Cálculo Ejemplos

$f (x) = e^{\sin (x)}$

Step 1

Obtén la primera derivada.

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Diferencia con la regla de la cadena, que establece que $\frac{d}{d x} [f (g (x))]$ es $f' (g (x)) g' (x)$ donde $f (x) = e^{x}$ y $g (x) = \sin (x)$ .

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Para aplicar la regla de la cadena, establece $u$ como $\sin (x)$ .

$f' (x) = \frac{d}{d u} (e^{u}) \frac{d}{d x} (\sin (x))$

Diferencia con la regla exponencial, que establece que $\frac{d}{d u} [a^{u}]$ es $a^{u} \ln (a)$ donde $a$ = $e$ .

$f' (x) = e^{u} \frac{d}{d x} (\sin (x))$

Reemplaza todos los casos de $u$ con $\sin (x)$ .

$f' (x) = e^{\sin (x)} \frac{d}{d x} (\sin (x))$

La derivada de $\sin (x)$ con respecto a $x$ es $\cos (x)$ .

$f' (x) = e^{\sin (x)} \cos (x)$

Step 2

Obtener la segunda derivada.

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Diferencia con la regla del producto, que establece que $\frac{d}{d x} [f (x) g (x)]$ es $f (x) \frac{d}{d x} [g (x)] + g (x) \frac{d}{d x} [f (x)]$ donde $f (x) = e^{\sin (x)}$ y $g (x) = \cos (x)$ .

$f'' (x) = e^{\sin (x)} \frac{d}{d x} (\cos (x)) + \cos (x) \frac{d}{d x} (e^{\sin (x)})$

La derivada de $\cos (x)$ con respecto a $x$ es $- \sin (x)$ .

$f'' (x) = e^{\sin (x)} (- \sin (x)) + \cos (x) \frac{d}{d x} (e^{\sin (x)})$

Diferencia con la regla de la cadena, que establece que $\frac{d}{d x} [f (g (x))]$ es $f' (g (x)) g' (x)$ donde $f (x) = e^{x}$ y $g (x) = \sin (x)$ .

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Para aplicar la regla de la cadena, establece $u$ como $\sin (x)$ .

$f'' (x) = e^{\sin (x)} (- \sin (x)) + \cos (x) (\frac{d}{d u} (e^{u}) \frac{d}{d x} (\sin (x)))$

Diferencia con la regla exponencial, que establece que $\frac{d}{d u} [a^{u}]$ es $a^{u} \ln (a)$ donde $a$ = $e$ .

$f'' (x) = e^{\sin (x)} (- \sin (x)) + \cos (x) (e^{u} \frac{d}{d x} (\sin (x)))$

Reemplaza todos los casos de $u$ con $\sin (x)$ .

$f'' (x) = e^{\sin (x)} (- \sin (x)) + \cos (x) (e^{\sin (x)} \frac{d}{d x} (\sin (x)))$

La derivada de $\sin (x)$ con respecto a $x$ es $\cos (x)$ .

$f'' (x) = e^{\sin (x)} (- \sin (x)) + \cos (x) e^{\sin (x)} \cos (x)$

Eleva $\cos (x)$ a la potencia de $1$ .

$f'' (x) = e^{\sin (x)} (- \sin (x)) + \cos (x) \cos (x) e^{\sin (x)}$

Eleva $\cos (x)$ a la potencia de $1$ .

$f'' (x) = e^{\sin (x)} (- \sin (x)) + \cos (x) \cos (x) e^{\sin (x)}$

Usa la regla de la potencia $a^{m} a^{n} = a^{m + n}$ para combinar exponentes.

$f'' (x) = e^{\sin (x)} (- \sin (x)) + {\cos (x)}^{1 + 1} e^{\sin (x)}$

Suma $1$ y $1$ .

$f'' (x) = e^{\sin (x)} (- \sin (x)) + \cos^{2} (x) e^{\sin (x)}$

Reordena los términos.

