Gabrielle wants to put a border around her garden. It costs $1.50 per yard for the materials. Use 1.5(2l + 2w) where I is the length and w is the width of her garden, to find the cost for a garden that has a length of 4 yards and a width of 3 yards. (1 point)
Using the given formula, we can substitute the values of l and w into the equation:
1.5(2l + 2w)
= 1.5(2(4) + 2(3))
= 1.5(8 + 6)
= 1.5(14)
= <<1.5(14)=21>>21
Therefore, the cost for a garden with a length of 4 yards and a width of 3 yards is $21.
To find the cost for a garden with a length of 4 yards and a width of 3 yards, we can use the formula 1.5(2l + 2w) where l represents the length and w represents the width.
Let's substitute the values of length (l = 4) and width (w = 3) into the formula:
Cost = 1.5(2 * 4 + 2 * 3)
Simplifying the expression inside the brackets:
Cost = 1.5(8 + 6)
Adding the values inside the brackets:
Cost = 1.5(14)
Multiplying the value inside the parentheses by 1.5:
Cost = 21
Therefore, the cost for a garden with a length of 4 yards and a width of 3 yards to put a border around it would be $21.
To find the cost for Gabrielle's garden, we can use the given formula:
Cost = 1.5(2l + 2w)
Where:
l = length of the garden
w = width of the garden
Given that the length of the garden is 4 yards (l = 4) and the width is 3 yards (w = 3), we can substitute these values into the formula.
Cost = 1.5(2(4) + 2(3))
First, we solve the expression inside the parentheses:
2(4) = 8
2(3) = 6
Substituting the values and simplifying:
Cost = 1.5(8 + 6)
Cost = 1.5(14)
Cost = 21
Therefore, the cost for Gabrielle's garden, with a length of 4 yards and a width of 3 yards, is $21.