Question

good eve frdzzz
here is ur question

prove the above mentioned question and no spamming guys ​

Answer 1

I think you will get help from it

Answer 2

$\huge\mathfrak\red{Answer}$

I CAN PROVE IT BY USING

COMMON SENSE

$sin \alpha \: is \: the \: ratio \: of \: the \: perpendicular \: \\ with \: hypotaneous \: so \: acc \: to \: \\ properties \: of \: TRIGONOMETRY \: \\ any \: ratio \: of \: particular \: operator \: \\ like \: sin \: or \: cos \: are \: possible \: only \: at \: \\ a \: particular \: angle \: so \\ {sin}^{ - 1} sin \alpha \: is \: generally \: represent \: same \: property \\ \\ \sin( \alpha ) = \frac{perpendicular}{hypotaneous} \\ \\ {sin}^{ - 1} (\frac{perpendicular}{hypotaneous} ) = \alpha \\ because \: the \: ratio \: is \: repeats \: on \: the \: same \: angle$