Question 1

Prove the identity 2csc2x=csc^2xtanz

Question 2

Explanation:

Consider the LHS, after the 5th step, consider the RHS

$2 \csc(2x) = \csc {}^(2) (x) \tan(x)$

$2 (1)/( \sin(2x) ) = \csc {}^(2) (x) \tan(x)$

$2 * (1)/(2 \sin(x) \cos(x) ) = \csc {}^(2) (x) \tan(x)$

$(1)/( \sin(x) \cos(x) ) = \csc {}^(2) (x) \tan(x)$

$\csc(x) \sec(x) = \csc {}^(2) (x) \tan(x)$

Consider the RHS

$\csc(x) \sec(x) =( 1 + \cot {}^(2) (x) ( \tan(x))$

$\csc(x) \sec(x) = \tan(x) + \cot(x)$

$\csc(x) \sec(x) = ( \sin(x) )/( \cos(x) ) + ( \cos(x) )/( \sin(x) )$

$\csc(x) \sec(x) = (1)/( \sin(x) \cos(x) )$

$\csc(x) \sec(x) = \csc(x) \sec(x)$

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