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8 votes
8 votes
Find the derivative of arctan(10x)

User Andreu Ramos
by
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2 Answers

12 votes
12 votes

Answer:

dy/dx=10/(1+100x^2)

Explanation:

Let y=arctan(10x).

Then tan(y)=10x.

Differentiate both sides:

sec^2(y)×dy/dx=10

Divide both sides by sec^2(y):

dy/dx=10/sec^2(y)

By a Pythagorean identity:

dy/dx=10/(1+tan^2(y))

Recall tan(y)=10x:

dy/dx=10/(1+(10x)^2)

dy/dx=10/(1+100x^2)

User JMcCarty
by
3.1k points
28 votes
28 votes

Answer:


\frac{10}{100x {}^(2) + 1 }

Find the derivative of arctan(10x)-example-1
User MorganFreeFarm
by
2.7k points