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The length of a rectangular floor is 7 feet longer than its width w. The area of the floor is 505 ft2

.
(a) Write a quadratic equation in terms of w that represents the situation.
(b) What are the dimensions of the floor? Round to the nearest tenth.
Show your work.

User RisingHerc
by
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1 Answer

24 votes
24 votes

Answer:

Width is 19.24 ft and length is 24.24 ft

Explanation:

Step 1: Write an equation


A = l * w


505\ ft^2 = (7+w) * w


505\ ft^2 = (w*w) + (w*7)


505\ ft^2 - 505\ ft^2 = w^2 + 7w - 505\ ft^2


0= w^2 + 7w - 505\ ft^2

Step 2: Determine the dimensions

Use Quadratic formula


x=(-b\pm√(b^2-4ac))/(2a)


x=(-7\pm√((7)^2-4(1)(-505)))/(2(1))


x=(-7\pm√(2069))/(2)


x = (-7\pm45.486)/(2)


x=19.24,\ -26.24

Since length cannot be negative, we will use 19.24 for x.

Step 3: Determine the length


l = w + 5


l = 19.24 + 5


l = 24.24

Answer: Width is 19.24 ft and length is 24.24 ft