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El contenido de este articulo ha sido extraido del "Manual de Velas Japonesas, Trading y Bolsa "de Isabel Nogales
Los
tres elementos fundamentales que abarcan el movimiento del
mercado
son el precio,
el tiempo
y
el volumen.
El
precio
es el medio que tiene el mercado de localizar una oportunidad. El
precio es una variable volátil y el elemento que más
rápido se mueve en el mercado.
El
tiempo
regula cada una de esas oportunidades y el volumen mide el grado de
éxito o fallo de cada movimiento. El tiempo es la constante
sobre la que se organiza los movimientos del mercado.
El
volumen
también es una variable, pero cambia más gradualmente
que el precio, además representa la interacción del
precio y el tiempo.
En
este capítulo vamos a dedicar tiempo a aprender no solo los
horarios en los que el mercado tiene mayor actividad y por ende nos
da mayores oportunidades de trading, sino que además vamos a
ver los ciclos de tiempo del mercado, es decir, patrones repetitivos
del mercado, tanto a nivel intradiario (producido por los horarios
comerciales de los operadores especialistas) como ciclos mayores:
mensuales, anuales, y superiores.
También
vamos a poner en relación e estas dos variables tan
importantes en el mercado FOREX como son el tiempo y la velocidad del
precio, ya que es esta interrelación tiempo-velocidad es de
los pilares más importantes en nuestra operativa son las que
van a crear la velocidad de formación de las tendencias.
Y
también hablaremos de los ciclos económicos y los
ciclos a los que se ve sometido el precio en Forex.
- Velocidad en la formación de las tendencias
En
las graficas del precio observamos dos ejes: en el eje vertical
encontramos el precio de las cotizaciones del par, mientras que en el
eje horizontal está el factor tiempo en que se va
desarrollando el mercado; así pues las formaciones de los
gráficos ponen en relación ambos factores: precio y
tiempo que quedan reflejados en la gráfica .
Sin
embargo hay algo que no se ve en los ejes pero que se refleja en las
gráficas y que influye tanto en la forma de las estructuras
creadas (marubozu: velas largas y con un gran cuerpo, sin apenas
mechas formadas en breves periodos de tiempo -significa que existe un
alto volumen de transacciones alcista o bajista e indican por si
mismo una tendencia, por ejemplo) como en la velocidad de formación
de las tendencias.
Este
facto que no tiene presencia en los ejes, pero queda reflejado en
las formaciones no es otro que el volumen de transacciones en el
tiempo y es un factor fundamental a tener en cuenta en nuestra
operativa, (sino es el más importante) en el funcionamiento de
los mercados.
Por
tanto, la relación ente precio, volumen y tiempo determinan
tanto la velocidad de formación de los gráficos como
de las tendencias.
Así
una vez iniciada la tendencia, a medida que va dibujándose la
cotización del precio en las graficas podemos observar que su
incremento o decremento está sometido al factor tiempo,
creando así diferentes velocidades en la formación de
las tendencias y por tanto diferentes ángulos de trabajo,
líneas dinámicas y diversos tipos de velocidad de
formación de la tendencia( a destacar normal, lenta o rápida)
en los que trabaja el mercado. En capítulos posteriores
profundizaremos en los grados que pueden formar las líneas
de tendencia basadas en las ondas de Elliot o las teorías de
Gann.
Ahora
veamos algunos aspectos que te darán valiosa información
a la hora de operar.
- Ángulos de tendencia ( velocidad-tiempo)
Ya
aprendimos a dibujar las líneas de tendencia en capítulos
anteriores. Las llamaremos líneas dinámicas (son
líneas similares a los soportes horizontales, solo que en esta
ocasión son dinámicas ya que soportan los precios pero
varían a lo largo del tiempo junto al precio)
Las
líneas dinámicas te ayudan a identificar la velocidad
del precio. Esta herramienta te será muy útil para tus
futuros análisis de correlación y fuerza relativa del
mercado.
S
i dibujáramos diversas dinámicas gradualmente a
medida que el mercado va desarrollándose observaríamos
que de manera más que habitual estas líneas van
modificando sus ángulos, siendo estos cada vez ángulos
mayores.
Este
ángulo formado por la línea de tendencia respecto al
eje horizontal determina de alguna manera la velocidad a la que la
tendencia esta creciendo.
Asi
como podemos ver en la siguiente ilustración: el ángulo
de la línea de tendencia nº 1 es menor que el de la línea
nº 2 y este inferior a ángulo de la línea de
tendencia nº 3-
.![](data:image/png;base64,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)
A
medida que la velocidad de la tendencia aumenta, el ángulo
formado entre la línea de tendencia y el eje horizontal
aumenta., es decir que la pendiente de la tendencia va aumentando.
A
medida que aumenta la pendiente, la tendencia general va llegando a
su final ya que es muy complicado que se sostenga ese crecimiento
acelerado durante mucho tiempo (se precisaría un elevado
incremento del volumen alcista y mantenido en el tiempo para
sostener ese crecimiento acelerado, es por eso que se dice que la
tendencia se agota y va llegando a su fin)
Por
tanto un línea de tendencia con un ángulo cuanto más
cercano a la verticalidad refleja un crecimiento del precio
normalmente acelerado, y por tanto nos informa (en la mayoría
de las ocasiones) que el fin de la tendencia está próximo
ya que existe de base una debilidad del mercado que no permite
seguir casando las ordenes del mercado a precios excesivamente
elevados y cuya falta de continuidad no tardará en quedar
patente en la gráfica en forma de menor recorrido entre sus
picos máximos o formación de rangos o fallas en
conseguir nuevos máximos en la tendencia previa. Podríamos
decir que a medida que el crecimiento pierde fuerza, empieza a
crearse un tono de incertidumbre que origina la formación de
un potencial proceso de acumulación o distribución, que
sólo existirá cuando el precio rompa y salga de dicho
proceso en dirección opuesta a la actual tendencia
La
inclinación relativa de una línea de tendencia también
es relevante. En general, las líneas de tendencia más
confiables tienden a aproximarse a los cuarenta y cinco grados.
Esta
línea refleja que el avance o retroceso de los precios está
en balance armónico con el tiempo. Si una tendencia tiene un
ángulo demasiado inclinado, se sospecha que el movimiento ha
sido demasiado rápido y no es sostenible. Una pendiente de la
línea de tendencia demasiado plana implica que la tendencia es
débil y por lo tanto no es confiable.
Aplicando
la teoría de retrocesos de Fibonacci a las líneas de
tendencia se puede asumir que:
- Una tendencia con un ángulo medio de 45º se considera una tendencia con un crecimiento estándar o normar. Esta es más sostenible en el tiempo , es cómoda de operar en la formación de canales y aún así puede tener un retroceso del 50% fibo.
- Una tendencia demasiado inclinada (ángulo superior al 55º) es una tendencia con un crecimiento acelerado o rápido. Esta tendencia es menos sostenible, difícilmente operable y dado que su crecimiento es muy acelerado podría tener un retroceso porcentualmente mayor, pues sufrirá correcciones del precio más importantes ( retrocesos hasta niveles de fibo 68%).
- Mientras que una tendencia demasiado plana, es considerada de crecimiento lento. Esta es ideal para poder tradar, pues se puede mantener durante mas tiempo su crecimiento. Podría tener un retroceso en los niveles de Fibonacci o menor, dado que no precisa de tanta corrección (retrocesos hasta niveles fibo 33%.).
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