Asked by mat
I have to find the area of the largest possible rectangle that can be inscribed under the curve y=e^(-x^2) in the first and second quadrants.
How do I do this?
It is symmetrical, so one could ignore the second quadrant, and work on the largest rectangle in the first quadrant.
Area= xy= x e^(-x^2)
dArea/dx=0 = ....you do it, solve for x.
How do I do this?
It is symmetrical, so one could ignore the second quadrant, and work on the largest rectangle in the first quadrant.
Area= xy= x e^(-x^2)
dArea/dx=0 = ....you do it, solve for x.
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