Posted by **Erica** on Tuesday, December 7, 2010 at 7:44am.

Find the area of the largest rectangle that can be inscribed under the curve y = e^(-x^2) in the first and second quadrants.

## Answer this Question

## Related Questions

- Calculus - I have to find the area of the largest possible rectangle that can be...
- calculus - A rectangle is to be inscribed under the arch of the curve y=4cos(.5x...
- Calculus - 3) Consider rectangles located as shown in the first quadrant and ...
- calculus - A rectangle with its base on the x-axis is to be inscribed under the ...
- calculus - A rectangle with its base on the x-axis is to be inscribed under the ...
- calc - a rectangle is inscribed in the upper half of the circle x^2+y^2=a^2 ...
- Calculus - Hello, could someone please help me with this problem? I'm a little ...
- Math - The first question is this: Helen designs a rectangle with an area of 225...
- Calculus - Show that the rectangle with the largest area that is inscribed ...
- calculus - Let A(x) be the area of the rectangle inscribed under the curve with ...

More Related Questions