How do you calculate the derivative of $\int 5 {(sin (t))}^{5} d t$ $int5(sin(t))^5 dt$ from $[e^{x}, 5]$ $[e^x,5]$ ?

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How do you calculate the derivative of $\int 5 {(sin (t))}^{5} d t$ $int5(sin(t))^5 dt$ from $[e^{x}, 5]$ $[e^x,5]$ ?

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Answer 1 · 2015-08-11T15:39:53

$5 \frac{d}{d x} \int_{e^{x}}^{5} {sin}^{5} t d t = = - 5 e^{x} {sin}^{5} (e^{x})$ $5 d/dx int_(e^x)^5 sin^5 t dt = = -5 e^x sin^5 (e^x)$

Explanation:

$5 \frac{d}{d x} \int_{e^{x}}^{5} {sin}^{5} t d t = - 5 \frac{d}{d x} \int_{5}^{e^{x}} {sin}^{5} t d t$ $5d/dx int_(e^x)^5 sin^5 t dt = -5 d/dxint_5^(e^x) sin^5 t dt$
$= - 5 {sin}^{5} (e^{x}) \frac{d}{d x} (e^{x}) = - 5 e^{x} {sin}^{5} (e^{x})$ $= -5 sin^5 (e^x) d/dx(e^x) = -5 e^x sin^5 (e^x)$

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How do you calculate the derivative of $\int 5 {(sin (t))}^{5} d t$ $int5(sin(t))^5 dt$ from $[e^{x}, 5]$ $[e^x,5]$ ?

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How do you calculate the derivative of int5(sin(t))^5 dt∫5(sin(t))5dtint5(sin(t))^5 dt from [e^x,5][ex,5][e^x,5]?

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How do you calculate the derivative of $\int 5 {(sin (t))}^{5} d t$ $int5(sin(t))^5 dt$ from $[e^{x}, 5]$ $[e^x,5]$ ?