Question : Find the value of $\cot ^2B- \operatorname{cosec}^2B$ for $ 0<B<90^{\circ}.$
Option 1: $1$
Option 2: $2$
Option 3: $–1$
Option 4: $–2$

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Question : If $0^{\circ}< \theta< 90^{\circ}$ and $\operatorname{cosec \theta} =\cot^{2}\theta$, then the value of expression $\operatorname{cosec^{4}\theta}–\operatorname{2cosec^{2}\theta}-\cot^{2}\theta$ is equal to:

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Answer 1

Correct Answer: $–1$

Solution : Given: $\cot^2 B-\operatorname{cosec}^2 B$
$=\frac{\cos^{2} B}{\sin ^{2} B}- \frac{1}{\sin^{2} B}$
$= \frac{\cos^{2}-1}{\sin ^{2} B}$
$= \frac{-\sin ^{2} B}{\sin ^{2} B}$
$=-1$
Hence, the correct answer is $-1$.

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Question : Find the value of $\cot ^2B- \operatorname{cosec}^2B$ for $ 0<B<90^{\circ}.$Option 1: $1$Option 2: $2$Option 3: $–1$Option 4: $–2$

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Question : Find the value of $\cot ^2B- \operatorname{cosec}^2B$ for $ 0<B<90^{\circ}.$
Option 1: $1$
Option 2: $2$
Option 3: $–1$
Option 4: $–2$