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Question #185da

1 Answer

May 14, 2017

This identity is true for any value of $x in RR$ , except where the denominators are zero.

Explanation:

Start by cross multiplying
$cos^2(x)=(1-sin(x))(1+sin(x))$

Factor the right hand side
$cos^2(x)=1+sin(x)-sin(x)-sin^2(x)$
$cos^2(x)=1-sin^2(x)$

Adding $sin^2(x)$ both sides gives the identity
$sin^2(x)+cos^2(x)=1$

This identity is true for any value of $x$ in the real numbers $RR$

However, recall that denominators cannot be zero, so the answer is all $RR$ except wherever

$cos(x)=0$ , so when $x=pi/2(2n-1)$ , where $ninZZ$
and $sin(x)=1$ , so when $x=pi/2(4n+1)$ , where $ninZZ$

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