Question

How to solve this using integration ?

The curve `2y = x^3` and straight line `y = 2x` crossing at three dots, O, A and B.

(a) Find a limited area between curves `2y = x^3` with OA cores ( The answers : `2 unit^2` )

(b) Hence, find the area of ​​the shaded region bounded by the curve `2y = x^3` and the straight line `y = 2x` ( The answers : `4 unit^2` )

Answer 1

See the explanation below

Explanation:

We need

`intx^ndx=x^(n+1)/(n+1)+C (n!=-1)`

`"PART (a)"`

The limited area is

`dA_1=(y_1-y_2)dx=(2x-x^3/2)dx`

`A_1=int_0^2(2x-x^3/2)dx`

`=[x^2-x^4/8]_0^2`

`=(4-16/8)-(0)`

`=4-2=2u^2`

`PART (b)`

Either proceed by symmetry or perform the calculation

`A_2=int_-2^0(2x-x^3/2)dx`

`=[x^2-x^4/8]_-2^0`

`=(0)-(4-16/8)`

`=-2u^2`

Hence,

`|a_2|=2u^2`

The total shaded area is `=2+2=4u^2`