$f'' (x) = - e^{\sin (x)} \sin (x) + e^{\sin (x)} \cos^{2} (x)$

Step 3

Obtén la tercera derivada.

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Según la regla de la suma, la derivada de $- e^{\sin (x)} \sin (x) + e^{\sin (x)} \cos^{2} (x)$ con respecto a $x$ es $\frac{d}{d x} [- e^{\sin (x)} \sin (x)] + \frac{d}{d x} [e^{\sin (x)} \cos^{2} (x)]$ .

$f''' (x) = \frac{d}{d x} (- e^{\sin (x)} \sin (x)) + \frac{d}{d x} (e^{\sin (x)} \cos^{2} (x))$

Evalúa $\frac{d}{d x} [- e^{\sin (x)} \sin (x)]$ .

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Como $- 1$ es constante con respecto a $x$ , la derivada de $- e^{\sin (x)} \sin (x)$ con respecto a $x$ es $- \frac{d}{d x} [e^{\sin (x)} \sin (x)]$ .

$f''' (x) = - \frac{d}{d x} (e^{\sin (x)} \sin (x)) + \frac{d}{d x} (e^{\sin (x)} \cos^{2} (x))$

$f''' (x) = - (e^{\sin (x)} \frac{d}{d x} (\sin (x)) + \sin (x) \frac{d}{d x} (e^{\sin (x)})) + \frac{d}{d x} (e^{\sin (x)} \cos^{2} (x))$

La derivada de $\sin (x)$ con respecto a $x$ es $\cos (x)$ .

$f''' (x) = - (e^{\sin (x)} \cos (x) + \sin (x) \frac{d}{d x} (e^{\sin (x)})) + \frac{d}{d x} (e^{\sin (x)} \cos^{2} (x))$

Diferencia con la regla de la cadena, que establece que $\frac{d}{d x} [f (g (x))]$ es $f' (g (x)) g' (x)$ donde $f (x) = e^{x}$ y $g (x) = \sin (x)$ .

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Para aplicar la regla de la cadena, establece $u_{1}$ como $\sin (x)$ .

$f''' (x) = - (e^{\sin (x)} \cos (x) + \sin (x) (\frac{d}{d u (1)} (e^{u_{1}}) \frac{d}{d x} (\sin (x)))) + \frac{d}{d x} (e^{\sin (x)} \cos^{2} (x))$

Diferencia con la regla exponencial, que establece que $\frac{d}{d u_{1}} [a^{u_{1}}]$ es $a^{u_{1}} \ln (a)$ donde $a$ = $e$ .

$f''' (x) = - (e^{\sin (x)} \cos (x) + \sin (x) (e^{u_{1}} \frac{d}{d x} (\sin (x)))) + \frac{d}{d x} (e^{\sin (x)} \cos^{2} (x))$

Reemplaza todos los casos de $u_{1}$ con $\sin (x)$ .

$f''' (x) = - (e^{\sin (x)} \cos (x) + \sin (x) (e^{\sin (x)} \frac{d}{d x} (\sin (x)))) + \frac{d}{d x} (e^{\sin (x)} \cos^{2} (x))$

La derivada de $\sin (x)$ con respecto a $x$ es $\cos (x)$ .

$f''' (x) = - (e^{\sin (x)} \cos (x) + \sin (x) e^{\sin (x)} \cos (x)) + \frac{d}{d x} (e^{\sin (x)} \cos^{2} (x))$

Evalúa $\frac{d}{d x} [e^{\sin (x)} \cos^{2} (x)]$ .

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$f''' (x) = - (e^{\sin (x)} \cos (x) + \sin (x) e^{\sin (x)} \cos (x)) + e^{\sin (x)} \frac{d}{d x} (\cos^{2} (x)) + \cos^{2} (x) \frac{d}{d x} (e^{\sin (x)})$

Diferencia con la regla de la cadena, que establece que $\frac{d}{d x} [f (g (x))]$ es $f' (g (x)) g' (x)$ donde $f (x) = x^{2}$ y $g (x) = \cos (x)$ .

