21&linkId=a4612050f91f10b7f0424ab59d15b637"><strong><font size="2">LINK</font></strong></a></p><p><br></p><h2>Para guitarra clásica</h2><p>La marca D’Addario es otra de las grandes marcas de cuerdas, la línea Pro-Arte es de las mejores en cuanto a la relación precio-calidad además ofreces una tensión normal, para cualquier tipo de guitarra clásica.</p><p><a href="https://www.amazon.es/gp/product/B000EEL6J6/ref=as_li_tl?ie=UTF8&camp=3638&creative=24630&creativeASIN=B000EEL6J6&linkCode=as2&tag=7guita-21&linkId=71f3ea6d31d6ff194715ad880cba76fd"><img width="238" height="244" title="D'Addario Pro Arte" style="display: inline; background-image: none;" alt="D'Addario Pro Arte" src="https://lh3.googleusercontent.com/-jjGJfUH8708/XB6yx6AB53I/AAAAAAAAdOc/UBh1a7jqZhUhkd3B04VbRHCTOdeje6AGACHMYCw/814bHFYU1RL._SL1500_%255B3%255D?imgmax=800" border="0"></a></p><p>COMPRA AQUI:<strong><font size="2"> <a href="https://www.amazon.es/gp/product/B000EEL6J6/ref=as_li_tl?ie=UTF8&camp=3638&creative=24630&creativeASIN=B000EEL6J6&linkCode=as2&tag=7guita-21&linkId=71f3ea6d31d6ff194715ad880cba76fd">LINK</a></font></strong></p><p><strong><font size="2"><br></font></strong></p><h2><strong><font size="2"></font></strong></h2><h2>Para guitarra acústica y electro-acústica</h2><p>La marca Elixir es famosa por su larga duración y la calidad de sus materiales. Esta línea fabricadas con fosforo y bronce ofrecen un gran sonido, así como una excelente duración.</p><p><a href="https://www.amazon.es/gp/product/B000A6EUSW/ref=as_li_tl?ie=UTF8&camp=3638&creative=24630&creativeASIN=B000A6EUSW&linkCode=as2&tag=7guita-21&linkId=a6a68a0b323d5164d7c8e3ebe1cf032e"><img width="211" height="243" title="Elixir fósforo bronce" style="display: inline; background-image: none;" alt="Elixir fósforo bronce" src="https://lh3.googleusercontent.com/-2UGeq3BTLEI/XB6yyr0FwaI/AAAAAAAAdOg/KLz1bEtn7cAK5dalhrbxNRRi2m238k-UwCHMYCw/81ymmMJmMtL._SL1425_%255B3%255D?imgmax=800" border="0"></a></p><p>COMPRA AQUI:<strong><font size="2"> <a href="https://www.amazon.es/gp/product/B000A6EUSW/ref=as_li_tl?ie=UTF8&camp=3638&creative=24630&creativeASIN=B000A6EUSW&linkCode=as2&tag=7guita-21&linkId=a6a68a0b323d5164d7c8e3ebe1cf032e">LINK</a></font></strong></p><p><strong><font size="2"><br></font></strong></p><h1>Uñetas</h1><p>Algo esencial para todos los guitarristas, el problema es que hay una gran variedad de opciones, por lo cual un paquete con variedad de uñetas es lo ideal para regalar.</p><p><a href="https://www.amazon.es/gp/product/B0752N9XTL/ref=as_li_tl?ie=UTF8&camp=3638&creative=24630&creativeASIN=B0752N9XTL&linkCode=as2&tag=7guita-21&linkId=f05809f9f4555e3af6cec4e63f5496cc"><img width="244" height="244" title="Dunlop uñetas" style="display: inline; background-image: none;" alt="Dunlop uñetas" src="https://lh3.googleusercontent.com/-jOeK8P6zyew/XB6yziAeWDI/AAAAAAAAdOk/jUrBN5oAv2Aqn-WFN6Yi1Y8bIG4X9ahaACHMYCw/81hoFoIxIAL._SL1500_%255B3%255D?imgmax=800" border="0"></a></p><p>COMPRA AQUI: <a href="https://www.amazon.es/gp/product/B0752N9XTL/ref=as_li_tl?ie=UTF8&camp=3638&creative=24630&creativeASIN=B0752N9XTL&linkCode=as2&tag=7guita-21&linkId=f05809f9f4555e3af6cec4e63f5496cc"><font size="2"><strong>LINK</strong></font></a></p><p><br></p><h1>Cinchas, cinturones o Straps</h1><p>Las cinchas para guitarra son muy útiles y necesarias, nunca sobran, siempre es bueno tener una de repuesto. Estas cinchas Dunlop tienen una gran calidad y sirven para cualquier tipo de guitarra.</p><p><a href="https://www.amazon.es/gp/product/B0002GTZQM/ref=as_li_tl?ie=UTF8&camp=3638&creative=24630&creativeASIN=B0002GTZQM&linkCode=as2&tag=7guita-21&linkId=105b2c3fd894accc4eab25a88e041ae2"><img width="244" height="198" title="Dunlop strap" style="display: inline; background-image: none;" alt="Dunlop strap" src="https://lh3.googleusercontent.com/-fTP1G6FApKE/XB87MRqvDdI/AAAAAAAAdPI/08TiTQAalm4bd-_VuDze8f4R_6BHBtw0QCHMYCw/41uXvnLy4nL%255B1%255D?imgmax=800" border="0"></a></p><p>COMPRA AQUI: <a href="https://www.amazon.es/gp/product/B0002GTZQM/ref=as_li_tl?ie=UTF8&camp=3638&creative=24630&creativeASIN=B0002GTZQM&linkCode=as2&tag=7guita-21&linkId=105b2c3fd894accc4eab25a88e041ae2"><strong><font size="2">LINK</font></strong></a><strong><font size="2"></font></strong></p><h1><strong><font size="2"></font></strong></h1><strong><font size="2"><a href="https://www.amazon.es/gp/product/B000EEL6J6/ref=as_li_tl?ie=UTF8&camp=3638&creative=24630&creativeASIN=B000EEL6J6&linkCode=as2&tag=7guita-21&linkId=71f3ea6d31d6ff194715ad880cba76fd"><h1><strong><font size="2"></font></strong></h1></a></font></strong>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-6527148603192637226.post-85325070761131864962018-05-01T02:45:00.001-05:002018-05-01T02:45:56.747-05:00Humble Book Bundle–Libros<p>Esta semana en la pagina <strong>Humble Bundle</strong> se encuentra la promoción de l<strong>ibros con temática de educación musical</strong>. Los libros y juegos de esta pagina no son gratuitos, pero nos dan la opción de <strong>escoger cuanto pagar por ellos</strong>, desde un dólar. También podemos dividir el pago entre los creadores, el sostenimiento del sitio web o algunas beneficencias.</p><p><a href="https://www.humblebundle.com/books/learn-music-books"><img width="598" height="144" title="Humble Bundle" style="display: inline; background-image: none;" alt="Humble Bundle" src="https://lh3.googleusercontent.com/-WmPmEXF-n3o/WugbJg2AB1I/AAAAAAAAbGg/CE7kfoyIXw076hBRecxI7xunjlYl07HPACHMYCw/hb%255B4%255D?imgmax=800" border="0"></a></p><a name='more'></a><p>Al momento de escribir este articulo faltan seis días para poder comprar los libros. Estos se encuentran en ingles, pero creo que están interesantes para músicos y guitarristas principiantes, que manejen un nivel de ingles básico, ya que poseen referencias visuales que facilitan su uso.</p><p>Los libros son <strong>libres de protección (DRM)</strong> y se pueden descargar en diversos formatos incluidos <strong>epub y PDF</strong>. La pagina permite varios tipos de pago, incluido <strong>PayPal</strong>.</p><p>De acuerdo al monto que desees pagar se van desbloqueando más libros, pero incluso con el pago mínimo de $1 obtienes algunos libros útiles e interesantes. Así que, ¿por que no darle oportunidad?</p><p><br></p><p><a href="https://www.humblebundle.com/books/learn-music-books"><img width="487" height="357" title="Humble Bundle" style="display: inline; background-image: none;" alt="Humble Bundle" src="https://lh3.googleusercontent.com/-plQqG4yhnVM/WugbKb8q-6I/AAAAAAAAbGk/kj-eBu9SgBI0uSUtTpHylRbT0oqBsh1dwCHMYCw/hb2%255B4%255D?imgmax=800" border="0"></a></p><p><br></p><p><a href="https://www.humblebundle.com/books/learn-music-books"><img width="487" height="329" title="Humble Bundle" style="display: inline; background-image: none;" alt="Humble Bundle" src="https://lh3.googleusercontent.com/-DIU2fLJlV2o/WugbLCzplxI/AAAAAAAAbGo/nFYDR57CyTw3wGad8w2E0S2mE4qPscaDQCHMYCw/hb3%255B4%255D?imgmax=800" border="0"></a></p><p><br></p><p><a href="https://www.humblebundle.com/books/learn-music-books"><img width="485" height="341" title="Humble Bundle" style="display: inline; background-image: none;" alt="Humble Bundle" src="https://lh3.googleusercontent.com/-9UeDhv5PCsc/WugbL2wweMI/AAAAAAAAbGs/0ESC4tAcw7YqGrpBfOLkGWftxcRDGAvIwCHMYCw/hb4%255B5%255D?imgmax=800" border="0"></a></p><p><br></p><p><a href="https://www.humblebundle.com/books/learn-music-books"><strong><font size="3">Humble Book Bundle (LINK)</font></strong></a></p><p><a href="https://lh3.googleusercontent.com/-VQiQUgbW89I/WugbMu2IiVI/AAAAAAAAbGw/Ccu1af9FELMccwjLfw5ti1NoMiPIS3EHwCHMYCw/s1600-h/hb%255B3%255D"><br></a></p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-6527148603192637226.post-8516386816104465732017-12-20T01:57:00.001-06:002017-12-24T14:42:06.843-06:00Villancicos–Partituras y videos<p><img width="156" height="240" src="http://lh4.ggpht.com/-LNa8xdUrJ7I/VHVwYYktxnI/AAAAAAAAEVc/f23Xo-ovqMk/christmas_guitar_by_sophiamarie13-d4hwumq_thumb%25255B1%25255D.jpg?imgmax=800"></p><p>Ya casi es navidad, tiempo de compartir con familia y amigos, de conciertos navideños y villancicos, y las vacaciones son un excelente tiempo para dedicarle más tiempo a practicar con nuestra guitarra. Y porque no practicar y llenarnos de espíritu navideño tocando villancicos.</p><p><br></p><p>Los años anteriores ya hemos aprendido algunos villancicos, puedes verlos aquí:</p><blockquote><p><a href="http://www.7guitarras.com/2011/12/villancicostablaturas-y-acordes.html">Villancicos - Tablaturas y Acordes</a></p><p><a href="http://www.7guitarras.com/2012/12/feliz-navidad-villancicos-tablaturas-y.html">Villancicos - Tablaturas y acordes II</a></p><p><a href="http://www.7guitarras.com/2013/12/villancicos-partituras-y-acordes.html">Villancicos – Partituras y acordes</a></p><p><a href="http://www.7guitarras.com/2014/11/villancicos-acordes.html">Villancicos – Acordes</a></p><p><br></p></blockquote><h1></h1><h1>Videos</h1><p>La siguiente es una lista personal de piezas clásicas en las que se tratan temas navideños o se ocupan frases de villancicos. Realmente no son piezas clásicas propiamente dichas, ya que no pertenecen al clasicismo. Son música culta o orquestal, y son términos que comúnmente se confunden pero la música culta es la que no entra en música popular. Es bueno utilizar el termino de música culta para evitar ambigüedades pero en el día a día pueda que no nos entiendan de que hablamos, así que digamos que es música clásica. Aquí la lista:</p><p><br></p><h2>-Sinfonía #2 (Sinfonía navideña) - Krzysztof_Penderecki (1980)</h2><p><iframe width="560" height="315" src="https://www.youtube.com/embed/lzglGiIfmpA" frameborder="0" allowfullscreen="" gesture="media" allow="encrypted-media"></iframe></p><p><br></p><h2>-Fantasia on Christmas Carols - Vaughan Williams (1912)</h2><h2><br></h2><iframe width="560" height="315" src="https://www.youtube.com/embed/Ib8LUJkMEjU" frameborder="0" allowfullscreen="" gesture="media" allow="encrypted-media"></iframe><h2><br></h2><h2>-O Holy Night - Adolphe Adam (1843)</h2><p><iframe width="560" height="315" src="https://www.youtube.com/embed/qBJObglpL9A" frameborder="0" allowfullscreen="" gesture="media" allow="encrypted-media"></iframe></p><p><br></p><h1>Partituras</h1><p>Ahora algunas partituras para poder practicar en la guitarra:</p><p><br></p><h2>-Villancico de Navidad – Agustín Barrios Mangoré (1943)</h2><p>Has clic en la imagen para ver el PDF de la partitura completa </p><p><a href="http://imslp.org/wiki/File:PMLP813836-Barrios_A-Villancico_de_Navidad%2Bmid.pdf"><img width="174" height="244" title="VIllancico de navidad" style="display: inline; background-image: none;" alt="Villancico de navidad" src="https://lh3.googleusercontent.com/-CnaA8lTit5A/WjoX1V6LBrI/AAAAAAAAaGU/v9ooYxmM1DQykGpmSUd16rlGN0cQ51zaACHMYCw/74bf65f16f234c658e0e45785b93c9ea342f2961%255B5%255D?imgmax=800" border="0"></a></p><p><br></p><h2>-Popular Christmas Carols – Varios artistas</h2><p>Has clic en la imagen para ver el PDF de las partituras, se incluyen 16 piezas</p><p><a href="http://imslp.org/wiki/Popular_Christmas_Carols_(Various)"><img width="243" height="244" title="Villancicos" style="display: inline; background-image: none;" alt="Villancicos" src="https://lh3.googleusercontent.com/-9aR71fvfU9g/WjoX2HCVamI/AAAAAAAAaGY/_Cs6L8XAtg47I47ohnYAVZKgcb8kbHthwCHMYCw/Boceto%255B4%255D?imgmax=800" border="0"></a></p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-6527148603192637226.post-65610708275263674852017-04-25T02:41:00.001-05:002017-04-25T02:42:33.490-05:007 libros para guitarristas<p>El <strong>23 de abril</strong> se celebra el día internacional del libro, un día en el que se promueve la lectura. Nosotros como guitarristas y músicos no nos queremos quedar atrás y hemos recopilado<strong> 7 libros</strong> muy útiles para cualquier músico. Hemos tomado en cuenta las distintas áreas de estudio de un guitarrista, y hemos colocado un libro representativo por cada área.</p> <p>Si deseas obtener el libro hemos colocado enlaces para que lo puedas comprar en Amazon. El día 23 además de celebra el día del libro se celebran también los <strong>derechos de autor</strong>, y aquí en <strong>7 Guitarras</strong> entendemos el trabajo que conlleva la realización y distribución de un libro (físico o digital). Por esta razón les recomendamos <strong>obtener siempre los libros de manera legal</strong> cuando este en tus posibilidades y presupuesto. Sabemos que dependiendo la economía de cada país un libro puede ser más costoso, y lamentamos no poder ayudarte, pero la mayoría de libros los puedes encontrar con una búsqueda en Google ;) (con un poco de precaución).</p> <p> </p> <a name='more'></a> <p>Así que celebrando el <strong>día del libro</strong>, he aquí la lista:</p> <p> </p> <h1>Breve historia de la música occidental</h1> <p><a href="https://lh3.googleusercontent.com/-CFyA-mB2uMY/WP79RLFOL0I/AAAAAAAATL8/9xZM2kxa5ss87FFcee6gn0sOq9R5sKLrQCHM/s1600-h/Captura%255B3%255D"><img title="Breve historia de la música occidental" style="border-left-width: 0px; border-right-width: 0px; background-image: none; border-bottom-width: 0px; padding-top: 0px; padding-left: 0px; display: inline; padding-right: 0px; border-top-width: 0px" border="0" alt="Breve historia de la música occidental" src="https://lh3.googleusercontent.com/-D-wCSHs6DMs/WP79TZa2ahI/AAAAAAAATMA/gPNTlyrsueQXgNukNEFJklKHjHad4Z16gCHM/Captura_thumb%255B1%255D?imgmax=800" width="340" height="484"></a></p> <p>Un excelente libro para entretenernos y ampliar nuestro <strong>conocimiento general</strong> de los cambio que ha ido sufriendo la música occidental. También contiene información muy valiosa sobre los principales compositores que ha tenido la música occidental.</p> <p>La <strong>historia siempre es importante</strong> para saber como ha cambiado y avanzado cualquier área del saber. Y aunque este libro no aporte directamente a mejorara tu técnica y ejecución, es una gran ayuda y una base muy fuerte para estudios mas complejos ya que nos muestra como hemos llegado a ellos a través del tiempo. Además es un excelente <strong>libro de referencia</strong>, para consultar y obtener mayor información de un compositor, o una época especifica en la música.</p> <p><a href="https://www.amazon.es/Breve-historia-m%C3%BAsica-occidental-Spanish-ebook/dp/B0089VX05O/ref=as_li_ss_tl?s=books&ie=UTF8&qid=1493074143&sr=1-1&keywords=Breve+historia+de+la+m%C3%BAsica+occidental&linkCode=ll1&tag=7guita-21&linkId=4bc2bad9dfe969025c8fc733332d6723">LINK</a></p> <p> </p> <h1>HINDEMITH - Armonía Tradicional 1º y 2º</h1> <p><a href="https://lh3.googleusercontent.com/-23_9LM4gHIQ/WP79UZUvCAI/AAAAAAAATME/3tamoW2CRK8O8NZDsIzwnI2iC0wW29MmwCHM/s1600-h/Captura2%255B4%255D"><img title="Armonia Tradicional 1º y 2º" style="border-left-width: 0px; border-right-width: 0px; background-image: none; border-bottom-width: 0px; padding-top: 0px; padding-left: 0px; display: inline; padding-right: 0px; border-top-width: 0px" border="0" alt="HINDEMITH Armonia Tradicional 1º y 2º" src="https://lh3.googleusercontent.com/--LfCl2fiUrQ/WP79WbkdFbI/AAAAAAAATMI/bRY8LsGaz0w0veqb1yq0ZQ5O0NNo--GvACHM/Captura2_thumb%255B2%255D?imgmax=800" width="644" height="318"></a></p> <p>El libro principal y base para comprender y estudiar la<strong> armonía tradicional</strong>. Escrito por el celebre compositor alemán <strong>Paul Hindemith</strong>.</p> <p>Es, a mi parecer, el <strong>libro de armonía mejor redactado</strong> y de mas fácil comprensión. Trata la armonía de manera tradicional, pero simplificando la explicación de reglas y haciendo muy amena su lectura.</p> <p><a href="https://www.amazon.es/HINDEMITH-Armonia-Tradicional-1%C2%BA-Completo/dp/B007OLH664/ref=as_li_ss_tl?s=books&ie=UTF8&qid=1493093091&sr=1-1&keywords=Armon%C3%ADa+tradicional&linkCode=ll1&tag=7guita-21&linkId=06276e2d0d6805766b6e36b52213bdba">LINK</a></p> <p> </p> <h1>Secretos de Mi Técnica Para Guitarra: By Joe Satriani</h1> <p><a href="https://lh3.googleusercontent.com/-Wn7cdIfIPVU/WP79YKQORAI/AAAAAAAATMM/yk1WJKw4OGUKZ3V4BZDZQslKCE5M1WjTwCHM/s1600-h/Captura1%255B3%255D"><img title="Joe Satriani" style="border-left-width: 0px; border-right-width: 0px; background-image: none; border-bottom-width: 0px; padding-top: 0px; padding-left: 0px; display: inline; padding-right: 0px; border-top-width: 0px" border="0" alt="Secretos de Mi Tecnica Para Guitarra" src="https://lh3.googleusercontent.com/-U-Q0QlvOMKU/WP79aeARhYI/AAAAAAAATMQ/BtDydIYZe2wu1xIr7Wpp1nZG4w0P5uUUwCHM/Captura1_thumb%255B1%255D?imgmax=800" width="348" height="484"></a></p> <p>En este libro se explica con gran cantidad de <strong>detalles, ejemplos y ejercicios</strong> la técnica de este gran guitarrista contemporáneo. El libro esta coescrito por el propio <strong>Satriani</strong>.</p> <p>Si tu interés es aprender <strong>Shred</strong> como los grandes, este es uno de los mejores libros que encontraras, con muchos consejos, secretos, tips y técnicas.</p> <p><a href="https://www.amazon.es/Secretos-Mi-Tecnica-Para-Guitarra-ebook/dp/B01BMURSEW/ref=as_li_ss_tl?s=digital-text&ie=UTF8&qid=1493073898&sr=1-76&keywords=guitarra&linkCode=ll1&tag=7guita-21&linkId=02383bd859b7a2e885aa2273261f1796">LINK</a></p> <p> </p> <h1>The Christopher Parkening Guitar Method</h1> <p><a href="https://lh3.googleusercontent.com/-e9yZR4ig8m8/WP79cJK346I/AAAAAAAATMU/Zw-Zp5D6To0wTrjq8h7UbDau1JmkrSoJwCHM/s1600-h/Captura3%255B3%255D"><img title="Christopher Parkening" style="border-left-width: 0px; border-right-width: 0px; background-image: none; border-bottom-width: 0px; padding-top: 0px; padding-left: 0px; display: inline; padding-right: 0px; border-top-width: 0px" border="0" alt="The Christopher Parkening Guitar Method" src="https://lh3.googleusercontent.com/-eLmbwWWhpUw/WP79eSQ-gOI/AAAAAAAATMY/RQUTTmmCBAAjnN-bOPAEEj7dNl-Jt_7ogCHM/Captura3_thumb%255B1%255D?imgmax=800" width="373" height="484"></a></p> <p>El método de guitarra clásica por <strong>Christopher Parkening</strong> es quizás el mas completo y mas utilizado para la enseñanza. Se compone de <strong>dos volúmenes</strong> que abarcan desde los mas básico para un guitarrista principiante hasta las técnicas mas avanzadas, con piezas de ejemplo con <strong>distintas dificultades</strong>.</p> <p>Este método no lo hemos podido encontrar en español, pero es muy grafico y fácil de comprender con un nivel medio de <strong>ingles</strong>.</p> <p><a href="https://www.amazon.es/Christopher-Parkening-Guitar-Method-Technique/dp/B00FKY3VRA/ref=as_li_ss_tl?s=books&ie=UTF8&qid=1493103964&sr=1-1&keywords=The+Christopher+Parkening+Guitar+Method&linkCode=ll1&tag=7guita-21&linkId=5ff507fd863a09f7a7e96fe87df7b6d5">LINK (volumen 1)</a></p> <p><a href="https://www.amazon.es/Christopher-Parkening-VARIOUS-19-Feb-2004-Paperback/dp/B013RPRNF4/ref=as_li_ss_tl?s=books&ie=UTF8&qid=1493103964&sr=1-3&keywords=The+Christopher+Parkening+Guitar+Method&linkCode=ll1&tag=7guita-21&linkId=0852a7d482c08edddb2a5330afb596b9">LINK (volumen 2)</a></p> <p> </p> <h1>Didáctica de la música para infantil</h1> <p><a href="https://lh3.googleusercontent.com/-XEz1ngNm2jY/WP79gFZ7ynI/AAAAAAAATMc/-iGeFaSFlToRSt6xSK-gJS3wDeSEmy0MQCHM/s1600-h/Captura4%255B3%255D"><img title="Didáctica de la música para infantil" style="border-left-width: 0px; border-right-width: 0px; background-image: none; border-bottom-width: 0px; padding-top: 0px; padding-left: 0px; display: inline; padding-right: 0px; border-top-width: 0px" border="0" alt="Didáctica de la música para infantil" src="https://lh3.googleusercontent.com/-YKkfFZqsYH0/WP79iXQXNUI/AAAAAAAATMg/-6x-9D3_5SMMtcUT2MHKRmEliYM8-GGZwCHM/Captura4_thumb%255B1%255D?imgmax=800" width="337" height="484"></a></p> <p>Un excelente libro con pedagogía y <strong>didáctica enfocada a la enseñanza musica</strong>l, principalmente de niños. Un libro muy útil para cualquier <strong>maestro o instructor de música</strong>, así como para padres músicos que desean instruir a su hijos en la música.</p> <p>Muy completo, y con muchos consejos y técnicas de enseñanza. Explica todo muy básicamente para su comprensión, incluso de aquellos que no tenemos mucho conocimiento en la didáctica.</p> <p><a href="https://www.amazon.es/Did%C3%A1ctica-m%C3%BAsica-infantil-Pilar-Pascual/dp/8483223031/ref=as_li_ss_tl?s=books&ie=UTF8&qid=1493076309&sr=1-1&keywords=Did%C3%A1ctica+de+la+m%C3%BAsica+para+educaci%C3%B3n+infantil&linkCode=ll1&tag=7guita-21&linkId=9d866b5ddcb48b6271bcfbe6466c6d9b">LINK</a></p> <p> </p> <h1>El Sistema CAGED Y 100 Licks Para Guitarra Blues</h1> <p><a href="https://lh3.googleusercontent.com/-FkNBwV8PIJ8/WP79jjO8TxI/AAAAAAAATMk/2ojjc5M4sscrEy38PWRDXNsj4sAQ4SuGgCHM/s1600-h/Captura5%255B5%255D"><img title="El Sistema CAGED" style="border-left-width: 0px; border-right-width: 0px; background-image: none; border-bottom-width: 0px; padding-top: 0px; padding-left: 0px; display: inline; padding-right: 0px; border-top-width: 0px" border="0" alt="El Sistema CAGED Y 100 Licks Para Guitarra Blues" src="https://lh3.googleusercontent.com/-X-dU2JxWAHY/WP79laASoNI/AAAAAAAATMo/in4PwCqthRczOeDRjqrgVCyX4BH4Bo84ACHM/Captura5_thumb%255B3%255D?imgmax=800" width="371" height="484"></a></p> <p>Un gran libro para practicar el sistema<strong> CAGED</strong>, algo así como enjaulado en español. Es una regla mnemotécnica para los acodes <strong>Do, La, Sol, Mi y Re,</strong> y la repetición de un mismo acorde con la posición de los acordes abiertos antes mencionados a lo largo de todo el mástil.</p> <p>Una manera fácil de <strong>familiarizarse con todo el mástil de la guitarra</strong>, y acostumbres a su uso. Incluye 100 licks y ejemplos en <strong>distintas escalas y tonalidades</strong>. Muy útil y practico.</p> <p><a href="https://www.amazon.es/Sistema-CAGED-Licks-Guitarra-Blues-ebook/dp/B01BHMRD36/ref=as_li_ss_tl?s=books&ie=UTF8&qid=1493092616&sr=1-6&keywords=El+libro+de+las+escalas&linkCode=ll1&tag=7guita-21&linkId=e2065450f831cfa188d3b272c8454592">LINK</a></p> <p> </p> <h1>El Camino de la Improvisación</h1> <p><a href="https://lh3.googleusercontent.com/-ZNwzLAAapow/WP79m0vJjlI/AAAAAAAATMs/dP6RpM1BoUcSFjtFTDKS_b8dd-b8o--MgCHM/s1600-h/Captura6%255B3%255D"><img title="El Camino de la Improvisación" style="border-left-width: 0px; border-right-width: 0px; background-image: none; border-bottom-width: 0px; padding-top: 0px; padding-left: 0px; display: inline; padding-right: 0px; border-top-width: 0px" border="0" alt="El Camino de la Improvisación" src="https://lh3.googleusercontent.com/-sH9Wrf-nG3o/WP79pBLEkeI/AAAAAAAATMw/oFwiORa1i1UupS2jP2Wsuqb7pnXm27ZjwCHM/Captura6_thumb%255B1%255D?imgmax=800" width="330" height="484"></a></p> <p>Un excelente libro para iniciarse en la<strong> improvisación</strong>. Nos muestra la <strong>teoría </strong>necesaria para facilitarnos la improvisación. El libro incluye algunas pistas de audio para facilitarnos el comprender diversos conceptos.</p> <p>Un libro muy practico, pero sin dejar de lado la teoría. Muy completo ya que a lo largo del libro estudiamos la<strong> forma</strong> de la improvisación, ejercicios para mejorar el <strong>oído</strong>, <strong>rítmica</strong>, <strong>escalas</strong>, y <strong>cadencias</strong>. Esto ultimo es lo que mas me llamo la atención y creo que es lo que hace este libro uno de los mejores en cuanto a ayuda para la <strong>improvisación</strong>.</p> <p><a href="https://www.amazon.es/Camino-Improvisaci%C3%B3n-Herramientas-Ejercicios-desarrollo-ebook/dp/B00UFN5FNO/ref=as_li_ss_tl?s=books&ie=UTF8&qid=1493092616&sr=1-13&keywords=El+libro+de+las+escalas&linkCode=ll1&tag=7guita-21&linkId=a734b6678b1d8a1d1b5a7864a0fedc90">LINK</a></p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-6527148603192637226.post-45732107608831061662016-08-18T17:52:00.001-05:002016-08-18T17:52:31.406-05:00Sol y Do están incorrectos<p>Cuando empezamos a aprender a tocar la guitarra, una de las primeras cosas que se enseñan son los <strong>acordes mayores</strong>. Dos de esos acordes, el acorde de <strong>Sol mayor</strong> y de <strong>Do mayor</strong> nos los enseñan <strong>incorrectamente</strong> según la armonía tradicional. El día de hoy veremos el porque están incorrectos, y como corregirlos. Para iniciar debemos saber que es la armonía tradicional:</p> <p> </p> <h1>Armonía tradicional</h1> <p>Este es un método de enseñanza. Son un <strong>conjunto de reglas</strong> para que un conjunto de notas se escuchen “bien”. Principalmente es un estándar de lo musicalmente correcto, aunque al ser algo subjetivo, se puede decir que son ciertas reglas culturales.</p> <p>Toda la música culta occidental se ha basado en la armonía tradicional. Aunque en los últimos años se ha hecho muy famosa la frase: “Para crear hay que romper las reglas”. Esta bien romper estas reglas, pero hoy en día <strong>ni siquiera se estudian estas reglas</strong>.</p> <p>La armonía tradicional es el equivalente a el contrapunto en la melodía.</p> <a name='more'></a> <h1></h1> <h1>Repetición</h1> <p>Para comenzar, un acorde esta formado por tres notas: <strong>la tónica, tercera, y quinta</strong>. Estas notas se pueden repetir en distintas cuerdas de la guitarra, en el piano de igual forma, y en otros instrumentos armónicos también.</p> <p>Según la armonía tradicional la mejor nota para repetir es <strong>la tónica</strong>, esto es muy común en el piano. En <strong>segundo grado se puede repetir la quinta</strong>, esto es común en la guitarra. El problema radica en la <strong>tercera</strong>. Esta nota es a que da el carácter mayor o menor a un acorde. Y según la armonía tradicional,<strong> no debe de repetirse nunca</strong>.</p> <blockquote> <p>Tónica: Ideal repetirla</p> <p>Tercera: Nunca se debe repetir</p> <p>Quinta: Repetirla a voluntad</p></blockquote> <h1>Acorde de Do incorrecto</h1> <p>Este acorde es el que más erramos al ejecutar, incluso músicos con experiencia pueden ejecutarlo de manera incorrecta.