SOLUTION: A landscape architect is planning a circular flower
bed that will be surrounded by a ring of paving
stones, 25 cm wide. The area of the ring of paving
stones will be half the ar
Algebra ->
Quadratic Equations and Parabolas
-> SOLUTION: A landscape architect is planning a circular flower
bed that will be surrounded by a ring of paving
stones, 25 cm wide. The area of the ring of paving
stones will be half the ar
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Question 1177833: A landscape architect is planning a circular flower
bed that will be surrounded by a ring of paving
stones, 25 cm wide. The area of the ring of paving
stones will be half the area of the flower bed.
Determine the radius of the flower bed, to the
nearest centimetre. Found 3 solutions by mananth, greenestamps, ikleyn:Answer by mananth(16949) (Show Source):
The other tutor got lost in the middle of her calculations....
The area of the ring of paving stones is half the area of the garden, so the area of the garden plus paving stones is 1.5 times the area of the garden.
Radius of the garden = r
Radius of garden plus paving stones = r+25
You can put this solution on YOUR website! .
A landscape architect is planning a circular flower bed that will be surrounded by a ring of paving
stones, 25 cm wide. The area of the ring of paving stones will be half the area of the flower bed.
Determine the radius of the flower bed, to the nearest centimetre.
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The solution by @mananth is incorrect due to arithmetic errors on the way.
I came to bring a correct solution.
pi*(r+25)^2 - pi*r^2 = (1/2)*pi*r^2
Cancel pi in both sides
(r+25)^2 - r^2 = (1/2)*r^2
r^2 + 50r + 625 - r^2 = (1/2)*r^2
50r + 625 = (1/2)r^2
r^2 - 100r - 1250 = 0
Use the quadratic formula and find r = .
It gives a unique meaningful positive solution x = = 111 cm, rounded. ANSWER
