1 Answer

N K · Answer 1 · 2023-12-24T02:12:22+0000

From the statement of the problem, we have:

• The function A, given by a table of values of x and y,

,

• The function B, given by an equation.

1) For function A, we see that as x increases, the value of y also increases. We also see that the rate of change is constant, given by:

$m_A=(\Delta y)/(\Delta x)=(0-(-5))/(2.5-1.5)=5$

2) For function B, we have the equation:

The rate of change of the function is the slope of the line, which is the number that multiplies the variable x. So its rate of change is:

Considering the magnitude of the range of changes, we see that:

$\begin{gathered} |m_A|>|m_B| \\ 5>4.5 \end{gathered}$

So we conclude that the rate of change of function A is greater than the rate of change of function B.

Answer

Function A has a rate of change of 5 and function B has a rate of change of -4.5, so Function A has a greater rate of change.

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