</p> <p>Ahora veamos la<strong> posición abierta</strong> más común del acorde de Do en la guitarra:</p> <p><a href="https://lh3.googleusercontent.com/-8NItHbp9TDY/V7Y7x2nAdZI/AAAAAAAAOKM/vHudxgqwddw/s1600-h/24%25255B2%25255D.png"><img title="Do mayor incorrecto" style="border-top: 0px; border-right: 0px; background-image: none; border-bottom: 0px; padding-top: 0px; padding-left: 0px; border-left: 0px; display: inline; padding-right: 0px" border="0" alt="C major" src="https://lh3.googleusercontent.com/--_1NvWZzc9o/V7Y72PtBVVI/AAAAAAAAOKQ/9vN2ZVYQeoo/24_thumb.png?imgmax=800" width="166" height="244"></a></p> <p>En ella repetimos la tónica una vez, y la tercera también. <strong>(Do, Mi, Sol, Do, Mi)</strong></p> <p> </p> <h1>Acorde de Do corregido</h1> <p>La manera correcta de ejecutarlo sería repitiendo la tónica y la quinta <strong>una vez cada una</strong>:</p> <p><a href="https://lh3.googleusercontent.com/-wOr6tf6XmMg/V7Y74ZYgbiI/AAAAAAAAOKU/c0fVBKCnrAM/s1600-h/25%25255B2%25255D.png"><img title="Do mayor correcto" style="border-top: 0px; border-right: 0px; background-image: none; border-bottom: 0px; padding-top: 0px; padding-left: 0px; border-left: 0px; display: inline; padding-right: 0px" border="0" alt="C major" src="https://lh3.googleusercontent.com/-Xy58OA4KwWA/V7Y7-tpCkSI/AAAAAAAAOKY/IsKysqezJMs/25_thumb.png?imgmax=800" width="173" height="244"></a></p> <p><strong>(Do, Mi, Sol, Do, Sol)</strong></p> <p> </p> <h1>Acorde de Sol incorrecto</h1> <p>Este es más común sobretodo en principiantes, debido a su facilidad y a que de esta forma no se ocupa el dedo <strong>meñique</strong>, que causa mucho problema en los principiantes.</p> <p><a href="https://lh3.googleusercontent.com/-lIe9Lm4ZtEc/V7Y8AukWdDI/AAAAAAAAOKc/pf1MiSXVMLY/s1600-h/26%25255B2%25255D.png"><img title="Sol mayor incorrecto" style="border-top: 0px; border-right: 0px; background-image: none; border-bottom: 0px; padding-top: 0px; padding-left: 0px; border-left: 0px; display: inline; padding-right: 0px" border="0" alt="G major" src="https://lh3.googleusercontent.com/-9JBSDLrpRBQ/V7Y8D5fk5lI/AAAAAAAAOKg/Hs29x_a3VTI/26_thumb.png?imgmax=800" width="171" height="244"></a></p> <p>Aquí se repite la tónica dos veces, la quinta no se repite, y la tercera se repite una vez.</p> <p><strong>(Sol, Si, Re, Sol, Si, Sol)</strong></p> <p> </p> <h1>Acorde de Sol corregido</h1> <p>La manera correcta sería repetir la quinta, y <strong>la tercera no debe de repetirse</strong>:</p> <p><a href="https://lh3.googleusercontent.com/-p3EK1htstLg/V7Y8FlVSTyI/AAAAAAAAOKk/OUa8d2DZsPo/s1600-h/23%25255B2%25255D.png"><img title="Sol mayor correcto" style="border-top: 0px; border-right: 0px; background-image: none; border-bottom: 0px; padding-top: 0px; padding-left: 0px; border-left: 0px; display: inline; padding-right: 0px" border="0" alt="G major" src="https://lh3.googleusercontent.com/-Q24TykIKdkM/V7Y8IxIsoKI/AAAAAAAAOKo/50MAwpDvS-0/23_thumb.png?imgmax=800" width="154" height="244"></a></p> <p><strong>(Sol, Si, Re, Sol, Re, Sol)</strong></p> <p> </p> <h1>Conclusión</h1> <p>Estas reglas puede que si sean subjetivas. Y la percepción si cambia entre culturas. Pero no debemos olvidarlas ni mucho menos obviarlas en el aprendizaje de los músicos. <strong>Si bien es cierto que no debemos morir dentro de un cuadrado, estas reglas nos preparan para que una vez salgamos no nos derrumbemos.</strong></p> <p>Te invito a que toques los acordes de ambas maneras, y escuches la diferencia.</p>Unknownnoreply@blogger.com4tag:blogger.com,1999:blog-6527148603192637226.post-45134912410776254192016-08-03T13:23:00.001-05:002016-08-03T13:23:52.698-05:00Solfeador–aprende a leer partituras<p>Esta aplicación para Android nos permite aprender a leer partituras, pero sobre todo a leerlas de una manera <strong>fluida y rápida</strong>. Esta es una de las mejores aplicaciones que he encontrado. Es muy sencilla de utilizar, no <strong>ocupa mucho espacio</strong> en tu dispositivo y es<strong> gratuita</strong>.</p> <p><a href="https://lh3.googleusercontent.com/-nkCNKPnXuoE/V6I2n0BrJ1I/AAAAAAAANmM/dxCGR3J3Vt4/s1600-h/QuickMemo%25252B_2016-08-03-11-52-52%25255B2%25255D.png"><img title="App Android" style="border-top: 0px; border-right: 0px; background-image: none; border-bottom: 0px; padding-top: 0px; padding-left: 0px; border-left: 0px; display: inline; padding-right: 0px" border="0" alt="Solfeador" src="https://lh3.googleusercontent.com/-8t5WH4igM3E/V6I2olrxJWI/AAAAAAAANmQ/1hSY0kA1cLA/QuickMemo%25252B_2016-08-03-11-52-52_thumb.png?imgmax=800" width="150" height="244"></a></p> <p> </p> <p>La interfaz es muy sencilla, nos muestra los dos tipos de nivel, las estadísticas y logros, y las configuraciones. La aplicación nos lleva por 32 niveles, 16 para la <strong>clave de Sol</strong> y 16 para la <strong>clave de Fa</strong>. Aumentando cada vez su grado de <strong>dificultad</strong> y aumentando el <strong>número de notas </strong>que aparecen.</p> <a name='more'></a> <p><a href="https://lh3.googleusercontent.com/-64t9cX0y8CI/V6I2pxOTqrI/AAAAAAAANmU/8_oV7FNJydM/s1600-h/QuickMemo%25252B_2016-08-03-11-52-59%25255B2%25255D.png"><img title="Velocidad al leer partituras" style="border-top: 0px; border-right: 0px; background-image: none; border-bottom: 0px; padding-top: 0px; padding-left: 0px; border-left: 0px; display: inline; padding-right: 0px" border="0" alt="Solfeador: Niveles" src="https://lh3.googleusercontent.com/-ZdinV11ILZ4/V6I2qhh08QI/AAAAAAAANmY/iQnPH-N2Hnw/QuickMemo%25252B_2016-08-03-11-52-59_thumb.png?imgmax=800" width="150" height="244"></a></p> <p> </p> <p>Cada nivel consiste en una serie de notas en el pentagrama, de las cuales tenemos que seleccionar el nombre en la parte inferior de la pantalla. Lo difícil consiste en realizarlo en menos de <strong>40 segundos</strong> para ganar una estrella, menos de <strong>30 para ganar dos</strong>, y menos de <strong>20 consigues 3 estrellas</strong>. Necesitas al menos una estrella para pasar al siguiente nivel. Otra de las dificultades es que por cada error se aumentan 15 segundos de penalización.</p> <p> </p> <p><a href="https://lh3.googleusercontent.com/-biMgVp4kkII/V6I2rf8sc2I/AAAAAAAANmc/jHNwyznV2zw/s1600-h/QuickMemo%25252B_2016-08-03-11-53-08%25255B2%25255D.png"><img title="Nivel 1 Solfeador" style="border-top: 0px; border-right: 0px; background-image: none; border-bottom: 0px; padding-top: 0px; padding-left: 0px; border-left: 0px; display: inline; padding-right: 0px" border="0" alt="Solfeador: NIvel 1" src="https://lh3.googleusercontent.com/-TQadyKvymtk/V6I2sL5LArI/AAAAAAAANmg/JHLVPjVGSlo/QuickMemo%25252B_2016-08-03-11-53-08_thumb.png?imgmax=800" width="150" height="244"></a><a href="https://lh3.googleusercontent.com/-NFj8UEsMYpw/V6I2s8zwKOI/AAAAAAAANmk/9M1X8R1e6RU/s1600-h/QuickMemo%25252B_2016-08-03-11-53-26%25255B2%25255D.png"><img title="Nivel 13 Solfeador" style="border-top: 0px; border-right: 0px; background-image: none; border-bottom: 0px; padding-top: 0px; padding-left: 0px; border-left: 0px; display: inline; padding-right: 0px" border="0" alt="Solfeador: Nivel 13" src="https://lh3.googleusercontent.com/-2B19sCMvUXw/V6I2tVGD59I/AAAAAAAANmo/kuV-USHC8OM/QuickMemo%25252B_2016-08-03-11-53-26_thumb.png?imgmax=800" width="150" height="244"></a></p> <p> </p> <p>En general me parece una excelente forma de ganar velocidad y fluidez al leer partituras. Aunque sí es cierto que se necesita una base para poder utilizar esta aplicación, pues no enseña propiamente como leer partituras, aunque sí nos ayuda a mejorar.</p> <p>Puede ser una excelente forma de incentivar a personas que inician su aprendizaje, o para niños. Aunque los niveles más avanzados pueden llegara a ser un reto para músicos avanzados.</p> <p> </p> <p><a href="https://play.google.com/store/apps/details?id=com.hoardingsinc.solfeador"><strong><font size="3">LINK – Solfeador (Android)</font></strong></a></p>Unknownnoreply@blogger.com2tag:blogger.com,1999:blog-6527148603192637226.post-6140397724508673012016-07-26T16:03:00.001-05:002016-07-26T16:15:51.710-05:00Compases de amalgama<p>Ya hemos estudiado los compases simples, y los compases compuestos. Pero también existe un tercer tipo de compases, los de amalgama. Amalgama se refiere a la mezcla de dos cosas distintas, en este caso dos compases simples, o dos compases compuestos.</p> <blockquote> <p><a href="http://www.7guitarras.com/2016/01/compases-simples.html">Compases simples</a></p> <p><a href="http://www.7guitarras.com/2016/02/compases-compuestos.html">Compases compuestos</a></p></blockquote> <p> </p> <h1></h1> <h5></h5> <h1>Resumen de los compases simples y compuestos</h1> <p>Como resumen los compases simples son aquellos con división binaria , y que en el numerador (parte superior) poseen:</p> <blockquote> <p>2, 3, o 4</p></blockquote> <p>Y los compases compuestos poseen división ternaria, y en el numerador poseen:</p> <blockquote> <p>6, 9, o 12</p></blockquote> <a name='more'></a> <h1></h1> <h1>Teoría</h1> <p>Los compases de amalgama, como ya dijimos, son la unión de otros compases. Podemos unir compases simples entre si, o compases compuestos entre si. No podemos mezclarlos entre si ya que unos poseen división binaria y los otros división ternaria.</p> <p>Sabiendo esto podemos dividir los compases de amalgama en dos: los de amalgama simples ,y los de amalgama compuestos.</p> <p> </p> <h1>Compases de amalgama simples</h1> <p>Estos se obtienen mezclando los valores de los compases simples: 2, 3, y 4. El orden que estos tengan puede cambiar según la pieza y nos podemos guiar por los acentos. Con estas mezclas podemos obtener los valores 5, 7, y 9.</p> <blockquote> <p>5 (2 + 3) o invirtiendo el orden (3 + 2)</p> <p> </p> <p><a href="https://lh3.googleusercontent.com/-EDTs72mjLfg/V5fP_n1eL4I/AAAAAAAANc0/THF06aYXtfU/s1600-h/19%25255B6%25255D.png"><img title="Compás de 5/4" style="border-left-width: 0px; border-right-width: 0px; background-image: none; border-bottom-width: 0px; padding-top: 0px; padding-left: 0px; display: inline; padding-right: 0px; border-top-width: 0px" border="0" alt="5/4" src="https://lh3.googleusercontent.com/-bWpZYweUG1c/V5fQAjqmJgI/AAAAAAAANc4/S4U0rji8yq0/19_thumb%25255B4%25255D.png?imgmax=800" width="644" height="171"></a></p> <p> </p> <p> </p> <p>7 (3 + 4) o invirtiendo el orden (4 + 3)</p></blockquote> <blockquote> <p><a href="https://lh3.googleusercontent.com/-47gNy2nfJN0/V5fQBM6cALI/AAAAAAAANc8/wtnf0zwtnCg/s1600-h/20%25255B3%25255D.png"><img title="Compás de 7/8" style="border-left-width: 0px; border-right-width: 0px; background-image: none; border-bottom-width: 0px; padding-top: 0px; padding-left: 0px; display: inline; padding-right: 0px; border-top-width: 0px" border="0" alt="7/8" src="https://lh3.googleusercontent.com/-M8Lms-mRiMo/V5fQBxlLrlI/AAAAAAAANdA/MPUCtElEZJs/20_thumb%25255B1%25255D.png?imgmax=800" width="644" height="224"></a></p></blockquote> <p>El compas de 9 que estaría formado por 2 + 3 + 4, no se utiliza en la practica porque se confundiría con un compas compuesto. De igual manera un compas de 6 (2 + 4), se confunde con un compas compuesto.</p> <p> </p> <h1>Compases de amalgama compuestos</h1> <p>Estos compases son más teóricos, y utilizados en muy pocas ocasiones. En estos encontraremos numeradores de 15, 21, y 27.</p> <p> </p> <h1>Resumen</h1> <p>En general los compases de amalgama más utilizados son los simples, y entre estos los principales son el de 5/4 y el de 7/8. Aunque recuerda que no hay una regla general para el uso de los compases, y muchas canciones tradicionales de África o Asia ocupan compases que nos parecerían muy extraños. Incluso recuerdo haber tocado una pieza con un compas de 27/4. También pueden revisar el articulo sobre acentos en nuestro <a href="http://www.7guitarras.com/search/label/Dicionario">diccionario musical</a>:</p> <blockquote> <p><a href="http://www.7guitarras.com/2015/02/acento.html"><font size="3"><strong>Acentos</strong></font></a></p></blockquote> <p>Espero que este articulo sea de utilidad. Y no dudes en preguntarnos cualquier duda que tengas.</p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-6527148603192637226.post-39170423205587973892016-05-10T21:11:00.001-05:002016-05-10T21:26:29.860-05:00Triadas e intervalos<p>Las triadas son acordes compuestos por tres notas, son los acordes básicos y más comunes. Existen cuatro tipos de triadas:</p> <blockquote> <p><strong>-mayores</strong></p> <p><strong>-menores</strong></p> <p><strong>-aumentadas</strong></p> <p><strong>-disminuidas</strong></p></blockquote> <p>Cada uno de estos esta formado por <strong>tres notas</strong>, y como hemos estudiado antes, los intervalos son la separación entre dos notas. En el caso de las triadas se forman dos intervalos, y estos intervalos son terceras. Las terceras pueden ser <strong>mayores </strong>o <strong>menores</strong>, y las distintas combinaciones forman los tipos de triadas:</p> <a name='more'></a> <h2> </h2> <h2>Mayores</h2> <p>Están formados por una <strong>tercera mayor</strong> y una <strong>tercera menor</strong>:</p> <p>Por ejemplo “Do mayor” esta formado por las notas: <strong>Do</strong>, <strong>Mi</strong>, y <strong>Sol</strong>. El intervalo de <strong>Do</strong> a <strong>Mi</strong> es una <strong>tercera mayor</strong>, y de<strong> Mi</strong> a <strong>Sol</strong> es una <strong>tercera menor</strong>.