Question

Question #0c324

Answer 1

`-10/3`.

Explanation:

Comparing the given integral with `int_b^a f(x)dx," we have, "b=2, a=0, f(x)=3-x^2`.

Hence, `Deltax=(a-b)/n=(0-2)/n=-2/n=h," say, ":. nto oo, h to 0`.

`"Also, "x_i=b+iDeltax=2+i(-2/n)=2+ih.`

Note that, `nh=-2.`

`:. I=int_2^0 (3-x^2)dx`

`=lim_(n to oo) sum_(i=1)^(i=n)f(x_i)Deltax`

Since, `f(x_i)=f(2+ih)=3-(2+ih)^2=-1-4ih-i^2h^2,`

`I=lim_(n to oo,htoo) sum_(i=1)^(i=n)(-1-4ih-i^2h^2)h`

`=limsum(-h-4ih^2-i^2h^3)`

`=lim[-sumh-4h^2sumi-h^3sumi^2]`

`=lim[-hsum1-(4h^2){(n)(n+1)}/2-(h^3){(n)(n+1)(2n+1)}/6]`

`=lim_(hto0)[-hn-2(hn)(hn+h)-1/6(hn)(hn+h)(2hn+h)]`

`=[-(-2)-2(-2)(-2+0)-1/6(-2)(-2+0){2(-2)+0}]......[because, nh=-2]`

`=2-8+8/3=-6+8/3`

`:. I=-10/3.`

Verification :-

`int_2^0 (3-x^2)dx=[3x-x^3/3]_2^0=0-(6-8/3)=-10/3.`

Enjoy Maths!