Chapter 5.5, Problem 20STP

To determine

To find:The correct choice for different equivalent rate ofcost to number of hours for renting a boat for 4 hours is $\$51$ .

Answer to Problem 20STP

The correct choice is (J) that is different equivalent rate of cost to number of hours for renting a boat for 4 hours is $\$51$ .

Explanation of Solution

Given information: The cost to number of hour for renting a boat is $\frac{\$51}{4\text{hours}}$ .

Calculation:

Equivalent rate is same as equivalent ratio in which two ratio must have the same value.

The cost to number of hour for renting a boat in ratio is:

  $\text{Ratio}=\frac{\$51}{4\text{hours}}$

To find the equivalent rateof $\frac{\$51}{4\text{hours}}$ , divide the numerator and denominator of above conversion by $4$ .

  $\begin{array}{c}\text{Ratio}=\frac{\left(\$51\right)÷4}{\left(4\text{hours}\right)÷4}\\ =\frac{\$12.75}{1\text{hour}}\end{array}$

The non-equivalent rate can be calculated from the given options as follows:

To find the equivalent rate of $\frac{\$76.5}{6\text{hours}}$ , divide the numerator and denominator of above conversion by $6$ .

  $\frac{\left(\$76.5\right)÷6}{\left(6\text{hours}\right)÷6}=\frac{\$12.75}{1\text{hour}}$

To find the equivalent rate of $\frac{\$38.25}{3\text{hours}}$ , divide the numerator and denominator of above conversion by $3$ .

  $\frac{\left(\$38.25\right)÷3}{\left(3\text{hours}\right)÷3}=\frac{\$12.75}{1\text{hour}}$

To find the equivalent rate of $\frac{\$89.25}{7\text{hours}}$ , divide the numerator and denominator of above conversion by $7$ .

  $\frac{\left(\$89.25\right)÷7}{\left(7\text{hours}\right)÷7}=\frac{\$12.75}{1\text{hour}}$

To find the equivalent rate of $\frac{\$63}{5\text{hours}}$ , divide the numerator and denominator of above conversion by $5$ .

  $\frac{\left(\$63\right)÷5}{\left(5\text{hours}\right)÷5}=\frac{\$12.6}{1\text{hour}}$

Therefore, the correct choice is (J) that is different equivalent rate of cost to number of hours for renting a boat for 4 hours is $\$51$ .