0.4: Diferenciar una combinación de funciones

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0.4.1 La regla de la suma o diferencia

La derivada de la suma de\(f(x)\) y\(g(x)\) es

\[(f + g)'= f' + g'.\nonumber \]

Del mismo modo, la derivada de la diferencia es

\[(f − g)' = f' − g'.\nonumber \]

0.4.2 La regla del producto

El derivado del producto de\(f(x)\) y\(g(x)\) es

\[(f g)' = f'g + fg',\nonumber \]

y debe ser memorizado como “la derivada de las primeras veces la segunda más las primeras veces la derivada de la segunda”.

0.4.3 La regla del cociente

La derivada del cociente de\(f(x)\) y\(g(x)\) es

\[\left(\frac{f}{g}\right)'=\frac{f'g-fg'}{g^2},\nonumber \]

y debe memorizarse como “la derivada de la parte superior por la parte inferior menos la parte superior por la derivada de la parte inferior sobre la parte inferior al cuadrado”.

0.4.4 La regla de la cadena

El derivado de la composición de\(f(x)\) y\(g(x)\) es

\[\left(f(g(x))\right)'=f'(g(x))\cdot g'(x),\nonumber \]

y debe ser memorizado como “el derivado de los tiempos externos el derivado del interior”.

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