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Para aplicar la regla de la cadena, establece $u_{2}$ como $\cos (x)$ .

$f''' (x) = - (e^{\sin (x)} \cos (x) + \sin (x) e^{\sin (x)} \cos (x)) + e^{\sin (x)} (\frac{d}{d u (2)} ({u_{2}}^{2}) \frac{d}{d x} (\cos (x))) + \cos^{2} (x) \frac{d}{d x} (e^{\sin (x)})$

Diferencia con la regla de la potencia, que establece que $\frac{d}{d u_{2}} [{u_{2}}^{n}]$ es $n {u_{2}}^{n - 1}$ donde $n = 2$ .

$f''' (x) = - (e^{\sin (x)} \cos (x) + \sin (x) e^{\sin (x)} \cos (x)) + e^{\sin (x)} (2 u_{2} \frac{d}{d x} (\cos (x))) + \cos^{2} (x) \frac{d}{d x} (e^{\sin (x)})$

Reemplaza todos los casos de $u_{2}$ con $\cos (x)$ .

$f''' (x) = - (e^{\sin (x)} \cos (x) + \sin (x) e^{\sin (x)} \cos (x)) + e^{\sin (x)} (2 \cos (x) \frac{d}{d x} (\cos (x))) + \cos^{2} (x) \frac{d}{d x} (e^{\sin (x)})$

La derivada de $\cos (x)$ con respecto a $x$ es $- \sin (x)$ .

$f''' (x) = - (e^{\sin (x)} \cos (x) + \sin (x) e^{\sin (x)} \cos (x)) + e^{\sin (x)} (2 \cos (x) (- \sin (x))) + \cos^{2} (x) \frac{d}{d x} (e^{\sin (x)})$

Diferencia con la regla de la cadena, que establece que $\frac{d}{d x} [f (g (x))]$ es $f' (g (x)) g' (x)$ donde $f (x) = e^{x}$ y $g (x) = \sin (x)$ .

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Para aplicar la regla de la cadena, establece $u_{3}$ como $\sin (x)$ .

$f''' (x) = - (e^{\sin (x)} \cos (x) + \sin (x) e^{\sin (x)} \cos (x)) + e^{\sin (x)} (2 \cos (x) (- \sin (x))) + \cos^{2} (x) (\frac{d}{d u (3)} (e^{u_{3}}) \frac{d}{d x} (\sin (x)))$

Diferencia con la regla exponencial, que establece que $\frac{d}{d u_{3}} [a^{u_{3}}]$ es $a^{u_{3}} \ln (a)$ donde $a$ = $e$ .

$f''' (x) = - (e^{\sin (x)} \cos (x) + \sin (x) e^{\sin (x)} \cos (x)) + e^{\sin (x)} (2 \cos (x) (- \sin (x))) + \cos^{2} (x) (e^{u_{3}} \frac{d}{d x} (\sin (x)))$

Reemplaza todos los casos de $u_{3}$ con $\sin (x)$ .

$f''' (x) = - (e^{\sin (x)} \cos (x) + \sin (x) e^{\sin (x)} \cos (x)) + e^{\sin (x)} (2 \cos (x) (- \sin (x))) + \cos^{2} (x) (e^{\sin (x)} \frac{d}{d x} (\sin (x)))$

La derivada de $\sin (x)$ con respecto a $x$ es $\cos (x)$ .

$f''' (x) = - (e^{\sin (x)} \cos (x) + \sin (x) e^{\sin (x)} \cos (x)) + e^{\sin (x)} (2 \cos (x) (- \sin (x))) + \cos^{2} (x) (e^{\sin (x)} \cos (x))$

Multiplica $- 1$ por $2$ .

$f''' (x) = - (e^{\sin (x)} \cos (x) + \sin (x) e^{\sin (x)} \cos (x)) + e^{\sin (x)} (- 2 \cos (x) \sin (x)) + \cos^{2} (x) (e^{\sin (x)} \cos (x))$

Multiplica $\cos^{2} (x)$ por $\cos (x)$ sumando los exponentes.

