Part 1: A derivative computation using the chain rule Suppose F(x) is a differentiable function for all real numbers x. Evaluate the following derivative. Enter the derivative of F(x) using prime...

Please only answer part 2 and 3

Part 1: A derivative computation using the chain rule<br>Suppose F(x) is a differentiable function for all real numbers x. Evaluate the following derivative. Enter the derivative of F(x) using prime<br>notation, i.e., as F'(x).<br>d<br>(F(z*)) = F(^)-4x³<br>dx<br>Part 2: The derivative of a definite integral<br>sin(t)<br>Suppose F(x) =<br>dt. Use the Fundamental of Theorem of Calculus to calculate F'(x).<br>6 +t<br>F'(x) =<br>Part 3: The derivative of a definite integral and the chain rule<br>

Extracted text: Part 1: A derivative computation using the chain rule Suppose F(x) is a differentiable function for all real numbers x. Evaluate the following derivative. Enter the derivative of F(x) using prime notation, i.e., as F'(x). d (F(z*)) = F(^)-4x³ dx Part 2: The derivative of a definite integral sin(t) Suppose F(x) = dt. Use the Fundamental of Theorem of Calculus to calculate F'(x). 6 +t F'(x) = Part 3: The derivative of a definite integral and the chain rule

Jun 03, 2022

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Part 1: A derivative computation using the chain rule Suppose F(x) is a differentiable function for all real numbers x. Evaluate the following derivative. Enter the derivative of F(x) using prime...

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