</p> <p> </p> <h2>Menores</h2> <p>Están formados por una <strong>tercera menor</strong> y una<strong> tercera mayor</strong>, lo contrario a los mayores:</p> <p>“Do menor” esta formado por <strong>Do</strong>, <strong>Mi bemol</strong>, y<strong> Sol</strong>. Una <strong>tercera menor</strong> (<strong>Do a Mi bemol</strong>) y una <strong>tercera mayor</strong> (<strong>Mi bemol a Sol</strong>).</p> <p> </p> <p><a href="https://lh3.googleusercontent.com/-zG0D8JTkAto/VzKUuvqsz_I/AAAAAAAAMyU/1nrrCtR8peU/s1600-h/17%25255B13%25255D.png"><img title="Triadas mayores y menores" style="border-left-width: 0px; border-right-width: 0px; background-image: none; border-bottom-width: 0px; padding-top: 0px; padding-left: 0px; display: inline; padding-right: 0px; border-top-width: 0px" border="0" alt="Triadas mayores y menores" src="https://lh3.googleusercontent.com/-WFlV1u8n80U/VzKUwNjxiJI/AAAAAAAAMyY/ejWRcLmztH4/17_thumb%25255B5%25255D.png?imgmax=800" width="644" height="205"></a></p> <p> </p> <h2>Aumentados</h2> <p><strong>Dos terceras mayores</strong> forman una triada aumentada:</p> <p>“Do aumentado” esta formado por: <strong>Do</strong>, <strong>Mi</strong>, y <strong>Sol sostenido</strong>. Son dos <strong>terceras mayores</strong> (de <strong>Do</strong> a <strong>Mi,</strong> y de <strong>Mi</strong> a <strong>Sol sostenido</strong>).</p> <p> </p> <h2>Disminuido</h2> <p>Esta formado por<strong> dos terceras menores</strong>:</p> <p>“Do disminuido” esta formado por: <strong>Do</strong>, <strong>Mi bemol</strong>, y <strong>Sol bemol</strong>. Ambas son <strong>terceras menores</strong> (de <strong>Do</strong> a <strong>Mi bemol</strong>, y de <strong>Mi bemol</strong> a <strong>Sol bemol</strong>).</p> <p> </p> <p><a href="https://lh3.googleusercontent.com/-51djFSGPMdM/VzKUxrUYgXI/AAAAAAAAMyc/N61V5xkY8cI/s1600-h/18%25255B13%25255D.png"><img title="Triadas aumentadas y disminuidas" style="border-left-width: 0px; border-right-width: 0px; background-image: none; border-bottom-width: 0px; padding-top: 0px; padding-left: 0px; display: inline; padding-right: 0px; border-top-width: 0px" border="0" alt="Triadas aumentadas y disminuidas" src="https://lh3.googleusercontent.com/-S_WYbsNKcwU/VzKUyzDohHI/AAAAAAAAMyg/wEzp9mvgnAs/18_thumb%25255B5%25255D.png?imgmax=800" width="644" height="194"></a></p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-6527148603192637226.post-52725848090837774512016-04-24T13:32:00.001-05:002016-04-24T13:38:36.367-05:00Invertir intervalos<p><img title="7 Guitarras" alt="7 Guitarras" src="http://lh3.googleusercontent.com/-m-d5F8biS0Q/VXemIscsVoI/AAAAAAAAGxU/tEEGnEB3rV4/11304557_10153457865234063_158160005_n_thumb%25255B8%25255D.jpg"></p> <p>Los intervalos son la base para la <strong>armonía y la melodía</strong>. Los intervalos son simplemente la separación entre dos notas. A esto le damos un nombre: una<strong> grado</strong> (segundo, tercero, etc.) y un <strong>carácter</strong> (mayor, aumentado, etc.). Ya antes hemos estudiado los intervalos, puedes darle un vistazo aquí:</p> <blockquote> <p><a href="http://www.7guitarras.com/2013/01/intervalos-musicales-simples.html"><strong>Intervalos simples – 7 Guitarras</strong></a></p> <p><a href="http://www.7guitarras.com/2013/07/intervalos-compuestos.html"><strong>Intervalos compuestos – 7 Guitarras</strong></a></p></blockquote> <p>El día de hoy aprenderemos a invertir intervalos. En un grupo de dos notas, si tomamos de referencia una de ellas hacia la otra, tenemos un intervalo. Y si tomamos de referencia la otra obtenemos otro intervalo.</p> <p>Ambas notas son las mismas, pero teniendo de referencia la más grave de ellas obtenemos dos intervalos distintos.</p> <p> </p> <h1>Reglas básicas</h1> <p>Al momento de invertir una acorde tenemos que tener en cuenta que:</p> <blockquote> <p>Un intervalo<strong> mayor</strong> se convierte en <strong>menor</strong></p> <p>Un intervalo <strong>menor</strong> se convierte en <strong>mayor</strong></p> <p>Un intervalo <strong>perfecto</strong> continua siendo <strong>perfecto</strong></p> <p>El <strong>tritono</strong> (cuarta aumentada o quinta disminuida) continua siendo <strong>tritono</strong></p></blockquote> <p>Una vez conozcamos el carácter del intervalo, necesitamos saber su grado (número). Para esto debemos saber que ambos intervalos suman nueve. Entonces si a nueve le restamos el primer intervalo, obtenemos su inversión.</p> <blockquote> <p><strong>9 – 2 = 7</strong></p></blockquote> <h1>Ejemplos</h1> <blockquote> <p>-Inversión de <strong>Tercera mayor</strong></p> <p><strong>9 – 3 = 6</strong></p> <p>La inversión es la <strong>Sexta menor</strong></p></blockquote> <blockquote> <p>-Inversión de <strong>Cuarta justa</strong></p> <p><strong>9 – 4 = 5</strong></p> <p>La inversión es la <strong>Quinta justa</strong></p></blockquote> <h1>El tritono</h1> <p>Con el tritono debemos de tener cuidado, ya que es una cuarta aumentada o una quinta disminuida. En su suma algebraica se representa por un 4 1/2</p> <blockquote> <p>Inversión del <strong>Tritono</strong></p> <p><strong>9 – 4 1/2 = 4 1/2</strong></p> <p>La inversión es el mismo<strong> tritono</strong></p></blockquote> <h1>Utilidad</h1> <p>El conocer como invertir intervalos nos es útil a los músicos principalmente en dos ocasiones: cuando <strong>invertimos un acorde</strong> y queremos saber sus intervalos. Y cuando <strong>transponemos </strong>una canción y el intervalo es muy grande, podemos encontrar su inversión para facilitarnos el trabajo.</p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-6527148603192637226.post-29545495031116411832016-02-17T00:37:00.001-06:002016-02-17T00:37:35.805-06:00Compases compuestos<p>Los compases son una parte muy importante al estudiar, leer y ejecutar música, ya que nos muestran de una manera organizada. Ya hemos estudiado en que consisten los compases, y también los compases simple, puedes darle un vistazo aquí:</p> <blockquote> <p><a href="http://www.7guitarras.com/2016/01/compases-simples.html"><strong>Compases simples</strong></a></p></blockquote> <p>Debemos recordad que la nomenclatura de los compases es dada por dos números: un denominador y un numerador. El denominador (abajo) define la duración de las notas:<strong> 2 es una blanca</strong>, <strong>4 una negra</strong>, etc..</p> <p> </p> <h1>¿Qué son los compases compuestos?</h1> <p>Los compases compuestos los podemos diferenciar por el numerador (arriba), este debe de ser <strong>6, 9, o 12.</strong></p> <p><strong></strong> </p> <p><a href="https://lh3.googleusercontent.com/-VIYci2lWS6o/VsQVJDGFw6I/AAAAAAAAK10/oDioAcuHAn8/s1600-h/15%25255B12%25255D.png"><img title="Compases compuestos" style="border-top: 0px; border-right: 0px; background-image: none; border-bottom: 0px; padding-top: 0px; padding-left: 0px; border-left: 0px; display: inline; padding-right: 0px" border="0" alt="compases compuestos" src="https://lh3.googleusercontent.com/-1oEDglDvWvY/VsQVKESwScI/AAAAAAAAK14/ryfCaaWiB60/15_thumb%25255B11%25255D.png?imgmax=800" width="1073" height="154"></a></p> <p> </p> <p>A diferencia de los compases simples estos poseen una división terciaria. Esto significa que cada pulso lo podemos dividir en 3 figuras.</p> <p> </p> <p><a href="https://lh3.googleusercontent.com/-F0LzTxA_Xbs/VsQVK_w7qrI/AAAAAAAAK18/6jdRi4RxwuQ/s1600-h/16%25255B2%25255D.png"><img title="División terciaria" style="border-top: 0px; border-right: 0px; background-image: none; border-bottom: 0px; padding-top: 0px; padding-left: 0px; border-left: 0px; display: inline; padding-right: 0px" border="0" alt="División terciaria" src="https://lh3.googleusercontent.com/-F6VsI6Ad3F4/VsQVLpHNsDI/AAAAAAAAK2A/p96KDSa0Dn0/16_thumb%25255B2%25255D.png?imgmax=800" width="1073" height="125"></a></p> <p> </p> <h1>¿Cuál es la relación entre compases simples y compuestos?</h1> <p>Los compases compuestos los podemos obtener a partir de los compases simples. Para esto debemos realizar una multiplicación, el <strong>numerador por 3</strong> y el <strong>denominador por 2</strong>.</p> <blockquote> <p><strong>2</strong> x 3 = <strong>6</strong></p> <p><strong>4</strong> x 2 = <strong>8</strong></p> <p><strong>2/4 es equivalente a 6/8</strong></p></blockquote> <blockquote> <p><strong>4</strong> x 3 = <strong>12</strong></p> <p><strong>4</strong> x 2 = <strong>8</strong></p> <p><strong>4/4 es equivalente a 12/8</strong></p></blockquote> <p>Como regla mnemotécnica podemos recordar multiplicar por<strong> 3/2</strong> o por “uno y medio”.</p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-6527148603192637226.post-37652447250726871622016-01-30T21:59:00.001-06:002016-01-30T21:59:05.849-06:00Compases simples<p>Los compases nos sirven para ordenar una partitura y facilitar su lectura. Son muy importantes ya que nos permiten agrupar notas, con el mismo número de tiempos. Además de esto nos muestran una guía visual para guiarnos en las partituras. Normalmente cada compas se separa por una línea vertical, llamada barra de compas. A veces se utiliza una doble barra de compas para mostrar la separar partes de una pieza o cambios de tonalidad.</p> <p>Existen 3 distintos de compases: <strong>simples, compuestos y de amalgama</strong>. El día de hoy estudiaremos los compases simples, ya que estos son la base para los otros dos tipos.</p> <p> </p> <h1>¿Como es la nomenclatura?</h1> <p>Los compases están indicados por dos números al inicio de una partitura, un<strong> numerador</strong> y un <strong>denominador</strong>. El numerador (arriba) indica la <strong>cantidad de figuras</strong> en un compas. El denominador (abajo) indica la <strong>duración de cada figura</strong>:</p> <blockquote> <p>1 – redonda</p> <p>2 – blanca</p> <p>4 – negra</p> <p>8 – corchea</p></blockquote> <p><a href="https://lh3.googleusercontent.com/-9g-TtExxlhk/Vq2Gesp8OzI/AAAAAAAAKwQ/QtqSGCel7Xo/s1600-h/143.png"><img title="Compases simples" style="border-left-width: 0px; border-right-width: 0px; background-image: none; border-bottom-width: 0px; padding-top: 0px; padding-left: 0px; display: inline; padding-right: 0px; border-top-width: 0px" border="0" alt="compases simples" src="https://lh3.googleusercontent.com/-0DdoFYiXjH0/Vq2GfZIWceI/AAAAAAAAKwY/h6TqJ8jwSOA/14_thumb1.png?imgmax=800" width="644" height="143"></a></p> <p>Los denominadores mas comunes son el de <strong>negra</strong> y el de <strong>corchea</strong>.</p> <a name='more'></a> <h1>¿Qué son los compases simples?</h1> <p>Los compases simples son aquellos que en su <strong>numerador</strong> tiene un <strong>2, 3 o 4</strong>. Estos son los compases más comunes, y se utilizan en una gran cantidad de ritmos musicales.</p> <p>La principal característica de los compases simples es que cada tiempo se puede <strong>dividir en dos figuras</strong>, una división<strong> binaria</strong>. Por ejemplo:</p> <p><a href="https://lh3.googleusercontent.com/-ZxnF1V8kOJw/Vq2GfzfK26I/AAAAAAAAKwc/kj2t5xTEbS4/s1600-h/133.png"><img title="División binaria" style="border-left-width: 0px; border-right-width: 0px; background-image: none; border-bottom-width: 0px; padding-top: 0px; padding-left: 0px; display: inline; padding-right: 0px; border-top-width: 0px" border="0" alt="División binaria" src="https://lh3.googleusercontent.com/-W6-nR50lLHc/Vq2GgjDlNzI/AAAAAAAAKwo/O8PDqEkVe1g/13_thumb1.png?imgmax=800" width="644" height="137"></a></p> <p> </p> <h1>Los compases más comunes</h1> <p>Los compases de <strong>4/4 y 2/4</strong> al ser los más comunes se pueden escribir de una manera distinta: por medio de una “<strong>C</strong>” y una “<strong>C</strong>” con una <strong>línea cortándolo</strong> por la mitad, respectivamente.</p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-6527148603192637226.post-29344525489605215572016-01-24T18:50:00.001-06:002016-01-24T19:42:38.091-06:00Guía de Guitar Pro - Parte 3<p>Las escalas son una de las bases para el estudio de cualquier instrumento y de la música en general, y el programa Guitar Pro también nos ayuda en esto con una excelente herramienta, aunque principalmente nos sirve para guitarra, bajo o piano. Ya en las dos primeras partes hablamos sobre las diferentes versiones de Guitar Pro y sobre su herramienta de acordes:</p> <blockquote> <p><a href="http://www.7guitarras.com/2015/07/guia-de-guitar-pro-parte-1.html">Guía de Guitar Pro – Parte 1</a></p> <p><a href="http://www.7guitarras.com/2015/10/guia-de-guitar-pro-parte-2.html">Guía de Guitar Pro – Parte 2</a> </p></blockquote> <a name='more'></a> <h1>Mostrar el mástil y el teclado</h1> <p>El primer paso es mostrar en la pantalla el mástil y el teclado. En la versión 5 tenemos que hacer clic en el menú “<strong>pantalla</strong>” y luego hacer clic en <strong>cada una de las herramientas</strong>. luego las podemos mover para acomodarlas mejor a nuestra pantalla.