menu
Qammunity
Login
Register
My account
Edit my Profile
Private messages
My favorites
Ask a Question
Questions
Unanswered
Tags
Categories
Ask a Question
Derivative of g(x) = (2ra^(rx)+n)^p ?
asked
Oct 18, 2017
47.7k
views
4
votes
Derivative of g(x) = (2ra^(rx)+n)^p ?
Mathematics
high-school
Diavolic
asked
by
Diavolic
8.7k
points
answer
comment
share this
share
0 Comments
Please
log in
or
register
to add a comment.
Please
log in
or
register
to answer this question.
1
Answer
1
vote
the main formula of derivative
if g(x) = a^x, so g'(x) = a^x. lna, a>0, a # 1,
so g ' (x) = [(2ra^(rx)+n)^p] = 2r.a^(rx)+n)^p . ln a
so g ' (x) = 2r. ln a. a^(rx)+n)^p
Stephane Lallemagne
answered
Oct 22, 2017
by
Stephane Lallemagne
8.7k
points
ask related question
comment
share this
0 Comments
Please
log in
or
register
to add a comment.
← Prev Question
Next Question →
Related questions
asked
Aug 22, 2021
177k
views
2Ra=B a=? Please help
Adnan Masood
asked
Aug 22, 2021
by
Adnan Masood
7.2k
points
Mathematics
college
1
answer
3
votes
177k
views
asked
Jan 25, 2022
54.1k
views
Completa las siguientes formas verbales del verbo TRABAJAR según corresponda: 1ra persona del singular: Yo trabajo 2ra persona del singular: 3ra persona del singular: 1ra persona del plural: 2ra persona
Eric Stermer
asked
Jan 25, 2022
by
Eric Stermer
8.8k
points
Spanish
high-school
1
answer
3
votes
54.1k
views
asked
Dec 7, 2022
216k
views
2ra 5r 55 X is - 52 1402
Daenyth
asked
Dec 7, 2022
by
Daenyth
7.8k
points
Mathematics
high-school
1
answer
4
votes
216k
views
Ask a Question
Welcome to QAmmunity.org, where you can ask questions and receive answers from other members of our community.
9.4m
questions
12.2m
answers
Other Questions
How do you can you solve this problem 37 + y = 87; y =
What is .725 as a fraction
How do you estimate of 4 5/8 X 1/3
A bathtub is being filled with water. After 3 minutes 4/5 of the tub is full. Assuming the rate is constant, how much longer will it take to fill the tub?
Mr. Jacob is 55 years old and tony is 7 years old. in how many years will mr. Jacobs be 4 times as old as Tony
Twitter
WhatsApp
Facebook
Reddit
LinkedIn
Email
Link Copied!
Copy
Search Qammunity