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What is the rate of change for the interval between 0 and 2 for the quadratic equation as f(x) = 2x2 + x – 3 represented in the table? (The table has this: Left side X and the options going down are -2,
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What is the rate of change for the interval between 0 and 2 for the quadratic equation as f(x) = 2x2 + x – 3 represented in the table? (The table has this: Left side X and the options going down are -2, -1, 0, 1, 2. Right Side f(x) and the options going down are 3, -2, -3, 0, 7) THE ANSWER OPTIONS ARE: 1/5, 4, 5, 10

User Jelaby
by
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2 Answers

6 votes

Answer:

(C) 5

Explanation:

♥☺

User Vilva
by
7.2k points
3 votes
By definition the rate of change of a function is given by:

AVR = (f(x2) - f(x1))/(x2 - x1)
For the interval [0, 2] We have to make use of the table:

f(0)=-3 f(2)=7
Therefore, substituting values in the given expression we have that the average change of rate is given by:

AVR = (7-(-3))/(2-0)
Rewriting we have:

AVR = (7+3)/(2-0)

AVR = (10)/(2)

AVR = 5
Answer:
the rate of change for the interval between 0 and 2 is:

AVR = 5
User Jgong
by
9.0k points
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