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प्रश्न
Area lying between the curves `y^2 = 4x` and `y = 2x`
विकल्प
`2/3`
`1/3`
`1/4`
`3/4`
MCQ
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उत्तर
`1/3`
Explanation:
The curve is `y^2 = 4x` ......(1)
And the line is `y = 2x` .......(2)
From (1) and (2)
`(4x^2) = 4x`
∴ `(x - 1)x = 0` or `x = 0, x = 1`
Curves (1) and (2) intersect at 0(0, 0), A (1, 2)
Area of region OACO
= Area of region OMACO – Area of OMA ......(3)
Now Area of region OMACO
= Area of region bounded by curve OCA
`y = sqrt(4x)`, `x`-axis and `x` = 1
= `int_0^1 sqrt(4x)dx = 2 * 2/3 [x^(3/2)]_0^1`
= `4/3 xx 1 = 4/3` sq.units
Area of ