Answer:
f(L)=-L²*26L
Step-by-step explanation:
Let's start by looking at the formula for a rectangle's perimeter (which is what the fencing implies): [tex]2L+2W=52[/tex]
When the question asks for the garden's area as a function of the length, it's basically saying "whatever value is in the function (as in f(value) ), make that value be the length."
But first we have to find L*W, because that's the function of the area.
1.) Solve for W
[tex]2L+2W=52\\2W=52-2L\\W = 26-L[/tex]
2.) Plug in W for the function L*W[tex]L*(26-L)\\-L^2*26L\\\\Answer: f(L)=-L^2*26L[/tex]
Answer:
Area, A(x) = 26x - x² , as a function of the length (x).
Step-by-step explanation:
Yardbird Landscaping has 52 m of fencing with which to enclose a rectangular garden.
Let x be the length of garden
So perimeter of rectangle = 52 m
Perimeter = 2 x ( Length + width)
52 = 2 x ( x + width)
Width= 26 - x
[tex]\texttt{Area = Length x Width}\\\\\texttt{Area =}x\times (26-x)=26x-x^2\\\\\texttt{Area =}26x-x^2[/tex]
Area, A(x) = 26x - x² , as a function of the length (x).