</p> <p><a href="https://lh3.googleusercontent.com/-ky4dNbOE2d8/VqVxE9rgqQI/AAAAAAAAKqU/zZ1vFjpQYbc/s1600-h/74.png"><img title="Mástil y teclado" style="border-left-width: 0px; border-right-width: 0px; background-image: none; border-bottom-width: 0px; padding-top: 0px; padding-left: 0px; display: inline; padding-right: 0px; border-top-width: 0px" border="0" alt="Guitar Pro 5 mastil" src="https://lh3.googleusercontent.com/-pQBlQjuYrno/VqVxGM_ngkI/AAAAAAAAKqc/xm8CdzdT-5I/7_thumb2.png?imgmax=800" width="644" height="382"></a></p> <p>En la versión 6 tenemos que hacer clic en “<strong>view</strong>” y luego en “<strong>instrument panel</strong>”. En esta versión el panel cambia automáticamente al instrumento que seleccionemos.</p> <p><a href="https://lh3.googleusercontent.com/-hnSk9-Evgeo/VqVxG7bJeKI/AAAAAAAAKqk/O5xNR3YAC8E/s1600-h/84.png"><img title="Panel de instrumentos" style="border-left-width: 0px; border-right-width: 0px; background-image: none; border-bottom-width: 0px; padding-top: 0px; padding-left: 0px; display: inline; padding-right: 0px; border-top-width: 0px" border="0" alt="Guitar Pro 6" src="https://lh3.googleusercontent.com/-AjzAnDAlEIM/VqVxIMTl2vI/AAAAAAAAKqs/Sl6y2--fMqQ/8_thumb2.png?imgmax=800" width="644" height="423"></a></p> <h1> </h1> <h1>Seleccionar la escala</h1> <p>Ahora tenemos que seleccionar que escala deseamos practicar, les recomiendo que comiencen por las <strong>escalas mayores, menores y pentatónicas</strong>. Ya con un poco más de experiencia pueden continuar con las <strong>armónicas y melódicas</strong>.</p> <p>En <strong>ambas</strong> versiones del programa debes de hacer clic en “<strong>escalas</strong>” luego seleccionar la <strong>tonalidad</strong> y el <strong>tipo de escala</strong>.</p> <p><a href="https://lh3.googleusercontent.com/-ZOxXN2A9Nbs/VqVxI0431NI/AAAAAAAAKq0/VE-5lVtx0-U/s1600-h/912.png"><img title="9" style="border-left-width: 0px; border-right-width: 0px; background-image: none; border-bottom-width: 0px; padding-top: 0px; padding-left: 0px; display: inline; padding-right: 0px; border-top-width: 0px" border="0" alt="9" src="https://lh3.googleusercontent.com/-CJOPozAmDkw/VqVxJtGMXZI/AAAAAAAAKq8/yEhZIQl34PU/9_thumb10.png?imgmax=800" width="404" height="303"></a></p> <p> </p> <p><a href="https://lh3.googleusercontent.com/-KTZFLPQnfR0/VqVxK9oZrfI/AAAAAAAAKrE/p_N8PMxwdEE/s1600-h/104.png"><img title="10" style="border-left-width: 0px; border-right-width: 0px; background-image: none; border-bottom-width: 0px; padding-top: 0px; padding-left: 0px; display: inline; padding-right: 0px; border-top-width: 0px" border="0" alt="10" src="https://lh3.googleusercontent.com/-57EMEAVnc38/VqVxL-F6vHI/AAAAAAAAKrM/XufmR9od0a8/10_thumb2.png?imgmax=800" width="404" height="344"></a></p> <p> </p> <p> </p> <h1>Seleccionar el instrumento</h1> <p>Aunque el programa esta diseñado para guitarras también nos sirve para otros instrumentos con mástil (bajos, ukuleles, banjos, mandolina, etc.) o de teclado.</p> <p>En la versión 6 es muy sencillo ya que solo debemos <strong>crear una nueva pista</strong>, seleccionar el instrumento y el numero de cuerdas; y <strong>automáticamente</strong> el panel de instrumento se modifica.</p> <p> </p> <p><a href="https://lh3.googleusercontent.com/-x-K6mBN2WgE/VqVxM5QIo0I/AAAAAAAAKrU/fii_G6I71Qc/s1600-h/116.png"><img title="Añadir instrumento" style="border-left-width: 0px; border-right-width: 0px; background-image: none; border-bottom-width: 0px; padding-top: 0px; padding-left: 0px; display: inline; padding-right: 0px; border-top-width: 0px" border="0" alt="Guitar Pro 6" src="https://lh3.googleusercontent.com/-8z9F4oxc2NE/VqVxN0WSsJI/AAAAAAAAKrc/ssnlHM5TRoI/11_thumb2.png?imgmax=800" width="464" height="484"></a></p> <p> </p> <p>En la versión 5 es un poco más complicado. El panel de teclado se mantiene juntamente con el de mástil. Lo único que tenemos que hacer es dar doble clic en la pista que deseemos y <strong>cambiar el numero de cuerdas del instrumento y afinación.</strong></p> <p><a href="https://lh3.googleusercontent.com/-Q5OWyYLyJdY/VqVxO4dMA_I/AAAAAAAAKrk/GVUYiv9uttM/s1600-h/126.png"><img title="Añadir instrumento" style="border-left-width: 0px; border-right-width: 0px; background-image: none; border-bottom-width: 0px; padding-top: 0px; padding-left: 0px; display: inline; padding-right: 0px; border-top-width: 0px" border="0" alt="Guitar Pro 5" src="https://lh3.googleusercontent.com/-Vpm5Ew5juTc/VqVxP4WwHrI/AAAAAAAAKrs/ZkgzPZNkC0c/12_thumb2.png?imgmax=800" width="449" height="484"></a></p> <p> </p> <p>Si te ha sido útil esta Guía <strong>compártela</strong> con tus amigos, y si tienes alguna duda déjala en los <strong>comentarios</strong>.</p>Unknownnoreply@blogger.com5tag:blogger.com,1999:blog-6527148603192637226.post-24721052145167643092016-01-18T19:56:00.001-06:002016-01-18T20:08:49.657-06:00Partituras de música clásica<p><a href="https://lh3.googleusercontent.com/-7cdz-NbFde8/Vp2XpB6kNXI/AAAAAAAAKno/aihgd-RjVE8/s1600-h/Screenshot_2016-01-16-09-00-4915.png"><img title="Biblioteca musical" style="border-left-width: 0px; border-right-width: 0px; background-image: none; border-bottom-width: 0px; padding-top: 0px; padding-left: 0px; display: inline; padding-right: 0px; border-top-width: 0px" border="0" alt="IMSLP" src="https://lh3.googleusercontent.com/-tZDUXXxhGtM/Vp2XqazfgbI/AAAAAAAAKnw/Bs-TZU1RYNo/Screenshot_2016-01-16-09-00-49_thumb.png?imgmax=800" width="454" height="261"></a></p> <p>En estos tiempos modernos, con la ayuda del internet, es muy fácil encontrar una partitura de casi cualquier obra reconocida. Estamos saturados de tanta información, lo cual en cierta forma es bueno, ya que hace 50 años teníamos que investigar en bibliotecas, comprar partituras, etc., y ahora con una simpe búsqueda en internet o con una compra en línea podemos obtener una gran cantidad de información.</p> <p>El problema radica en la calidad de esta información. No es raro encontrarse con una partituras con <strong>movimientos faltantes</strong>, sin indicaciones de <strong>dinámica</strong> o <strong>tempo</strong>, con <strong>notas incorrectas</strong>, o incluso en <strong>tonalidades distintas</strong> a las originales. Me ha sucedido varias veces, e incluso me ha dado problemas al aprender de una manera incorrecta la pieza, y es más difícil corregir una pieza mal aprendida que aprender una pieza nueva.</p> <p>El día de hoy veremos algunos sitios y consejos para que sepas adonde puedes descargar partituras de mejor calidad.</p> <p> </p> <h1>IMSLP</h1> <p><a href="https://lh3.googleusercontent.com/-n7_y5Ibpk2k/Vp2XrCdPXvI/AAAAAAAAKn4/-dcm8tbGt5k/s1600-h/Screenshot_2016-01-16-09-03-584.png"><img title="Partituras" style="border-left-width: 0px; border-right-width: 0px; background-image: none; border-bottom-width: 0px; padding-top: 0px; padding-left: 0px; display: inline; padding-right: 0px; border-top-width: 0px" border="0" alt="IMSLP partituras" src="https://lh3.googleusercontent.com/-8Nrz-OZz-nY/Vp2XsJeJ4xI/AAAAAAAAKoA/WvQ1YBthIaQ/Screenshot_2016-01-16-09-03-58_thumb.png?imgmax=800" width="554" height="348"></a></p> <p>“<strong>International music score library project</strong>”, algo así como: “Proyecto de biblioteca de partituras musicales internacional”. Es un sitio web que se encarga de recopilar partituras y grabaciones, cuando es posible, de una gran cantidad de compositores. Tienen en su base de datos más de <strong>300 mil partituras</strong>. También es conocida como “Biblioteca musical Ottaviano Petrucci”.</p> <p>Lo interesante de este sitio web es que la organización existe únicamente con el propósito de recopilar partituras y administrar el sitio web, y son cuidadosos con las fuentes en las que las obtienen.</p> <p>Además de esto en cada partitura nos muestra los <strong>derechos de autor</strong> de cada una. Así sabemos si una partitura es de dominio publico, para uso no comercial, etc..</p> <p>También podemos ver información del compositor, la tonalidad de la pieza, duración promedio, etc.. Y en algunos casos además de la partitura podemos encontrar grabaciones de la ejecución, en audio o video, o incluso archivos MIDI.</p> <p> </p> <p><a href="https://lh3.googleusercontent.com/-HpHllqqT3iA/Vp2Xsjnug9I/AAAAAAAAKoE/BkLNwlKIXR4/s1600-h/Screenshot_2016-01-16-09-04-146.png"><img title="Grabaciones y audio" style="border-left-width: 0px; border-right-width: 0px; background-image: none; border-bottom-width: 0px; padding-top: 0px; padding-left: 0px; display: inline; padding-right: 0px; border-top-width: 0px" border="0" alt="IMSLP Grabaciones y audio" src="https://lh3.googleusercontent.com/-0gGWmdQUWSo/Vp2XtU9YIOI/AAAAAAAAKoQ/Mbb5ZWbbA9Q/Screenshot_2016-01-16-09-04-14_thumb.png?imgmax=800" width="504" height="179"></a></p> <p> </p> <p><strong><u><font size="3"><a href="http://imslp.org/wiki/P%C3%A1gina_principal">Link - IMSLP.org</a></font></u></strong></p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-6527148603192637226.post-82057229905543573302015-11-08T12:14:00.001-06:002015-11-08T13:13:32.702-06:00Problemas con la perilla de volumen<p>Al pasar el tiempo, y con el uso que le damos a nuestros instrumentos, algunas de sus partes necesitan mantenimiento, y en algunos casos remplazar ciertas piezas. En el caso de la guitarra eléctrica, es muy común que sus elementos electrónicos se desgasten y comiencen a fallar.</p> <p>Un claro ejemplo son las<strong> perillas de volumen y tono</strong> de nuestras guitarras. Muchas veces estas comienzan a producir <strong>ruidos al girarlas</strong>. El día de hoy veremos un tip muy útil y fácil para evitar este ruido.</p> <h2> </h2> <h2>Cuando la pieza no esta dañada</h2> <p>Las perillas de volumen están formadas por un <strong>potenciómetro</strong> y una<strong> cubierta</strong> plástica o metálica.</p> <p><img title="Perillas" alt="Perillas de volumen y tono" src="http://lh4.ggpht.com/-AjxsHUVndtc/Tzyg3EmXVtI/AAAAAAAABO8/20Pzydq8g6Q/Potenciometros-Gibson-Les-P_thumb%25255B1%25255D.gif?imgmax=800"></p> <p><img title="Potenciómetros" alt="Potenciometros" src="http://lh6.ggpht.com/-aajazT504Q4/Tzyg6BkZu8I/AAAAAAAABPc/GKpp2_FLg24/IMG_2215_thumb.jpg?imgmax=800" width="240" height="181"></p> <p>Dicho potenciómetro con el paso del tiempo sus componentes internos llegan a<strong> oxidarse</strong>, este oxido es el que provoca los molestos ruidos al girarlo.</p> <p>Una solución muy sencilla y barata para tratar de combatir el oxido es utilizando un poco de <strong>WD-40</strong>, un lubricante en espray que posee propiedades antioxidantes. En su defecto también podemos utilizar <strong>aceite 3 en 1</strong>, el cual también posee dichas propiedades.</p> <p><a href="http://lh3.googleusercontent.com/-9XaPNQBkpy4/Vj-RCrDznVI/AAAAAAAAITI/wSmbnXROBiU/s1600-h/55-020-ACEITE-3-EN-1-PRESENTACION-DE%25255B1%25255D.jpg"><img title="Aceite 3 en 1" style="border-left-width: 0px; border-right-width: 0px; background-image: none; border-bottom-width: 0px; padding-top: 0px; padding-left: 0px; display: inline; padding-right: 0px; border-top-width: 0px" border="0" alt="aceite 3 en 1" src="http://lh3.googleusercontent.com/-IsKx_oDU-20/Vj-RDawXozI/AAAAAAAAITM/i0aMAlkpP0g/55-020-ACEITE-3-EN-1-PRESENTACION-DE.jpg?imgmax=800" width="244" height="204"></a><a href="http://lh3.googleusercontent.com/-cYntopdBKC8/Vj-REF2myQI/AAAAAAAAITY/nI721p1Iv9g/s1600-h/wd40-5004.jpg"><img title="WD-40" style="border-left-width: 0px; border-right-width: 0px; background-image: none; border-bottom-width: 0px; padding-top: 0px; padding-left: 0px; display: inline; padding-right: 0px; border-top-width: 0px" border="0" alt="lubricante wd-40" src="http://lh3.googleusercontent.com/-lG6395ccG6c/Vj-REjQzcVI/AAAAAAAAITg/xxAWYrWUIgg/wd40-500_thumb2.jpg?imgmax=800" width="102" height="244"></a></p> <p>Primero debes retirar la cubierta del potenciómetro. Y luego debes de aplicar una <strong>pequeña cantidad</strong> de lubricante y <strong>girarlo</strong> varias veces para que el lubricante se esparza en toda la pieza.</p> <p>Una buena idea es <strong>cubrir nuestra guitarra</strong> con una toalla o paño, para evitar que los químicos dañen el acabado del instrumento.</p> <p> </p> <h2>Si la pieza esta dañada</h2> <p>Si lo anterior no ha funcionado, y la guitarra aun sigue haciendo ruidos, significa que la pieza necesita ser <strong>cambiada</strong>. Si tienes un poco de experiencia en electrónica te será muy fácil.</p> <p>Si no te sientes cómodo cambiando tu mismo la pieza puedes llevarla a alguna tienda de música que dé el servicio de mantenimiento, o donde un<strong> lutier</strong>.</p><br> <center><script async src="//pagead2.googlesyndication.com/pagead/js/adsbygoogle.js"></script><!