A rectangular garden is to be constructed using 100 metres of fencing but using a straight wall as one side.the rectangle is x metres.
Find the lenght of the garden in terms if x?
The rectangle is x meters what? wide? long?
do you mean x m^2, the area?
the areas of three flats a,b,c are in the ratio 5,6,8respectively .if the difference in the area of flat c and flat a is 270 squares metres ,what is the area of flat b in squares matres
Find the length of the garden in the terms of x
A rectangular garden is to be constructed using 100m of fancing ,but a straight wall as one side . The rectangle is x m wide
To find the length of the garden in terms of x, we need to determine the dimensions of the rectangular garden using the given information.
Let's assume the length of the garden is L meters and the width is W meters.
According to the problem, one side of the garden will be a straight wall. Therefore, the total length of the fencing used will be the sum of the lengths of the other three sides.
The length of the garden consists of two sides, each equal to L meters.
The width of the garden consists of one side, which is equal to W meters.
So, the equation for the perimeter can be written as:
Perimeter = 2L + W
And we're given that the total fencing used is 100 meters, so we have:
2L + W = 100
Since one side of the garden is a straight wall, we can assume that W = x. Hence, the equation becomes:
2L + x = 100
Now, we need to isolate L in terms of x. Subtracting x from both sides, we have:
2L = 100 - x
Dividing both sides by 2, we get:
L = (100 - x) / 2
Therefore, the length of the garden in terms of x is (100 - x) / 2.