Math  /  Algebra

QuestionA party rental company has chairs and tables for rent. The total cost to rent 2 chairs and 6 tables is $42\$ 42. The total cost to rent 5 chairs and 3 tables is $30\$ 30. What is the cost to rent each chair and each table?
Cost to rent each chair: $\$ \square Cost to rent each table: $\$ \square

Studdy Solution

STEP 1

1. Let the cost to rent each chair be x x dollars.
2. Let the cost to rent each table be y y dollars.
3. The total cost to rent 2 chairs and 6 tables is 42.<br/>4.Thetotalcosttorent5chairsand3tablesis42.<br />4. The total cost to rent 5 chairs and 3 tables is 30.
5. We need to find the values of x x and y y .

STEP 2

1. Set up a system of equations based on the given information.
2. Solve the system of equations using substitution or elimination method.
3. Verify the solution.

STEP 3

Set up a system of equations based on the given information.
From the problem statement, we can write the following equations: 2x+6y=42 2x + 6y = 42 5x+3y=30 5x + 3y = 30

STEP 4

Solve the system of equations using the elimination method.
First, let's eliminate one of the variables. We can eliminate y y by making the coefficients of y y in both equations equal.
Multiply the first equation by 1 and the second equation by 2: 2x+6y=42 2x + 6y = 42 10x+6y=60 10x + 6y = 60
Now subtract the first equation from the second equation: (10x+6y)(2x+6y)=6042 (10x + 6y) - (2x + 6y) = 60 - 42 8x=18 8x = 18

STEP 5

Solve for x x .
Divide both sides by 8: x=188 x = \frac{18}{8} x=2.25 x = 2.25

STEP 6

Substitute x=2.25 x = 2.25 back into one of the original equations to solve for y y .
Using the first equation: 2(2.25)+6y=42 2(2.25) + 6y = 42 4.5+6y=42 4.5 + 6y = 42
Subtract 4.5 from both sides: 6y=37.5 6y = 37.5
Divide by 6: y=37.56 y = \frac{37.5}{6} y=6.25 y = 6.25

STEP 7

Verify the solution by substituting x=2.25 x = 2.25 and y=6.25 y = 6.25 into the second original equation.
5(2.25)+3(6.25)=30 5(2.25) + 3(6.25) = 30 11.25+18.75=30 11.25 + 18.75 = 30 30=30 30 = 30
The solution satisfies both equations.
Cost to rent each chair: \$\(\boxed{2.25}\) Cost to rent each table: \$\(\boxed{6.25}\)

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