Asked by dillon
At a large nursery, a border for a rectangular garden is being built. Designers want the border's length to be 5 ft greater than its width. A maximum of 180 ft of fencing is available for the border. Write and solve an inequality that describes possible widths of the garden.
Help appreaciated thanks.
Help appreaciated thanks.
Answers
Answered by
Quidditch
W=width
L=length
given:
L = W + 5
Maximum of 180 feet of fencing is available
So,
2L + 2W <= 180
Substitute the value for L and solve.
L=length
given:
L = W + 5
Maximum of 180 feet of fencing is available
So,
2L + 2W <= 180
Substitute the value for L and solve.
Answered by
Joshua
w=42.5
Answered by
Michael
Answer is x<42.5 ft
Answered by
Khan
Answer:
l<−w+90
l<−w+90
Answered by
Anonymous
At a large nursery , a border for a rectangular garden is being built Designers want the borders length to be 5 ft greater than its width . A maximum of 180 ft of fencing is available for the border . Write and solve an inequality that describes possible widths of the garden
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