Ohio Educators Math Exam Practice 2026 – Complete Prep Guide

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Question: 1 / 400

The derivative of cos⁻¹(u) can be expressed as?

-1/√(1-u²) du/dx

The derivative of the inverse cosine function, denoted as cos⁻¹(u), is derived using the chain rule from calculus. The general formula for the derivative of the inverse cosine function is given as:

\[ \frac{d}{du}[\cos^{-1}(u)] = -\frac{1}{\sqrt{1 - u^2}}. \]

When applying the chain rule, this derivative is multiplied by the derivative of $ u $ with respect to $ x $, which is represented as $ \frac{du}{dx} $. Thus, the full expression becomes:

\[ \frac{d}{dx}[\cos^{-1}(u)] = -\frac{1}{\sqrt{1 - u^2}} \cdot \frac{du}{dx}. \]

This matches the correct choice. The negative sign indicates that as $ u $ increases, the value of the inverse cosine function decreases, which is consistent with the properties of the cosine function. Additionally, the $ \sqrt{1-u^2} $ term stems from the Pythagorean identity, ensuring that the derivative is only defined for values $ u $ in the range of -1 to 1, where

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1/√(1-u²) du/dx

-1/(1-u²) du/dx

-1/u√(1+u²) du/dx

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Ohio Educators Math Exam Practice 2026 – Complete Prep Guide

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