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Mueve $\cos (x)$ .

$f''' (x) = - (e^{\sin (x)} \cos (x) + \sin (x) e^{\sin (x)} \cos (x)) + e^{\sin (x)} (- 2 \cos (x) \sin (x)) + \cos (x) \cos^{2} (x) e^{\sin (x)}$

Multiplica $\cos (x)$ por $\cos^{2} (x)$ .

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Eleva $\cos (x)$ a la potencia de $1$ .

$f''' (x) = - (e^{\sin (x)} \cos (x) + \sin (x) e^{\sin (x)} \cos (x)) + e^{\sin (x)} (- 2 \cos (x) \sin (x)) + \cos (x) \cos^{2} (x) e^{\sin (x)}$

Usa la regla de la potencia $a^{m} a^{n} = a^{m + n}$ para combinar exponentes.

$f''' (x) = - (e^{\sin (x)} \cos (x) + \sin (x) e^{\sin (x)} \cos (x)) + e^{\sin (x)} (- 2 \cos (x) \sin (x)) + {\cos (x)}^{1 + 2} e^{\sin (x)}$

Suma $1$ y $2$ .

$f''' (x) = - (e^{\sin (x)} \cos (x) + \sin (x) e^{\sin (x)} \cos (x)) + e^{\sin (x)} (- 2 \cos (x) \sin (x)) + \cos^{3} (x) e^{\sin (x)}$

Simplifica.

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Aplica la propiedad distributiva.

$f''' (x) = - (e^{\sin (x)} \cos (x)) - (\sin (x) e^{\sin (x)} \cos (x)) + e^{\sin (x)} (- 2 \cos (x) \sin (x)) + \cos^{3} (x) e^{\sin (x)}$

Combina los términos.

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Reordena los factores de $- \sin (x) e^{\sin (x)} \cos (x)$ .

$f''' (x) = - e^{\sin (x)} \cos (x) - e^{\sin (x)} \cos (x) \sin (x) + e^{\sin (x)} (- 2 \cos (x) \sin (x)) + \cos^{3} (x) e^{\sin (x)}$

Suma $- e^{\sin (x)} \cos (x) \sin (x)$ y $e^{\sin (x)} (- 2 \cos (x) \sin (x))$ .

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Reordena $e^{\sin (x)}$ y $- 2$ .

$f''' (x) = - e^{\sin (x)} \cos (x) - e^{\sin (x)} \cos (x) \sin (x) - 2 \cdot (e^{\sin (x)} \cos (x) \sin (x)) + \cos^{3} (x) e^{\sin (x)}$

Resta $2 \cdot e^{\sin (x)} \cos (x) \sin (x)$ de $- e^{\sin (x)} \cos (x) \sin (x)$ .

$f''' (x) = - e^{\sin (x)} \cos (x) - 3 e^{\sin (x)} \cos (x) \sin (x) + \cos^{3} (x) e^{\sin (x)}$

Reordena los términos.

$f''' (x) = - e^{\sin (x)} \cos (x) - 3 e^{\sin (x)} \cos (x) \sin (x) + e^{\sin (x)} \cos^{3} (x)$

Factoriza $\cos (x)$ de $- e^{\sin (x)} \cos (x) - 3 e^{\sin (x)} \cos (x) \sin (x) + e^{\sin (x)} \cos^{3} (x)$ .

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Factoriza $\cos (x)$ de $- e^{\sin (x)} \cos (x)$ .

$f''' (x) = \cos (x) (- e^{\sin (x)}) - 3 e^{\sin (x)} \cos (x) \sin (x) + e^{\sin (x)} \cos^{3} (x)$

Factoriza $\cos (x)$ de $- 3 e^{\sin (x)} \cos (x) \sin (x)$ .

$f''' (x) = \cos (x) (- e^{\sin (x)}) + \cos (x) (- 3 e^{\sin (x)} \sin (x)) + e^{\sin (x)} \cos^{3} (x)$

Factoriza $\cos (x)$ de $e^{\sin (x)} \cos^{3} (x)$ .

