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Exercise. Let $r(u) = 7 \sin(u) \left( -5e^u - \frac{3}{\sqrt{u}} \right)$. Compute: $r'(u) = 7 \sin u \left( \boxed{ } \right) + 7 \cdot \cos(u) \left( -5e^u - \frac{3}{\sqrt{u}} \right)$

          Exercise. Let $r(u) = 7 \sin(u) \left( -5e^u - \frac{3}{\sqrt{u}} \right)$. Compute:
$r'(u) = 7 \sin u \left( \boxed{ } \right) + 7 \cdot \cos(u) \left( -5e^u - \frac{3}{\sqrt{u}} \right)$

Exercise. Let r(u) = 7 sin(u) ( -5e^u - (3)/(√(u))). Compute:
r'(u) = 7 sin u ( ) + 7 ·cos(u) ( -5e^u - (3)/(√(u)))

Added by Joshua G.

Calculus: Early Transcendentals

James Stewart 8th Edition

Instant Answer

Solved by Expert Tassha Calista

05/27/2022

Step 1

r'(u) = 7(cos(u)(-5e^u - 3/u^(1/5)) + sin(u)(-5e^u - 3/u^(1/5))') Show more…

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Exercise. Let r(u)=7sin(u)(-5e^(u)-(3)/( oot(5)(u))). Compute: r^(')(u)=7sinu*(,)+7*,*(-5e^(u)-(3)/(u^((1)/(5))))

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Exercise. Let $r(u) = 7 \sin(u) \left( -5e^u - \frac{3}{\sqrt{u}} \right)$. Compute: $r'(u) = 7 \sin u \left( \boxed{ } \right) + 7 \cdot \cos(u) \left( -5e^u - \frac{3}{\sqrt{u}} \right)$

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