1 Answer

Montells · Answer 1 · 2021-05-05T04:01:09+0000

Explanation:

We know that tan=sin/cos, so tan(x+π/2)=

(sin(x+pi/2))/(cos(x+pi/2))

Then, we know that sin(u+v)=sin(u)cos(v)+cos(u)sin(v),

so our equation is then

$(sin(x)cos(\pi/2)+cos(x)sin(\pi/2))/(cos(x+\pi/2)) = (cos(x))/(cos(x+\pi/2) )$

Then, cos(u+v)=cos(u)cos(v)-sin(u)sin(v), so our expression is then

$(cos(x))/(cos(x)cos(\pi/2)-sin(x)sin(\pi/2)) = (cos(x))/(-sin(x)) = -cot(x)$

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