Mr. Rodriguez has a vegetable garden that borders his house. He wants to put a fence around it cost seven dollars per yard for the material evaluate 7(l +2w) we’re ELLIS 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
To find the cost for a garden with a length of 5 yards and a width of 2 yards, we plug these values into the expression for cost which is 7(l + 2w).
Given:
Length (l) = 5 yards
Width (w) = 2 yards
Cost (C) = 7(l + 2w)
Plugging in the values:
C = 7(5 + 2(2))
Simplifying:
C = 7(5 + 4)
C = 7(9)
C = 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 fencing Mr. Rodriguez's garden, we can substitute the values of the length (l) and width (w) into the formula 7(l + 2w).
Given:
Length (l) = 5 yards
Width (w) = 2 yards
Substituting these values into the formula, we have:
7(5 + 2*2)
First, we simplify the multiplication inside the brackets:
7(5 + 4)
Next, we simplify the addition inside the brackets:
7(9)
Finally, we perform the multiplication:
63
Therefore, the cost of fencing Mr. Rodriguez's garden is 63 dollars.
To find the cost for Mr. Rodriguez's garden, we need to substitute the values of length (l) and width (w) into the given expression. In this case, the length is 5 yards and the width is 2 yards.
The expression provided is:
E = 7(l + 2w)
Let's substitute the values:
E = 7(5 + 2*2)
First, we need to calculate 2*2:
E = 7(5 + 4)
Now, we can simplify the expression inside the parentheses:
E = 7(9)
Next, perform the multiplication:
E = 63
Therefore, the cost of the garden with a length of 5 yards and a width of 2 yards is $63.