When working in decimal radians, how do you find the cot^-1(-5)?

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When working in decimal radians, how do you find the cot^-1(-5)?

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Answer 1 · 2015-10-24T14:42:24

Use your calculator and compute it as ${cot}^{- 1} (- 5) = {tan}^{- 1} (- \frac{1}{5}) \approx - 0.197396$ $cot^{-1}(-5)=tan^{-1}(-1/5) approx -0.197396$ radians.

Explanation:

Since $cot (θ) = \frac{1}{tan (θ)}$ $cot(theta)=1/tan(theta)$ , it follows that ${cot}^{- 1} (5)$ $cot^{-1}(5)$ can be thought of as an angle $θ$ $theta$ in a right triangle where the ratio of the adjacent side over the opposite side is $5 = \frac{5}{1}$ $5=5/1$ . Therefore, the tangent of that angle $θ$ $theta$ is $\frac{1}{5}$ $1/5$ (opposite over adjacent).

Now the tangent function is an odd function, so $tan (- θ) = - \frac{1}{5}$ $tan(-theta)=-1/5$ and therefore ${tan}^{- 1} (- \frac{1}{5}) = - θ$ $tan^{-1}(-1/5)=-theta$ . It follows that ${tan}^{- 1} (- \frac{1}{5})$ $tan^{-1}(-1/5)$ is the answer you want. Now use your calculator (in radian mode).

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When working in decimal radians, how do you find the cot^-1(-5)?

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Explanation:

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