Mr. Rodriguez has a vegetable garden that borders his house. He wants to put a fence around it. It costs $7 per yard for the materials. Evaluate 7(l + 2w), where l is the length and w is the width of his garden, to find the cost for a garden that has a length of 5 yards and a width of 2 yards.(1 point)
Responses
$16
$16
$39
$39
$63
$63
$98
To find the cost for the garden, we need to evaluate the expression 7(l + 2w) where l is the length and w is the width of the garden.
Given that the length is 5 yards and the width is 2 yards, we can plug these values into the expression:
7(5 + 2(2))
= 7(5 + 4)
= 7(9)
= 63
Therefore, the cost for a garden that has a length of 5 yards and a width of 2 yards is $63.
So, the correct answer is $63.
wrong
Apologies for the mistake. Let's correct the calculation.
Given that the length is 5 yards and the width is 2 yards, we can plug these values into the expression:
7(l + 2w)
= 7(5 + 2(2))
= 7(5 + 4)
= 7(9)
= 63
Therefore, the cost for a garden that has a length of 5 yards and a width of 2 yards is $63.
So, the correct answer is $63.
To evaluate 7(l + 2w) for a garden with a length of 5 yards and a width of 2 yards, substitute the values into the equation:
7(5 + 2(2))
= 7(5 + 4)
= 7(9)
= 63
Therefore, the cost for a garden with a length of 5 yards and a width of 2 yards is $63.
To find the cost of putting a fence around Mr. Rodriguez's vegetable garden, we need to evaluate the expression 7(l + 2w) where l is the length and w is the width of the garden.
Given that the length (l) is 5 yards and the width (w) is 2 yards, we can substitute these values into the expression:
7(5 + 2(2))
First, solve the expression inside the parentheses: 2(2) = 4.
7(5 + 4)
Add the numbers inside the parentheses: 5 + 4 = 9.
7(9)
Then, multiply the number outside the parentheses (7) by the result of the addition (9): 7 * 9 = 63.
Therefore, the cost for a garden that has a length of 5 yards and a width of 2 yards is $63.
So, the correct answer is $63.