Ohio Educators Math Exam Practice 2025 – Complete Prep Guide

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Question: 1 / 400

What is the integral of csc(x)cot(x)dx?

-csc(x)

The correct answer to the integral of csc(x)cot(x)dx is indeed -csc(x).

To understand why this is the case, we first need to recall the definitions of the trigonometric functions involved. The cosecant function, csc(x), is defined as 1/sin(x), and cotangent, cot(x), is defined as cos(x)/sin(x). Therefore, the product csc(x)cot(x) can be rewritten as (1/sin(x))(cos(x)/sin(x)), which simplifies to cos(x)/sin^2(x).

When integrating csc(x)cot(x), we can utilize a substitution approach. Notice that the derivative of csc(x) is -csc(x)cot(x). This relationship shows that when we integrate csc(x)cot(x) with respect to x, we are essentially reversing the differentiation process for csc(x).

Integrating csc(x)cot(x)dx, we get -csc(x) + C, where C is the constant of integration. Thus, the integral directly leads to -csc(x), confirming that this is the correct result.

Other options, such as csc(x), sin(x), and cot(x), either

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csc(x)

sin(x)

cot(x)

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Ohio Educators Math Exam Practice 2025 – Complete Prep Guide

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