1 Answer

Pere Joan Martorell · Answer 1 · 2020-12-09T08:50:14+0000

ANSWER

$\tan(\sin^( - 1)( (x)/(2) )) = \frac{x}{ \sqrt{4 - {x}^(2) } } \: \:where \: \: x \\e \pm2$

Step-by-step explanation

We want to find the exact value of

$\tan( \sin^( - 1)( (x)/(2) ) )$

Let

$y = \sin^( - 1)( (x)/(2) )$

This implies that

$\sin(y) = (x)/(2)$

This implies that,

The opposite is x units and the hypotenuse is 2 units.

The adjacent side is found using Pythagoras Theorem.

${a}^(2) + {x}^(2) = {2}^(2)$

${a}^(2) + {x}^(2) = 4$

${a}^(2) = 4 - {x}^(2)$

$a= \sqrt{4 - {x}^(2)}$

This implies that,

$\tan(y) = (opposite)/(adjacent)$

$\tan(y) = \frac{x}{ \sqrt{4 - {x}^(2) } }$

But

$y = \sin^( - 1)( (x)/(2) )$

This implies that,

$\tan(\sin^( - 1)( (x)/(2) )) = \frac{x}{ \sqrt{4 - {x}^(2) } } \: \:where \: \: x \\e \pm2$

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