-- bloque de enlaces prueba --><ins class="adsbygoogle" style="height: 15px; width: 468px; display: inline-block" data-ad-client="ca-pub-4394600451934103" data-ad-slot="6058982775"></ins><script><br />(adsbygoogle = window.adsbygoogle || []).push({});<br /></script><br></center> Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-6527148603192637226.post-64146113424732324602015-10-14T22:16:00.001-05:002015-10-14T22:25:23.637-05:00Acordes novena y acordes con novena<p><a href="http://lh3.googleusercontent.com/-w1EStMdsS1g/Vh8alNvjdNI/AAAAAAAAHrM/7NpyMUYQzKo/s1600-h/2015-10-14%25252008.18.55%2525202%25255B9%25255D.jpg"><img title="7 Guitarras" style="border-top: 0px; border-right: 0px; background-image: none; border-bottom: 0px; padding-top: 0px; padding-left: 0px; border-left: 0px; display: inline; padding-right: 0px" border="0" alt="Monique, Beatrix y Maryam" src="http://lh3.googleusercontent.com/-pcENFFIzjK8/Vh8amUw29RI/AAAAAAAAHrU/W8IB3P933_U/2015-10-14%25252008.18.55%2525202_thumb%25255B7%25255D.jpg?imgmax=800" width="197" height="244"></a></p> <p>Hoy aprenderemos la diferencia entre estos dos tipos de acordes. Aunque es muy sutil es importante conocerla. La diferencia radica en que unos son acordes <strong>completos</strong>, y a los otros solo se les añade una nota. De igual manera que sucede con los acordes novena, también los <strong>acordes 11</strong> y los <strong>acordes 13</strong>, tienen sus variantes: acordes <strong>con 11</strong> y acordes <strong>con 13</strong>.</p> <p>En los ejemplos utilizaremos como base el acorde “<strong>Do mayor</strong>”.</p> <p> </p> <h2>Acordes novena</h2> <p>El acorde de Do novena esta formado por el acorde Do séptima, al que se le añade una novena.</p> <blockquote> <p>Do séptima (C7):<strong> Do – Mi – Sol – La sostenido</strong></p> <p>Do novena (C9): <strong>Do – Mi – Sol – La sostenido – Re</strong></p></blockquote> <h2>Acordes con novena</h2> <p>El acorde Do con novena esta formado por el acorde Do mayor, y le añadimos la novena</p> <blockquote> <p>Do mayor (C): <strong>Do – Mi – Sol</strong></p> <p>Do con novena (C add9): <strong>Do – Mi – Sol – Re</strong></p></blockquote> <p> </p> <p>De esta manera podemos apreciar que la diferencia es muy sencilla: en los acordes completos se debe de ir añadiendo <strong>todas las notas</strong>, en cambio a los acordes “<strong>add</strong>” solo debemos añadirle la <strong>nota especificada</strong>.</p> <p> </p> <h2>Acordes 11 – Acordes 13</h2> <p>Estos acordes es prácticamente imposible utilizarlos en la guitarra, excepto que utilicemos afinaciones alternativas y/o guitarras con más de 6 cuerdas.</p> <blockquote> <p>Do decimo primera (C11): <strong>Do – Mi – Sol – La sostenido – Re – Fa</strong></p> <p>Do decimo tercera (C13): <strong>Do – Mi – Sol – La sostenido – Re – Fa – La</strong></p></blockquote> <h2>Acordes con 11 – Acordes con 13</h2> <blockquote> <p>Do con decimo primera (C add11):<strong> Do – Mi – Sol – Fa</strong></p> <p>Do con decimo tercera (C add13): <strong>Do – Mi – Sol – La</strong></p></blockquote> <h2> </h2> <h2>Uso en la guitarra</h2> <p>Los acordes completos son muy difíciles de ejecutar, o imposibles, en la guitarra. Su uso radica principalmente en los arpegios, ejecutando sus notas una seguida de la otra, y no al mismo tiempo. Estos arpegios son igualmente útiles en otras técnicas como el “<em><strong>sweep picking</strong></em>” y el “<strong><em>tapping</em></strong>”.</p> <p>Los acordes con notas añadidas se pueden utilizar para armonizar diferente una progresión de acordes.</p> <p> </p> <h2>Tip</h2> <p>Una manera fácil de reconocer la 9, 11, y 13; es recordar que estas son las mismas notas de la escala de la tónica, pero una octava más alta. Ejemplos para el acorde “Do mayor”:</p> <blockquote> <p>La <strong>novena</strong> es equivalente a la<strong> segunda mayor</strong> (Re – D)</p> <p>La <strong>decimo primera</strong> es equivalente a la <strong>cuarta justa</strong> (Fa – F)</p> <p>La <strong>decimo tercera</strong> es equivalente a la <strong>sexta mayor</strong>(La – A)</p></blockquote> Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-6527148603192637226.post-70162228630911402692015-10-03T18:55:00.001-05:002015-10-03T18:59:10.283-05:00Guía de Guitar Pro - Parte 2<p>Esta vez aprenderemos a usar una de las más completas herramientas de Guitar Pro, y lamentablemente una de las menos conocidas. Ya en la primera parte vimos las versiones más conocidas de Guitar Pro, y cuales son sus ventajas y desventajas,en las siguientes partes de esta guía veremos las principales herramientas, pueden darle un vistazo a la primera parte:</p> <blockquote> <p><a href="http://www.7guitarras.com/2015/07/guia-de-guitar-pro-parte-1.html">Guía de Guitar Pro – Parte 1</a></p></blockquote> <p> </p> <p>El día de hoy es la herramienta que aprenderemos a usar es la herramienta <strong>“Acordes”.</strong></p> <p> </p> <h2>¿Donde está la herramienta Acordes?</h2> <p>Esta herramienta esta disponible en las dos versión es que vimos en la primera parte. La podemos encontrar en <strong>“la barra de menús”</strong>, en la pestaña de <strong>“notas”.</strong></p> <p><a href="http://lh3.googleusercontent.com/-N8M-IkIY78Y/VhBqyseM6XI/AAAAAAAAHlw/ibeQSskWQ88/s1600-h/1%25255B13%25255D.png"><img title="Guitar Pro 6 - acordes" style="border-top: 0px; border-right: 0px; background-image: none; border-bottom: 0px; padding-top: 0px; padding-left: 0px; border-left: 0px; display: inline; padding-right: 0px" border="0" alt="Guitar pro 6" src="http://lh3.googleusercontent.com/-Ax26do_z_9A/VhBqziQH4SI/AAAAAAAAHl4/IT6Le3aPnTo/1_thumb%25255B11%25255D.png?imgmax=800" width="304" height="317"></a><a href="http://lh3.googleusercontent.com/-ZFV5iSiHBj4/VhBq0auCm0I/AAAAAAAAHmA/e3z8b_n5Wt0/s1600-h/2%25255B4%25255D.png"><img title="Guitar Pro 5 - acordes" style="border-top: 0px; border-right: 0px; background-image: none; border-bottom: 0px; padding-top: 0px; padding-left: 0px; border-left: 0px; display: inline; padding-right: 0px" border="0" alt="Guitar pro 5" src="http://lh3.googleusercontent.com/-IIszPlWLcuM/VhBq1HwT84I/AAAAAAAAHmI/fE3tmVeZzFo/2_thumb%25255B2%25255D.png?imgmax=800" width="306" height="364"></a></p> <p>Una manera más fácil de abrir esta herramienta es presionando la tecla <strong>“A”,</strong> lo cual nos abrirá automáticamente la herramienta.</p> <p> </p> <h2>¿Como utilizarla?</h2> <p>La principal función es cuando necesitamos saber como esta formado determinado acorde, y como lo podemos realizar en el mástil. Lo bueno de esta herramienta es la gran cantidad de opciones de personalización.</p> <p> </p> <h3>En la primera mitad tenemos las siguientes funciones:</h3> <p><a href="http://lh3.googleusercontent.com/-feD-G0TvSTQ/VhBq10Tpf1I/AAAAAAAAHmQ/HerhXCxwx7w/s1600-h/3%25255B8%25255D.png"><img title="Funciones principales" style="border-top: 0px; border-right: 0px; background-image: none; border-bottom: 0px; padding-top: 0px; padding-left: 0px; border-left: 0px; display: inline; padding-right: 0px" border="0" alt="guitar pro 5 principales" src="http://lh3.googleusercontent.com/-fcUw00gNIfs/VhBq2jzKlJI/AAAAAAAAHmY/xGZlmqaD2SE/3_thumb%25255B6%25255D.png?imgmax=800" width="429" height="330"></a></p> <p>-Primero de debemos seleccionar la tónica (la nota principal del acorde).</p> <p>-Luego seleccionamos que tipo de acorde queremos: mayor, menor, aumentado, sexta, séptima, etc..</p> <p>-La siguiente opción es hacer el acorde novena, onceava, o treceava. O simplemente añadirle la nota.</p> <p>-También podemos aumentar o disminuir un semitono a la nota agregada.</p> <p>-Seleccionar que nota queremos que sea el bajo, o que inversión queremos.</p> <p> </p> <h3>La segunda parte nos muestra opciones más graficas:</h3> <p><a href="http://lh3.googleusercontent.com/-GI4jKU9Xk2w/VhBq3bHb10I/AAAAAAAAHmg/--HNSFXaA-E/s1600-h/4%25255B4%25255D.png"><img title="Funciones gráficas" style="border-top: 0px; border-right: 0px; background-image: none; border-bottom: 0px; padding-top: 0px; padding-left: 0px; border-left: 0px; display: inline; padding-right: 0px" border="0" alt="guitar pro 5 graficas" src="http://lh3.googleusercontent.com/-msZwFZ4IM3Q/VhBq4ITPqeI/AAAAAAAAHmo/Q-B-NxUFMnc/4_thumb%25255B2%25255D.png?imgmax=800" width="429" height="330"></a></p> <p>-Tenemos las posiciones de nuestros dedos en el mástil.</p> <p>-También los distintos nombres que tiene un mismo acorde</p> <p>-Y miniaturas de las distintas posiciones que podemos escoger.</p> <p> </p> <h2>¿Como buscar un acorde?</h2> <p>Hay do maneras de buscar un acorde. La primera es seleccionándolo de una partitura ya escrita, y luego presionando la tecla “A”, esto nos abrirá la herramienta de acordes con el nombre del acorde seleccionado.</p> <p>La otra manera es dibujando el acorde en la ventana de la herramienta de acordes, lo cual nos mostrara los nombres que posee dicho acorde.</p> <p> </p> <h2>Consejos</h2> <p>En la versión 5 podemos añadir los acordes que estaremos utilizando frecuentemente, haciendo clic en el signo + en la ventana de la herramienta.</p> <p><a href="http://lh3.googleusercontent.com/-Numeqj1N4h8/VhBq438U2XI/AAAAAAAAHmw/D5jVthN8oHw/s1600-h/5%25255B2%25255D.png"><img title="Acordes frecuentes" style="border-top: 0px; border-right: 0px; background-image: none; border-bottom: 0px; padding-top: 0px; padding-left: 0px; border-left: 0px; display: inline; padding-right: 0px" border="0" alt="Guitar pro 5 frecuentes" src="http://lh3.googleusercontent.com/-FW8Q3IXAQB8/VhBq5YkEiVI/AAAAAAAAHm4/JDusNgHCGt4/5_thumb.png?imgmax=800" width="0" height="0"></a></p> <p>En la versión 6 es mucho más fácil realizar esto, ya que posee una pestaña de acordes frecuentes. De igual manera solo debemos hacer clic en el signo + y seleccionar el acorde que deseemos añadir.</p> <p><a href="http://lh3.googleusercontent.com/-bn0aPipea-Y/VhBq6GZ4xNI/AAAAAAAAHnA/3HSzpWw5cao/s1600-h/6%25255B2%25255D.png"><img title="Acordes frecuentes" style="border-top: 0px; border-right: 0px; background-image: none; border-bottom: 0px; padding-top: 0px; padding-left: 0px; border-left: 0px; display: inline; padding-right: 0px" border="0" alt="guitar pro 6 frecuentes" src="http://lh3.googleusercontent.com/-Xfq1k1KlLm4/VhBq63s4unI/AAAAAAAAHnI/OWBtv8v8MkQ/6_thumb.png?imgmax=800" width="0" height="0"></a></p> Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-6527148603192637226.post-58673335921364619352015-07-28T20:40:00.001-05:002016-01-24T19:39:04.162-06:00Guía de Guitar Pro - Parte 1<p>Guitar Pro es un programa para Windows,que nos permite <strong>leer</strong>, <strong>editar y escuchar</strong> partituras y tablaturas. Pero eso no es todo lo que puedes hacer con este software, también puede ser una gran ayuda a la hora de componer, transponer y estudiar.</p> <p>En esta guía aprenderemos a sacar el mayor provecho de este programa, también aprenderemos las principales funciones, herramientas, las distintas versiones, algunos trucos, y sitio web desde los cuales podemos descargar partituras.</p> <h2>Distintas versiones</h2> <p>Hay dos versiones reciente que recomiendo: la<strong> versión 5</strong> y la <strong>versión 6</strong>. Cada una con sus ventajas y desventajas. En lo personal utilizo ambas de acuerdo a mis necesidades.</p> <p>El programa es de pago, y solo se encuentra disponible para comprar la versión 6. La piratería no es buena, pero muchas veces el software es muy caro, o no se encuentra disponible para comprar en nuestros países, así que si deseas descargarlo con una búsqueda en Google lo puedes encontrar.</p> <h2>Versión 5</h2> <p><a href="http://lh3.googleusercontent.com/-haGrok2H718/Vbgu4X4o14I/AAAAAAAAHI4/z1WjMvwf0x4/s1600-h/903.png"><img title="Guitar pro 5" style="border-left-width: 0px; border-right-width: 0px; background-image: none; border-bottom-width: 0px; padding-top: 0px; padding-left: 0px; display: inline; padding-right: 0px; border-top-width: 0px" border="0" alt="guitar pro 5" src="http://lh3.googleusercontent.com/-rQVZpyth10Q/Vbgu5p-JWKI/AAAAAAAAHJA/0lwEEeieGfk/90_thumb1.png?imgmax=800" width="544" height="337"></a></p> <p>Esta es la versión que más recomiendo ya que es genial para computadores con especificaciones estándar, no necesitas un computador tan poderoso.</p> <p>Las principales ventajas de esta versión son: la<strong> velocidad</strong> con la que carga y trabaja en general, nos da casi <strong>todas</strong> las características que la otra versión.</p> <p>Las desventajas son: su aspecto no es tan agradable como la otra versión, y el sonido solo lo podemos escuchar como <strong>MIDI</strong>.</p> <h2>Versión 6</h2> <p><a href="http://lh3.googleusercontent.com/-h67sHpRYOx4/Vbgu8AjoyeI/AAAAAAAAHJI/NzCUUKR3RPY/s1600-h/914.png"><img title="Guitar pro 6" style="border-left-width: 0px; border-right-width: 0px; background-image: none; border-bottom-width: 0px; padding-top: 0px; padding-left: 0px; display: inline; padding-right: 0px; border-top-width: 0px" border="0" alt="guitar pro 6" src="http://lh3.googleusercontent.com/-u0WjHwZCxLA/Vbgu9Qkl4XI/AAAAAAAAHJQ/_2BlMaUddPc/91_thumb2.png?imgmax=800" width="545" height="345"></a></p> <p>Esta versión necesita un mejor computador, e incluso en algunos computadores poderosos es un poco lento.