1 Answer

Eduardo Almeida · Answer 1 · 2023-03-11T20:23:32+0000

Given:

Given the steps of the proof of the equation

$\sin\theta-\sin^3\theta=(2\sin2\theta\cos^2\theta)/(2\cos\theta)$

Required: Expression missing on the thrd step

Step-by-step explanation:

The second step is

$\sin\theta-\sin^3\theta=\sin\theta(1-\sin^2\theta)(2\cos\theta)/(2\cos\theta)$

from which leads to

$\sin\theta-\sin^3\theta=((2\sin\theta\cos\theta)(1-\sin^2\theta))/(2\cos\theta)$

The expression missing on the third step is

$((2\sin\theta\cos\theta)(1-\sin^2\theta))/(2\cos\theta)$

Option D is correct.

Final Answer:

$((2\sin\theta\cos\theta)(1-\sin^2\theta))/(2\cos\theta)$

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