Question

given the function defined in the table below, find the average rate of change, in simplest form, of the function over the interval $3 \leq x \leq 5$.
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$$\begin{tabular}{|c|c|} \\hline $x$ & $f(x)$ \\\\ \\hline 1 & 10 \\\\ \\hline 3 & 22 \\\\ \\hline 5 & 34 \\\\ \\hline 7 & 46 \\\\ \\hline 9 & 58 \\\\ \\hline \\end{tabular}$$

Explanation:

Step1: Recall the formula for average rate of change

The average rate of change of a function \( f(x) \) over the interval \( [a, b] \) is given by \( \frac{f(b) - f(a)}{b - a} \). Here, \( a = 3 \) and \( b = 5 \).

Step2: Find \( f(3) \) and \( f(5) \) from the table

From the table, when \( x = 3 \), \( f(3)=22 \); when \( x = 5 \), \( f(5)=34 \).

Step3: Substitute into the formula

Substitute \( a = 3 \), \( b = 5 \), \( f(3)=22 \), and \( f(5)=34 \) into the formula: \( \frac{f(5)-f(3)}{5 - 3}=\frac{34 - 22}{5 - 3} \).

Step4: Simplify the expression

First, calculate the numerator: \( 34 - 22 = 12 \). Then, calculate the denominator: \( 5 - 3 = 2 \). So, \( \frac{12}{2}=6 \).

Answer:

\( 6 \)