</p> <p>Las ventajas de esta versión son: el mejor aspecto, la inclusión de <strong>sonidos reales</strong>, pedales de<strong> efectos</strong>, y trabajar con <strong>pestañas </strong>varias partituras.</p> <p>Las desventajas son: la velocidad de carga, la cantidad de espacio que ocupa en el disco duro, el precio y la dificultad de encontrarlo en internet.</p> <p> </p> <h1>Próximas partes</h1> <p><a href="http://www.7guitarras.com/2015/10/guia-de-guitar-pro-parte-2.html"><font size="3"><strong>Parte 2</strong></font></a></p> <p><a href="http://www.7guitarras.com/2016/01/guia-de-guitar-pro-parte-3.html"><font size="3"><strong>Parte 3</strong></font></a></p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-6527148603192637226.post-14145885053049061882015-07-04T19:30:00.001-05:002015-07-04T19:44:33.731-05:00Ensayar frente al espejo<p>Uno de los primeros consejos que me dieron cuando iniciaba con la guitarra fue este, ensaya frente a un espejo. Y es algo que llevo haciendo muchos años, siempre hay un espejo frente a mi banco de ensayo. El objetivo de ensayar frente a un espejo es el poder observar los errores en la posición de nuestros brazos, manos ,dedos, y cuerpo en general.</p> <p>Y es algo que se debe de recomendar a todos los principiantes, ya que es el periodo donde se crean malos vicios con respecto a la posición, y son muy difíciles de reparar una vez aprendidos. Es como el viejo refrán: <em>"Un árbol que nace torcido, jamás de endereza”.</em></p> <p><em><a href="http://lh3.googleusercontent.com/-iwmGCUwHd9c/VZh6iGJXZHI/AAAAAAAAHAo/NVl-nBalkzE/s1600-h/08a6e792ef95b80ed4bbcf978fad5f94%25255B4%25255D.jpg"><img title="Guitarra espejo" style="border-top: 0px; border-right: 0px; background-image: none; border-bottom: 0px; padding-top: 0px; padding-left: 0px; border-left: 0px; display: inline; padding-right: 0px" border="0" alt="guitarra espejo" src="http://lh3.googleusercontent.com/-NoN2yrsNNaI/VZh6jBQg-jI/AAAAAAAAHAw/yFIyrABEAmA/08a6e792ef95b80ed4bbcf978fad5f94_thumb%25255B2%25255D.jpg?imgmax=800" width="248" height="392"></a></em></p> <a name='more'></a> <p>El consejo es ensayar frente a un espejo, ya que es lo más practico, pero también hay otros métodos que te pueden servir:</p> <h2>Usar más de un espejo</h2> <p>Puedes colocar un espejo más<strong> pequeño a un lado</strong>, y colocarlos de tal manera que desde un espejo puedas ver el reflejo del otro, de esta manera puedes tener un mayor campo de visión y corregir posibles errores en otras partes.</p> <h2>Utiliza una cámara</h2> <p>Una muy buena idea es utilizar una <strong>cámara web</strong>. En estos tiempo es muy barato comprar una cámara web y un cable de extensión USB. Ya solo necesitas conectarla a tu computador y comenzar a practicar.</p> <p>La puedes colocar en un pedestal, un trípode, o incluso hay algunas que tienen mecanismos para sujetarse de objetos, puedes aprovechar esto para colocarla en el clavijero de tu guitarra.</p> <p>De esta manera incluso puedes obtener tomas muy creativas de tu ejecución en el instrumento.</p> <p>Incluso si no tienes una cámara web, puedes utilizar una cámara "point-and-shoot" o una DSLR, la mayoría de estas incluyen cables para conectarlas a un televisor, desde el cual puedes ver tu ejecución.</p> <h2>Es útil para cualquier instrumento</h2> <p>Este consejo no es valido solo para guitarristas, sino para<strong> cualquier instrumentista</strong> que desee mejorar su <strong>técnica</strong> y<strong> posición</strong> al tocar.</p> <p>Otra buena idea es también grabar la ejecución para estudiarla después, más detenidamente.</p> <p>¡Espero que este artículo te sea de utilidad y no te olvides de comentar!</p> Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-6527148603192637226.post-59763397148573600752015-06-09T21:51:00.001-05:002015-06-09T21:51:17.050-05:00La música no es un idioma universal<p><a href="http://lh3.googleusercontent.com/-e_ELeicaZ98/VXemH4V6yhI/AAAAAAAAGxM/QVhyzM2X83U/s1600-h/11304557_10153457865234063_158160005_n%25255B10%25255D.jpg"><img title="11304557_10153457865234063_158160005_n" style="border-top: 0px; border-right: 0px; background-image: none; border-bottom: 0px; padding-top: 0px; padding-left: 0px; border-left: 0px; display: inline; padding-right: 0px" border="0" alt="11304557_10153457865234063_158160005_n" src="http://lh3.googleusercontent.com/-m-d5F8biS0Q/VXemIscsVoI/AAAAAAAAGxU/tEEGnEB3rV4/11304557_10153457865234063_158160005_n_thumb%25255B8%25255D.jpg?imgmax=800" width="192" height="295"></a></p> <p>Una frase muy común, cuando nos referimos a la música, es decir que es el idioma universal. Algo que no necesita palabras para expresar un sentimiento, una idea, etc.. Pues déjame decirte que no es así:</p> <h2>La música como una escritura</h2> <p>La música no está basada en la <strong>escritura</strong>, pero se ha valido de esta para dejar a perpetuidad sus obras. Pero las <strong>épocas</strong> y las distintas <strong>culturas</strong>, han utilizado distintos métodos para guardar a futuras generaciones las creaciones de cada época.</p> <p>Debido a esto podemos decir que la música no tiene una escritura universal.</p> <a name='more'></a> <h2>La música como una técnica y teoría</h2> <p>La música necesita de técnica para poder ejecutarse. Necesitas saber que es un acorde, una escala, intervalo,etc. y necesitas saber ejecutarlo. Pues bien, todos pueden<strong> escuchar</strong> la música, pero <strong>no comprender</strong> que es lo que esta realizando.</p> <p>Intenta tocar un acorde cuarta y un acorde quinta y muy pocos notaran la diferencia. O dile a alguien sin enseñanza musical que la canción termina en una cadencia suspensiva, etc.. De igual forma en un idioma es necesario <strong>entender lo que se dic</strong>e, no solo escucharlo.</p> <p>Ahora bien, me puedes decir que esto no importa ya que los sentimientos se transmiten igual, aunque no se comprendan.</p> <h2>La música como un sentimiento</h2> <p>Si es verdad la música transmite un sentimiento, pero este sentimiento es muy <strong>subjetivo</strong>, y cambia de persona a persona. Incluso una misma persona puede cambiar a lo largo de su vida.</p> <p>También se encuentra la<strong> parte cultural</strong>. De igual manera que algún platillo de una cultura puede ser desagradable para otra. La música occidental más hermosa puede parecer desagradable, o al menos aburrida, hacia otra cultura. Aunque al parecer la música occidental ya es aburrida para muchos “seres” de nuestra época, y por música occidental me refiero a Bach y a todo lo que surgió de ahí.</p> <h2>La música es un arte </h2> <p>La <strong>música no es un idioma</strong>, un lenguaje, un medio de comunicación, etc.. La <strong>música es un arte</strong>; simple y grandiosamente un arte. No hay motivo alguno para comparar un idioma con la música, son dos cosas diferentes.</p> <p>El lenguaje y la música son ambos artes liberales, los antiguos griegos ponían al lenguaje (retorica y gramática) dentro del <em><strong>Trivium</strong></em>, que era la enseñanza preparatoria para el <em><strong>Quadrivium</strong></em> en el cual se encuentra la música.</p> <blockquote> <p>La música no es un idioma universal.<br clear="all">La música es un arte, el más hermoso arte dado a la humanidad.</p></blockquote> Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-6527148603192637226.post-39757885295316433922015-06-02T15:17:00.000-05:002015-06-02T15:17:22.993-05:00Modos griegos - parte 1<div class="blogaway-section">
<a href="http://lh3.googleusercontent.com/-Gc192pMzdis/VW4O-m4yaTI/AAAAAAAAGHY/_B-zx-MdIyY/s1600-h/2014-09-09%25252010.46.55%2525203%25255B3%25255D.jpg"><img alt="Fretboard" border="0" src="http://lh3.googleusercontent.com/-MCwp7EoWvIk/VW4O_BYftQI/AAAAAAAAGHg/465koIwRQM4/2014-09-09%25252010.46.55%2525203_thumb%25255B1%25255D.jpg?imgmax=800" height="273" style="background-image: none; border-bottom: 0px; border-left: 0px; border-right: 0px; border-top: 0px; display: inline; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="7 Guitarras" width="347" /></a><br />
Los modos griegos (también llamados modos musicales) son una de las cosas que más confunden a los guitarristas. He visto infinidad de formas de describirlos, utilizarlos y de interpretarlos, todo de acuerdo a la opinión del músico, lo cual esta bien, pero aquí trataremos de estudiar la definición “básica” y clara de los modos. <br />Para comenzar debemos saber que los modos griegos no nos ayudarán a tocar mejor, no son una técnica, y por lo tanto no son de uso exclusivo en la guitarra.<br />
También tenemos que tener claro que estudiaremos los modos musicales modernos, los cuales difieren de los modos griegos antiguos que ya no se utilizan en la actualidad. En algunos textos se les llama “<b>modos musicales</b>” a la teoría <b>moderna</b>, y “<b>modos griegos</b>” a la teoría <b>antigua</b>.<br />
<b>Pero es muy común llamarles modos griegos a la teoría moderna, como es el caso de este articulo.</b></div>
<a name='more'></a><div class="blogaway-section">
<h2>
Definición</h2>
Una definición muy común es que los modos griegos son una <b>reordenación</b> de una escala mayor, y si es así pero esta definición puede confundirnos. <br />Una mejor forma de explicarlos es que son escalas diferentes.<br /><br />De la misma manera que la escala mayor y la escala menor, existen <b>cinco escalas</b> más, que comparten las mismas notas. <br />
<h2>
Nombres</h2>
La parte subjetiva es clasificar estas escalas. Tienen los siguientes nombres:</div>
<div class="blogaway-section">
<b>-Jónico o jonio </b>(escala mayor)<br />
<b>-Dórico o dorio</b><br />
<b>-Frigio</b><br />
<b>-Lidio</b><br />
<b>-Mixolidio</b><br />
<b>-Eólico o aeólico </b>(escala menor)<br />
<b>-Locrio</b><br />
<h2>
Clasificación</h2>
<br />
Pero estos nombres no nos dicen mucho de ellas si aun no las hemos escuchado y memorizado como suenan. Clasificamos cada una de estas escalas como mayor o menor. <br />
-Jónico - carácter <b>Mayor</b><br />
-Dórico - carácter <b>menor</b><br />
-Frigio - carácter <b>menor</b><br />
-Lidio - carácter <b>Mayor</b><br />
-Mixolidio - carácter <b>Mayor</b><br />
-Eólico - carácter <b>menor</b><br />
-Locrio - carácter <b>menor</b><br />
Para memorizar cual es mayor y menor podemos hacer una relación con los acordes que se utilizan dentro de la escala mayor: primero mayor, segundo menor, tercero menor, cuarto mayor, quinto mayor, sexto menor, y séptimo disminuido (en este caso menor).<br />
<h2>
Diferencias</h2>
Claro que esto no significa que todos los que tienen carácter menor sonaran igual, o todos los de carácter mayor serán iguales. Cada uno de los modos tiene diferencias entre si, y es lo que los hace tan útiles ya que aumentan nuestros recursos de composición e improvisación. En los siguientes artículos estudiaremos estas diferencias de cada modo en especifico.</div>
Unknownnoreply@blogger.com0Lot Lourdes, Santa Ana, El Salvador13.9726526 -89.5527656tag:blogger.com,1999:blog-6527148603192637226.post-89677073859018529212015-05-06T15:10:00.001-05:002015-05-07T13:29:51.215-05:00Circle of chords - Aplicación para Android<p><a href="http://lh3.googleusercontent.com/-61q0d-SlLs4/VUuu-ZsR1OI/AAAAAAAAEmM/MOBh57Vmxc0/s1600-h/Screenshot_2015-05-06-13-15-28%25255B5%25255D.png"><img title="Círculo de acordes" style="border-top: 0px; border-right: 0px; background-image: none; border-bottom: 0px; padding-top: 0px; padding-left: 0px; border-left: 0px; display: inline; padding-right: 0px" border="0" alt="CIrcle of chords" src="http://lh3.googleusercontent.com/-0B9CPx0Redw/VUuu_CcG6OI/AAAAAAAAEmU/qtF0DOZUmOM/Screenshot_2015-05-06-13-15-28_thumb%25255B1%25255D.png?imgmax=800" width="244" height="184"></a></p> <p>Los teléfonos inteligentes nos han ayudado mucho a los músicos, existe una infinidad de aplicaciones para leer partituras, afinadores y cursos para aprender casi cualquier instrumento. El problema ahora es encontrar las aplicaciones de calidad que merecen la pena ser descargadas, y que realmente pueden ser de utilidad para los músicos.</p> <p>Circle of chords es una aplicación, que de una manera creativa y muy bien organizada, basándose en el circulo de quintas, nos ayuda a entender mejor las escalas, los acordes que van dentro de estas escalas, las armaduras y además de esto nos muestran posiciones en el mástil de la guitarra y en el teclado de un piano.</p> <a name='more'></a> <p> </p> <h2>Circulo de acordes</h2> <p><a href="http://lh3.googleusercontent.com/-VinCbmGW3ks/VUuvA7zX3hI/AAAAAAAAEmc/8qWKPoFqRf4/s1600-h/Screenshot_2015-05-06-13-15-36%25255B5%25255D.png"><img title="Círculo de acordes" style="border-top: 0px; border-right: 0px; background-image: none; border-bottom: 0px; padding-top: 0px; padding-left: 0px; border-left: 0px; display: inline; padding-right: 0px" border="0" alt="Circle of chords" src="http://lh3.googleusercontent.com/-vIWfm3V7j_Y/VUuvB-UPdYI/AAAAAAAAEmk/48OUnxQCXJM/Screenshot_2015-05-06-13-15-36_thumb%25255B1%25255D.png?imgmax=800" width="172" height="244"></a></p> <p>La primera parte de la aplicación nos muestra un circulo de quintas, con las escalas mayores y sus relativas menores. Lo interesante de esta aplicación es que al seleccionar una pareja de escalas (una escala y su relativa), nos muestra los acordes que van dentro de esa escala. Quedando los tres acordes mayores, los tres menores y el acorde disminuido de la escala.