Question

If f(x) = ∫₀^(x^3) cos(t^2) dt, then f'(√(π)) = (A) 3π sin(π^3) (B) cos(π^3) (C) 3π cos(π) (D) 3π cos(π^3) 

          If f(x) = ∫₀^(x^3) cos(t^2) dt, then f'(√(π)) =
(A) 3π sin(π^3)
(B) cos(π^3)
(C) 3π cos(π)
(D) 3π cos(π^3)
if fx 0x3 cost2 dt then f a 3 sin3 b cos3 c 3 cos d 3 cos3 91742

Added by Connor P.

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Calculus: Early Transcendentals
Calculus: Early Transcendentals
James Stewart 8th Edition
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If f(x) = ∫₀^(x^3) cos(t^2) dt, then f'(√(π)) = (A) 3π sin(π^3) (B) cos(π^3) (C) 3π cos(π) (D) 3π cos(π^3)
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Transcript

-
00:01 For the given function, we are asked to calculate f of 2.
00:04 And to do that, we simply need to plug in x equals 2.
00:07 We'll get pi plus arc cotangent of 2 minus 2.
00:13 That's going to be pi plus arc cotangent of 0.
00:19 Now we need to figure out what's arc cotangent of 0.
00:25 Let's say arc cotangent of 0 equals x.
00:29 If we apply cotangent to both sides of the equation, we'll get that cotangent of arc cotangent 0, 0 is cotangent x...
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