Mathematics: Find the exact atea under y=x^2 on the interval [0,2] by using an infinite number of circumscribed rectangles. (hint: 1^2 + 2^2 + 3^2 + +n^2= n(n+1) (2n+1) /6.)

Find the exact atea under y=x^2 on the interval

Ответ:

laura52677

09.03.2022

$\bold{\dfrac{8}{3}}$

Step-by-step explanation:

$\int\limits^2_0 {x^2} \, dx =\dfrac{x^3}{3}\bigg|^2_0=\bigg(\dfrac{2^3}{3}\bigg)-\bigg(\dfrac{0^3}{3}\bigg)=\dfrac{8}{3}-0=\dfrac{8}{3}$

NOTE: Neither the Trapezoidal Rule or Reimann Sums can be used without the number of rectangles (n) you are separating the interval into. Besides, they only provide an estimate. If you want the EXACT area, you must use integration.

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Ответ:

amariyanumber474

09.03.2022

Mathematics

We first partition the interval [0, 2] into sub-intervals:

$\left[0,\dfrac2n\right],\left[\dfrac2n,\dfrac4n\right],\left[\dfrac4n,\dfrac6n\right],\ldots,\left[\dfrac{2(n-1)}n,2\right]$

Notice how each sub-interval has length $\dfrac2n$ .

Since y=x^2 is an increasing function on the interval [0, 2] (which is evident from the fact that $\dfrac{\mathrm dy}{\mathrm dx}=2x0$ for ), the circumscribed rectangles will have heights determined by the right endpoints of each sub-interval. This is to say, for the -th sub-interval, the area of the rectangle is