</p> <p>Al centro del círculo podemos ver también la armadura de la escala que hemos seleccionado.</p> <p><a href="http://lh3.googleusercontent.com/-OwUyLACxzlc/VUuvDVtYHxI/AAAAAAAAEms/Ot5e1S9DFxQ/s1600-h/Screenshot_2015-05-06-13-15-55%25255B5%25255D.png"><img title="Acordes mayores y menores" style="border-top: 0px; border-right: 0px; background-image: none; border-bottom: 0px; padding-top: 0px; padding-left: 0px; border-left: 0px; display: inline; padding-right: 0px" border="0" alt="circle of chords" src="http://lh3.googleusercontent.com/--NuepZ5WT8M/VUuvEC6D96I/AAAAAAAAEm0/tgi-OerEy_I/Screenshot_2015-05-06-13-15-55_thumb%25255B1%25255D.png?imgmax=800" width="170" height="244"></a></p> <h2>Acordes y modos griegos</h2> <p>La segunda parte nos muestra los acordes y grados que van en la escala anteriormente seleccionada. Y además nos muestra dos acordes suspendidos que podemos utilizar para armonizar diferente.</p> <p>Además podemos seleccionar el modo griego que deseemos utilizar y la aplicación nos reorganizara los grados de los acordes.</p> <p>Y también podemos seleccionar si las alteraciones deben de aparecer como sostenidos, bemoles o dejar a la aplicación hacer esto automáticamente.</p> <p><a href="http://lh3.googleusercontent.com/-gGlC2WhjEVM/VUuvE-QvzOI/AAAAAAAAEm8/KocmFk1jFEs/s1600-h/Screenshot_2015-05-06-13-16-31%25255B8%25255D.png"><img title="Modos griegos y grados" style="border-top: 0px; border-right: 0px; background-image: none; border-bottom: 0px; padding-top: 0px; padding-left: 0px; border-left: 0px; display: inline; padding-right: 0px" border="0" alt="circle of chords" src="http://lh3.googleusercontent.com/-EMdKEOOn-NU/VUuvFfHYklI/AAAAAAAAEnE/GH2xJMRkJ0M/Screenshot_2015-05-06-13-16-31_thumb%25255B2%25255D.png?imgmax=800" width="244" height="183"></a></p> <h2>Patrones</h2> <p>En la tercera parte de la aplicación tenemos los patrones de los arpegios de cada acorde a lo largo del mástil de la guitarra y del teclado de un piano. Nos muestra con un color la tónica, y con color distinto la tercera y quinta.</p> <p>Si pulsamos sobre los patrones podemos escuchar un audio del acorde correspondiente.</p> <p><a href="http://lh3.googleusercontent.com/-YOg5P3vHnyw/VUuvGhcp5yI/AAAAAAAAEnM/KScEeE0jbTI/s1600-h/Screenshot_2015-05-06-13-16-28%25255B5%25255D.png"><img title="Patrones" style="border-top: 0px; border-right: 0px; background-image: none; border-bottom: 0px; padding-top: 0px; padding-left: 0px; border-left: 0px; display: inline; padding-right: 0px" border="0" alt="corcle of chords" src="http://lh3.googleusercontent.com/-2IVbmeLRSOk/VUuvHZU53SI/AAAAAAAAEnU/goVmr8VD6ts/Screenshot_2015-05-06-13-16-28_thumb%25255B1%25255D.png?imgmax=800" width="171" height="244"></a></p> <p>Para finalizar le recomiendo esta aplicación debido a que es muy completa, esta en español, y no gasta mucha memoria del dispositivo. Existen dos versiones, una de paga y la otra gratuita, la única diferencia entre las dos es que una incluye publicidad. De momento solo esta disponible en Android. Pueden descargarla en los siguientes links:</p> <p><strong><font size="4"><a href="https://play.google.com/store/apps/details?id=com.davidkbd.android.chordwheel">Circle of chords (Android - gratuita)</a></font></strong></p> <p><strong><font size="4"><a href="https://play.google.com/store/apps/details?id=com.davidkbd.android.adfree.chordwheel">Circle of chords (Android - paga)</a></font></strong></p> Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-6527148603192637226.post-19220696401390237342015-04-28T16:14:00.001-05:002015-04-28T16:16:09.808-05:00Mejorar el sonido en la guitarra clásica<p><a href="http://lh3.googleusercontent.com/-kXmcNa_-BMo/VT_4ImgFlLI/AAAAAAAAElY/Lq9XqwGxejk/s1600-h/david%252520russell%25255B1%25255D.png"><img title="david russell" style="border-top: 0px; border-right: 0px; background-image: none; border-bottom: 0px; padding-top: 0px; padding-left: 0px; border-left: 0px; display: inline; padding-right: 0px" border="0" alt="david russell" src="http://lh3.googleusercontent.com/-1VCXZ_IRe80/VT_4KUS1UsI/AAAAAAAAElg/8zKdX9lT55k/david%252520russell_thumb%25255B1%25255D.png?imgmax=800" width="338" height="266"></a><br clear="all"></p> <p>Siempre me preguntan si es necesario aprender guitarra clásica para ser un buen guitarrista, yo siempre les respondo que no es necesario, pero se nota cuando un guitarrista tiene enseñanza clásica. Muchos grandes guitarristas de diversos géneros han tenido sus primeros pasos en la guitarra clásica. Un buen ejemplo es Rhandy Roads, quien incluso salió de la escena un tiempo para dedicarse de lleno a la guitarra clásica.</p> <p>El día de hoy veremos un par de consejos para mejor nuestro sonido cuando interpretemos piezas clásicas.</p> <h2>Mantener una intensidad adecuada</h2> <p>Un de los problemas que cometemos es que muchas veces al intentar darle mayor importancia a la velocidad, a la métrica, y a nuestra técnica; olvidamos la dinámica. Por dinámica me refiero a la intensidad con que hacemos sonar las cuerdas: <em>forte, mezzoforte, piano, pianissimo</em>, etc..</p> <p><a href="http://lh3.googleusercontent.com/-6MVYpBvIfq0/VT_4LZa_5CI/AAAAAAAAElo/iYcvhegm8rI/s1600-h/800px-Beethoven_opus_111_conclusion%25255B3%25255D.png"><img title="Dinámica (fuente: Wikimedia.org)" style="border-top: 0px; border-right: 0px; background-image: none; border-bottom: 0px; padding-top: 0px; padding-left: 0px; border-left: 0px; display: inline; padding-right: 0px" border="0" alt="Beethoven opus 111 conclusion" src="http://lh3.googleusercontent.com/-OsdL-FVfoJQ/VT_4L6xwfVI/AAAAAAAAElw/Jeg4bRBajiY/800px-Beethoven_opus_111_conclusion_thumb%25255B1%25255D.png?imgmax=800" width="553" height="176"></a></p> <p>Muchas veces las partituras incluyen anotaciones acerca de la dinámica con que se debe ejecutar una parte especifica de la pieza, o incluso toda una pieza. En otros caso, debido a la mala calidad de la transcripción u otros motivos, no existe ninguna pauta visible para saber la dinámica de la pieza. Aquí es donde entra nuestro siguiente consejo:</p> <h2>¿Que nos hace sentir la pieza que estamos ejecutando?</h2> <p>Es una pregunta muy importante que debemos hacernos al ejecutar una pieza. Muchas veces es difícil ya que la música puede transmitir sentimiento que no se pueden expresar con simples palabras (o al menos así debe de ser), pero debemos de intentar darle algún adjetivo aproximado a lo que trata de expresar la pieza.</p> <p>Y una vez que entendemos el motivo principal de la pieza podemos explorar los sentimientos (o “subsentimientos”) que nos expresan las divisiones de la pieza. Y basados en esto podemos interpretar la dinámica que debemos dar.</p> <h2>¿Como aprender y estudiar correctamente una pieza?</h2> <p>Ahora, debemos de tener cuidado de que todo lo que hemos aprendido afecte nuestra correcta técnica. Una muy buena idea es aprender la pieza con una dinámica lineal (sin aumentar ni disminuir la intensidad) hasta que la hayamos dominado.</p> <p>Luego una vez que tengamos la pieza a un nivel aceptable podemos comenzar a preocuparnos por la dinámica de la pieza.</p> <p> </p> <p>Espero que esto sea de utilidad para ustedes y si tienen alguna pregunta no duden dejarla en los comentarios.</p> Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-6527148603192637226.post-60230038814881662122015-03-30T20:48:00.001-05:002018-01-14T17:51:06.339-06:00Afinación<p>El término afinación se refiere a una determinada frecuencia de un nota en particular, de cualquier <strong>instrumento musical</strong>, la<strong> voz</strong>, o cualquier otro <strong>sonido ordenado</strong>. Por sonido ordenado nos referimos a la diferencia entre el <strong>sonido</strong> propiamente dicho y el <strong>ruido</strong>.</p> <p>La frecuencia se mide en <strong>Hercios</strong>, que es igual a 1 oscilación o repetición por segundo. Nuestro oído puede escuchar frecuencias desde lo <strong>20 Hercios</strong> hasta los <strong>20 kilohercios</strong>.</p> <p>Musicalmente se le da nombre a estas distintas frecuencias, lo que viene a ser las notas. En su mayoría tomamos como base la nota “<strong>La 4</strong>” que tiene una frecuencia de <strong>440 Hercios</strong>.</p><p><br></p> <h2>La afinación en la guitarra</h2> <p>La guitarra tiene una afinación por cuartas justas (exceptuando la segunda cuerda) y la nota de referencia la tenemos en el quinto traste de la primer cuerda (La 4 - 440).</p> <p>Las notas de la afinación estándar de la guitarra son las siguientes:</p> <blockquote> <p><strong>Mi - La - Re - Sol - Si - Mi</strong></p></blockquote> <a name="more"></a> <blockquote> <p><strong></strong> </p></blockquote> <h2>Afinaciones alternativas</h2> <p>La guitarra al ser un instrumento tan versátil se puede afinar de varias maneras de acuerdo a las necesidades del músico, y claro, a las capacidades de cada instrumento en particular.</p> <h3>Guitarra clásica:</h3> <p><a href="http://lh4.ggpht.com/-5s8IJFRX9dA/VRn809wXjDI/AAAAAAAAEkY/vI9JqAirgLY/s1600-h/87%25255B2%25255D.jpg"><img width="244" height="114" title="Guitarras clásica" style="border: 0px currentcolor; padding-top: 0px; padding-right: 0px; padding-left: 0px; display: inline; background-image: none;" alt="Guitarras clásica" src="http://lh3.ggpht.com/-dQAC7qG-cbY/VRn81uP7ieI/AAAAAAAAEkg/lt5Jj18mXAI/87_thumb.jpg?imgmax=800" border="0"></a></p> <p>Se utiliza generalmente la <strong>afinación estándar</strong>, y muchas veces también la afinación “<strong>drop D</strong>”. De acuerdo al periodo musical al que pertenezca la pieza musical de puede cambiar el “La 440”.</p> <h3>Guitarra eléctrica:</h3> <p><a href="http://lh4.ggpht.com/-Na9RA0jkVjE/VRn82lDIaqI/AAAAAAAAEko/4n-wi_hlmvc/s1600-h/88.png"><img width="244" height="93" title="Guitarra eléctrica" style="border: 0px currentcolor; padding-top: 0px; padding-right: 0px; padding-left: 0px; display: inline; background-image: none;" alt="Guitarra eléctrica" src="http://lh3.ggpht.com/-63chiIqQBo4/VRn83jVL_3I/AAAAAAAAEkw/mkAJhxstCbo/88_thumb.png?imgmax=800" border="0"></a></p> <p>En general se utiliza la<strong> afinación estándar</strong>, también hace uso de la afinación “<strong>drop D</strong>” o incluso “<strong>drop C#</strong>” o “<strong>drop C</strong>”. También se utiliza afinaciones en las cuales se baja medio tono a todas las cuerdas o incluso uno o dos tonos:</p> <blockquote> <p><strong>D# - G# - C# - F# - A# - D#</strong></p> <p><strong>D - G - C - F - A - D</strong></p></blockquote> <h3>Guitarra de siete cuerdas</h3> <p>Esta guitarra utiliza la afinación estándar añadiendo una nota, aunque es común que esta guitarra tenga afinaciones “drop”. Puedes ver más a fondo sus afinaciones en el siguiente articulo:</p> <blockquote> <p><a href="http://www.7guitarras.com/2015/01/afinacion-de-guitarra-de-7-cuerdas.html"><strong><font size="3">Afinación de guitarras de 7 cuerdas</font></strong></a></p></blockquote> <h2>Guitarra horizontal y guitarra hawaiana</h2> <p><a href="http://lh6.ggpht.com/-3LUR7KZfzo8/VRn84fGDnAI/AAAAAAAAEk4/X2zrQ9UQOx0/s1600-h/89%25255B2%25255D.jpg"><img width="244" height="182" title="Guitarras horizontal" style="border: 0px currentcolor; padding-top: 0px; padding-right: 0px; padding-left: 0px; display: inline; background-image: none;" alt="Guitarra horizontal lap guitar" src="http://lh3.ggpht.com/-cAB5exI7YYA/VRn841VGlqI/AAAAAAAAElA/Keh2FHOOT10/89_thumb.jpg?imgmax=800" border="0"></a></p> <p>Este tipo de guitarras tiene la peculiaridad que en su mayoría están afinadas de manera “abierta”. Esto significa que todas las notas de las cuerdas sueltas forman parte de un acorde, en su mayoría un acorde mayor.</p> <p>Ejemplos de estas afinaciones son:</p> <blockquote> <p>Open D: <strong>D - A - D - F# - A - D</strong></p> <p>Open G: <strong> D - G - D - G - B - D</strong></p></blockquote> <p>Puedes ver más sobre este tipo de afinaciones en el siguiente articulo:</p> <blockquote> <p><a href="http://www.7guitarras.com/2012/01/slack-keyafinaciones-abiertas.html"><strong><font size="3">Slack Key - Afinaciones abiertas</font></strong></a></p></blockquote> <h2>Afinadores</h2> <p>En estos links puedes encontrar afinadores y consejos para que puedas afinar de una mejor manera:</p> <blockquote> <p><font size="3"><a href="http://www.7guitarras.com/2011/09/ap-tuner-excelente-afinador-gratuito.html">AP Tuner - afinador para Windows</a></font></p> <p><a href="http://www.7guitarras.com/2011/10/gstrings-afinador-gratuito-para-android.html"><font size="3">gStrings - afinador para Android</font></a></p> <p><a href="http://www.7guitarras.com/2014/06/afinacion-con-armonicos.html"><font size="3">Afinación con armónicos</font></a></p></blockquote>Unknownnoreply@blogger.com0