Register
Find the derivative of arctan(10x)
17.3k views
1 vote
Find the derivative of arctan(10x)

User ShatyUT
by
3.9k points

2 Answers

5 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 Vincent Marchetti
by
4.2k points
7 votes

Answer:


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

Find the derivative of arctan(10x)-example-1
User Jeff Voss
by
4.7k points
Ask a Question
Welcome to QAmmunity.org, where you can ask questions and receive answers from other members of our community.

4.7m questions

6.0m answers

Other Questions

I need to simplify this expression.
Which property is shown in the problem below? -8(x-3y-9) = -8x+24y+72 A the associative property B the commutative property C the distributive property D the division property ASAP
What is the domain and range?
What does translation means in math? I am taking a quiz on this right now, I need an answer ASAP!!!!!!
If in circle A is 60°, what is m∠BDC? A. 60 B. 45 C. 30 D. 25
Link Copied!