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- General Solution of $y' = x \, \ln x$
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- Special products and factoring
- Newton's Law of Cooling
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- Eliminate the Arbitrary Constants
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## Recent comments

- 400000=120[14π(D2−10000)]

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## Re: area of the region bounded

## Re: area of the region bounded

## Re: area of the region bounded

The equation $y = x^2$ is an upward parabola and the $y = \sqrt{x}$ is a rightward parabola. The two has vertex at the origin and they meet at point (1, 1). The required area is dotted region in the figure below:

The area of the rectangular element is y dx, and y is the difference between the top end and bottom end of the strip. In equation,

$dA = y \, dx = (y_U - y_L) \, dx$

You sum (integrate) it up and you're good to go.

## Re: area of the region bounded

In reply to Re: area of the region bounded by Jhun Vert

Thank you po..