Duplicate Question
The question on this page has been marked as a duplicate question.
Original Question
A fence 4 feet tall runs parallel to a tall building at a distance of 5 feet from the building. What is the length of the short...Asked by Anonymous
A fence 4 feet tall runs parallel to a tall building at a distance of 6 feet from the building. What is the length of the shortest ladder that will reach from the ground over the fence to the wall of the building?
Answers
Answered by
Reiny
Make a diagram
let the foot of the ladder be x ft from the fence
let the ladder reach y ft above the ground
I see similar triangle so set up a ratio
4/x = y/(x+6)
xy = 4x+24
y = (4x+24)/x
let the length of the ladder be L
L^2 = (x+6)^2 + y^2
= (x+6)^2 + [(4x+24)/x]^2
2L dL/dx = 2(x+6) + 2[(4x+24)/x] (x(4) - (4x+24))/x^2
= 2(x+6) - 8(x+6)(-24)/x^3
= 0 for a min of L
2(x+6) - 192(x+6)/x^3 = 0
times x^3
2x^3(x+6) - 192(x+6) = 0
2(x+6)(x^3 - 96) = 0
x = -6 , which makes no sense
or
x = 96^(1/3) , (which is the cuberoot of 96)
x = 4.57886
sub back into L^2 = 197.3
L = 14.05 m
let the foot of the ladder be x ft from the fence
let the ladder reach y ft above the ground
I see similar triangle so set up a ratio
4/x = y/(x+6)
xy = 4x+24
y = (4x+24)/x
let the length of the ladder be L
L^2 = (x+6)^2 + y^2
= (x+6)^2 + [(4x+24)/x]^2
2L dL/dx = 2(x+6) + 2[(4x+24)/x] (x(4) - (4x+24))/x^2
= 2(x+6) - 8(x+6)(-24)/x^3
= 0 for a min of L
2(x+6) - 192(x+6)/x^3 = 0
times x^3
2x^3(x+6) - 192(x+6) = 0
2(x+6)(x^3 - 96) = 0
x = -6 , which makes no sense
or
x = 96^(1/3) , (which is the cuberoot of 96)
x = 4.57886
sub back into L^2 = 197.3
L = 14.05 m
There are no AI answers yet. The ability to request AI answers is coming soon!
Submit Your Answer
We prioritize human answers over AI answers.
If you are human, and you can answer this question, please submit your answer.