Question #fc13e

2 Answers
Jim H
Oct 23, 2016

Let y = arccot x

Then x = cot y.

Differentiate implicitly to get

1 = -csc^2 y * dy/dx

So that dy/dx = -1/csc^2 y

Recall from trigonometry that 1+cot^2y = csc^2 y so

dy/dx = -1/(1+cot^2y)

Finally replace cscy with x (from the second line of the explanation.)

dy/dx = -1/(1+x^2)

sente
Oct 23, 2016

Explanation:

We'll use implicit differentiation:

Let y = "arccot"(x)

=> cot(y) = x

=> d/dxcot(y) = d/dxx

=> -csc^2(y)dy/dx = 1

=> dy/dx = -1/csc^2(y)

Now let's see what csc^2(y) is in terms of x. Draw a right triangle with an angle y such that cot(y) = x (i.e. y= "arccot"(x)):

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Setting the legs so that cot(y) = x, we can find the length of the hypotenuse as sqrt(1+x^2) using the Pythagorean theorem. Now we can calculate csc^2(y).

csc^2(y) = (csc(y))^2 = (sqrt(1+x^2)/1)^2 = 1+x^2

Substituting this in, we arrive at our answer:

("arccot"(x))' = dy/dx = -1/(1+x^2)

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