$f''' (x) = \cos (x) (- e^{\sin (x)}) + \cos (x) (- 3 e^{\sin (x)} \sin (x)) + \cos (x) (e^{\sin (x)} \cos^{2} (x))$

Factoriza $\cos (x)$ de $\cos (x) (- e^{\sin (x)}) + \cos (x) (- 3 e^{\sin (x)} \sin (x))$ .

$f''' (x) = \cos (x) (- e^{\sin (x)} - 3 e^{\sin (x)} \sin (x)) + \cos (x) (e^{\sin (x)} \cos^{2} (x))$

Factoriza $\cos (x)$ de $\cos (x) (- e^{\sin (x)} - 3 e^{\sin (x)} \sin (x)) + \cos (x) (e^{\sin (x)} \cos^{2} (x))$ .

$f''' (x) = \cos (x) (- e^{\sin (x)} - 3 e^{\sin (x)} \sin (x) + e^{\sin (x)} \cos^{2} (x))$

Mueve $e^{\sin (x)} \cos^{2} (x)$ .

$f''' (x) = \cos (x) (- e^{\sin (x)} + e^{\sin (x)} \cos^{2} (x) - 3 e^{\sin (x)} \sin (x))$

Factoriza $- e^{\sin (x)}$ de $- e^{\sin (x)}$ .

$f''' (x) = \cos (x) (- e^{\sin (x)} \cdot 1 + e^{\sin (x)} \cos^{2} (x) - 3 e^{\sin (x)} \sin (x))$

Factoriza $- e^{\sin (x)}$ de $e^{\sin (x)} \cos^{2} (x)$ .

$f''' (x) = \cos (x) (- e^{\sin (x)} \cdot 1 - e^{\sin (x)} (- 1 \cos^{2} (x)) - 3 e^{\sin (x)} \sin (x))$

Factoriza $- e^{\sin (x)}$ de $- e^{\sin (x)} (1) - e^{\sin (x)} (- 1 \cos^{2} (x))$ .

$f''' (x) = \cos (x) (- e^{\sin (x)} (1 - 1 \cos^{2} (x)) - 3 e^{\sin (x)} \sin (x))$

Reescribe $- 1 \cos^{2} (x)$ como $- \cos^{2} (x)$ .

$f''' (x) = \cos (x) (- e^{\sin (x)} (1 - \cos^{2} (x)) - 3 e^{\sin (x)} \sin (x))$

Aplica la identidad pitagórica.

$f''' (x) = \cos (x) (- e^{\sin (x)} \sin^{2} (x) - 3 e^{\sin (x)} \sin (x))$

Aplica la propiedad distributiva.

$f''' (x) = \cos (x) (- e^{\sin (x)} \sin^{2} (x)) + \cos (x) (- 3 e^{\sin (x)} \sin (x))$

Reescribe con la propiedad conmutativa de la multiplicación.

$f''' (x) = - \cos (x) e^{\sin (x)} \sin^{2} (x) + \cos (x) (- 3 e^{\sin (x)} \sin (x))$

Reescribe con la propiedad conmutativa de la multiplicación.

$f''' (x) = - \cos (x) e^{\sin (x)} \sin^{2} (x) - 3 \cos (x) e^{\sin (x)} \sin (x)$

Reordena los factores en $- \cos (x) e^{\sin (x)} \sin^{2} (x) - 3 \cos (x) e^{\sin (x)} \sin (x)$ .

$f''' (x) = - e^{\sin (x)} \cos (x) \sin^{2} (x) - 3 e^{\sin (x)} \cos (x) \sin (x)$

Step 4

La tercera derivada de $f (x)$ con respecto a $x$ es $- e^{\sin (x)} \cos (x) \sin^{2} (x) - 3 e^{\sin (x)} \cos (x) \sin (x)$ .

$- e^{\sin (x)} \cos (x) \sin^{2} (x) - 3 e^{\sin (x)} \cos (x) \sin (x)$