How do you prove $(sinx + cosxcotx)/cotx = secx$ ?

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Answer 1 · 2015-05-17T12:12:45

We need to get the left side equal to the right side:

So we will look at $=(sinx + cosxcotx)/cotx$

we can use the identity of $color(red)(cotx = cosx/sinx)$ here

so we will have $=(sinx + cosx(cosx/sinx))/(cosx/sinx)$

if we now take out a $color(red)(1/sinx)$ from the top, we will have:

$=((1/sinx)(sin^2x + cos^2x))/(cosx/sinx)$

there we can use the identity that $color(red)(sin^2x + cos^2x = 1)$

thus we are left with $=(1/sinx)/(cosx/sinx)$

which we can write as $=(1/sinx)(sinx/cosx)$

the $color(red)(sinx)$ 's will cancel each other, and we will be left with:

$= (1/cosx)$

which is our identity to $color(red)((1/cosx) = secx)$

thus we get $=secx$

and we have that the right hand side $=$ to left hand side

How do you prove (sinx + cosxcotx)/cotx = secx(sinx + cosxcotx)/cotx = secx?