2 Answers

Aag · Answer 1 · 2023-12-18T04:16:24+0000

Answer:

Explanation:

We use the 2 identities csc²x = 1/ sin²x and (1 - sin²x) = cos²x:-

(csc²x-1) sin²x

csc²x = 1/ sin²x so

= (1/ sin²x - 1) * sin²x

= [(1 - sin²x) / sin²x] * sin²x

(1 - sin²x) = cos²x so

= (1 - sin²x)

= cos²x

Amit Soni · Answer 2 · 2023-12-20T12:26:08+0000

First, remember the following equivalences:

and:

then, given the trigonometric equation, if we use the distributive property and the first equivalence on the left side, we get:

$\begin{gathered} (csc²x-1)sin²x=((1)/(sin²x)-1)sin²x \\ =(sin²x)/(sin²x)-sin²x=1-sin²x \end{gathered}$

then, by the second equivalence:

$\begin{gathered} 1-sin²x=cos²x \\ \Rightarrow cos²x=cos²x \end{gathered}$

therefore, (csc²x-1)=cos²x

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