Studdy AI Logo
Math

QuestionFind the hours for which total costs are equal for two kayak shops: A: \$2 + \$7h, B: \$5 + \$6h.

Studdy Solution

STEP 1

Assumptions1. Shop A has a rental fee of andanhourlyfeeof and an hourly fee of 7. Shop B has a rental fee of 5andanhourlyfeeof5 and an hourly fee of 63. We want to find the number of hours for which the total costs at both shops are the same

STEP 2

Let's denote the number of hours for which the kayak is rented as hh. The total cost at Shop A for hh hours can be calculated by adding the rental fee to the product of the hourly fee and the number of hours.
CostA=RentalfeeA+HourlyfeeAtimeshCost_{A} = Rental\, fee_{A} + Hourly\, fee_{A} \\times h

STEP 3

Substitute the given values for the rental fee and hourly fee at Shop A into the formula.
CostA=$2+$7timeshCost_{A} = \$2 + \$7 \\times h

STEP 4

Similarly, the total cost at Shop B for hh hours can be calculated by adding the rental fee to the product of the hourly fee and the number of hours.
CostB=RentalfeeB+HourlyfeeBtimeshCost_{B} = Rental\, fee_{B} + Hourly\, fee_{B} \\times h

STEP 5

Substitute the given values for the rental fee and hourly fee at Shop B into the formula.
CostB=$5+$timeshCost_{B} = \$5 + \$ \\times h

STEP 6

We want to find the number of hours for which the total costs at both shops are the same. This means that we can set the total cost at Shop A equal to the total cost at Shop B and solve for hh.
CostA=CostBCost_{A} = Cost_{B}

STEP 7

Substitute the formulas for CostACost_{A} and CostBCost_{B} into the equation.
$2+$7timesh=$5+$6timesh\$2 + \$7 \\times h = \$5 + \$6 \\times h

STEP 8

To solve for hh, first simplify the equation by subtracting \$6h from both sides.
$2+h=$5\$2 + h = \$5

STEP 9

Then, subtract \2frombothsidestoisolate2 from both sides to isolate h$.
h=$5$2h = \$5 - \$2

STEP 10

Calculate the value of hh.
h=$3h = \$3So, the total costs are the same when a kayak is rented for3 hours.

Was this helpful?

Studdy solves anything!

banner

Start learning now

Download Studdy AI Tutor now. Learn with ease and get all help you need to be successful at school.

ParentsInfluencer programContactPolicyTerms
TwitterInstagramFacebookTikTokDiscord