Asked by Hou
Show that if a rectangle has its base on the x-axis and two of its vertices on the curve y = e^-x^2 , then the rectangle will have the largest possible area when the two vertices are at the points of inflection of the curve.
Answers
Answered by
Reiny
let (x,y) be the point of contact in quadrant I, then (-x,y) is the other vertex.
base of rectange = 2x
height of rectange = y = e^(-x^2)
area = 2xy
= 2x(e^(-x^2))
d(area)/dx = 2x(e^(-x^2))(-2x) + 2e(-x^2)
= 0 for a max of area
2e^(-x^2)[-2x^2 + 1] = 0
2e^(-x^2) = 0 ---> no solution or
-2x^2 + 1 = 0
x = ± 1/√2
then y = e^(-1/2) = 1/√e
max area occurs when vertices are (1/√2, 1/√e) and (-1/√2, 1/√e)
I will leave it up to you to differentiate
y = e^(-x^2) twice, set that equal to zero, and show that x = ±1/√2
base of rectange = 2x
height of rectange = y = e^(-x^2)
area = 2xy
= 2x(e^(-x^2))
d(area)/dx = 2x(e^(-x^2))(-2x) + 2e(-x^2)
= 0 for a max of area
2e^(-x^2)[-2x^2 + 1] = 0
2e^(-x^2) = 0 ---> no solution or
-2x^2 + 1 = 0
x = ± 1/√2
then y = e^(-1/2) = 1/√e
max area occurs when vertices are (1/√2, 1/√e) and (-1/√2, 1/√e)
I will leave it up to you to differentiate
y = e^(-x^2) twice, set that equal to zero, and show that x = ±1/√2
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