Unlocking The Pythagorean Identity: Simplifying Trigonometric Equations

1 + cot^2x =

csc^2x

There are a couple of ways to approach this problem, but one common method is to use the Pythagorean identity, which states that:

1 + tan^2x = sec^2x

We can rearrange this equation to isolate tan^2x, which gives us:

tan^2x = sec^2x – 1

Now, we can take the reciprocal of both sides to get:

cot^2x = 1 + cosec^2x

Substituting this expression into the original equation, we get:

1 + cot^2x = 1 + (1 + cosec^2x) = 2 + cosec^2x

Therefore, the answer is:

1 + cot^2x = 2 + cosec^2x

More Answers:
Mastering The Point-Slope Form: How To Find The Equation Of A Line Using Slope And A Single Point In Algebra.
The Ultimate Guide To Slope-Intercept Form And Linear Equations
The Pythagorean Identity: Exploring The Relationship Between The Sine And Cosine Functions In Trigonometry

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