How does cot(x)sin(x)=cos^3(x)+cos(x)sin^2(x)?

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asked May 13, 2019 99.9k views

5 votes

How does cot(x)sin(x)=cos^3(x)+cos(x)sin^2(x)?

Mathematics
high-school

Marin Leontenko asked

by Marin Leontenko

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1 Answer

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$\cot(x)\sin(x)=\cos^3(x)+\cos(x)\sin^2(x)$

$R=\cos(x)[\cos^2(x)+\sin^2(x)]=\cos(x)\cdot1=\cos(x)\\\\L=(\cos(x))/(\sin(x))\cdot\sin(x)=\cos(x)\\\\L=R\\\\\text{used:}\\\\\sin^2x+\cos^2x=1\\\\\cot x=(\cos x)/(\sin x)$

Tuhina Singh answered May 17, 2019

by Tuhina Singh

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