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Given the functions m(x) = 4x − 11 and n(x) = x − 10, solve m[n(x)] and select the correct answer below. (2 points) Select one: a. m[n(x)] = 4x − 51 b. m[n(x)] = 4x − 29 c. m[n(x)] = 4x^2 − 51 d. m[n(x)]
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Given the functions m(x) = 4x − 11 and n(x) = x − 10, solve m[n(x)] and select the correct answer below. (2 points)

Select one:
a. m[n(x)] = 4x − 51
b. m[n(x)] = 4x − 29
c. m[n(x)] = 4x^2 − 51
d. m[n(x)] = 4x^2 − 29

User Dhunt
by
7.6k points

2 Answers

0 votes

Answer:

got it right and was option A thx

Explanation:

User Konquestor
by
6.8k points
3 votes
For this case what we must do is a composition of functions which will be given by:
m (x) = 4x - 11
n (x) = x - 10
We have then:
m [n (x)] = 4 (x - 10) - 11
Rewriting the function:
m [n (x)] = 4x - 40 - 11
m [n (x)] = 4x - 51
Answer:
a. m [n (x)] = 4x - 51
User Lithuak
by
7.3k points
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