For the graphed function f(x) = −(5)x − 3 + 2, calculate the average rate of change from x = 3 to x = 4. graph of f of x equals

Question

For the graphed function f(x) = −(5)x − 3 + 2, calculate the average rate of change from x = 3 to x = 4.

graph of f of x equals negative 1 times 5 to the x minus 3 power, plus 2

(6 points)

a
−4

b
4

c
1

d
−1

in progress 0
Mackenzie 2 weeks 2021-11-14T01:03:22+00:00 2 Answers 0 views 0

Answers ( )

    0
    2021-11-14T01:04:25+00:00

    -4 is the answer to this solution

    0
    2021-11-14T01:04:30+00:00

    Answer:

    -4 is the average rate of change from 3 to 4

    Step-by-step explanation:

    Average rate of change is defined as the fraction of change in f(x) value to change in x value.

    Here we have x values as 3 and 4.

    To find the average rate of change from x=3 to x=4

    Average rate of change = change in f(x)/change in x

    f(4) = -5^{4-3} +2 = -3\\f(3) = 1\\f(4)-f(3) = -3-1 =-4

    Change in x = 4-3 =1

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45:7+7-4:2-5:5*4+35:2 =? ( )