3. Techniques of Differentiation
The Chain Rule
3:38 minutesProblem 3.7.106b
Textbook Question
Deriving trigonometric identities
b. Verify that you obtain the same identity for sin2t as in part (a) if you differentiate the identity cos 2t = 2 cos² t−1.
Verified step by step guidance1
Step 1: Start with the given identity for \( \cos 2t \), which is \( \cos 2t = 2 \cos^2 t - 1 \).
Step 2: Differentiate both sides of the equation with respect to \( t \). For the left side, use the derivative of \( \cos 2t \), which is \(-2 \sin 2t\) using the chain rule.
Step 3: For the right side, differentiate \( 2 \cos^2 t - 1 \). Use the chain rule to differentiate \( 2 \cos^2 t \), which gives \( 2 \times 2 \cos t \times (-\sin t) = -4 \cos t \sin t \). The derivative of \(-1\) is 0.
Step 4: Set the derivatives from both sides equal to each other: \(-2 \sin 2t = -4 \cos t \sin t\).
Step 5: Simplify the equation \(-2 \sin 2t = -4 \cos t \sin t\) to verify the identity for \( \sin 2t \). Recognize that \( \sin 2t = 2 \sin t \cos t \), confirming the identity.
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