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How do I solve this problem?Prove the two expressions are equal

How do I solve this problem?Prove the two expressions are equal-example-1
User Laughy
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1 Answer

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ANSWER

See the explanation for the proof.

Step-by-step explanation

First we have to write the secant and the cotangent in terms of sine and cosine:


\sec x=(1)/(\cos x)
\cot x=(\cos x)/(\sin x)

Replace into the equation,


-2\mleft((\cos x)/(\sin x)\mright)^2=(1)/((1)/(\cos x)+1)-(1)/((1)/(\cos x)-1)

On the left side distribute the square and on the right side do the addition and subtraction in the denominators,


-2(\cos^2x)/(\sin^2x)^{}=(1)/((1+\cos x)/(\cos x))-(1)/((1-\cos x)/(\cos x))

1 over a fraction is equivalent to the reciprocal of the fraction,


-2(\cos^2x)/(\sin^2x)^{}=(\cos x)/(1+\cos x)-(\cos x)/(1-\cos x)

Now do the subtraction on the right side,


-2(\cos^2x)/(\sin^2x)^{}=(\cos x(1-\cos x)-\cos x(1+\cos x))/((1+\cos x)(1-\cos x))

Note that the denominator is a difference of two squares,


-2(\cos^2x)/(\sin^2x)^{}=(\cos x(1-\cos x)-\cos x(1+\cos x))/(1-\cos ^2x)

Apply the distributive property on the two terms of the numerator,


-2(\cos^2x)/(\sin^2x)^{}=(\cos x-\cos ^2x-\cos x-\cos ^2x)/(1-\cos ^2x)
-2(\cos^2x)/(\sin^2x)^{}=(-\cos ^2x-\cos ^2x)/(1-\cos ^2x)
-2(\cos^2x)/(\sin^2x)^{}=(-2\cos ^2x)/(1-\cos ^2x)

Now, for the denominator remember the trigonometric identity


\sin ^2\alpha+\cos ^2\alpha=1

If we solve it for sin²α


\sin ^2\alpha=1-\cos ^2\alpha

Therefore, the expression we have in the denominator of the right side of the equation is equivalent to sin²x,


-2(\cos^2x)/(\sin^2x)^{}=-2(\cos ^2x)/(\sin ^2x)

Now we have on both sides,


-2\cot ^2x=-2\cot ^2x

Hence, we have proven that the two expressions are equivalent.

User Erimerturk
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