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Question
Find the area of the region included between y2 = 2x and y = 2x.
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Solution
The vertex of the parabola y2 = 2x is at the origin O = (0, 0).
To find the points of intersection of the line and the parabola, equaling the values of 2x from both the equations we get,
∴ y2 = y
∴ y2 – y = 0
∴ y(y – 1) = 0
∴ y = 0 or y = 1
When y = 0, x = `0/2` = 0
When y = 1, x = `(1)/(2)`
∴ the points of intersection are O(0, 0) and `"B"(1/2, 1)`
Required area = area of the region OABCO
= area of the region OABDO – area of the region OCBDO
Now, area of the region OABDO
= area under the parabola y2 = 2x between x = 0 and x = `(1)/(2)`
= `int_0^(1//2)y * dx`, where `y = sqrt(2)x`
= `int_0^(1//2) sqrt(2) x dx`
= `sqrt(2)[x^(3/2)/(3//2)]_0^(1//2)`
= `sqrt(2)[2/3 (1/2)^(3//2) - 0]`
= `sqrt(2)[2/3 * 1/(2sqrt(2))]`
= `(1)/(3)`
Area of the region OCBDO
= area under the line y = 2x between x = 0 and x = `(1)/(2)`
= `int_0^(1//2)y * dx`, where y = 2x
= `int_0^(1//2)2x * dx`
= `[(2x^2)/2]_0^(1//2)`
= `(1)/(4) - 0`
= `(1)/(4)`
∴ required area = `1/3 - 1/4`
= `1/12` sq unit.
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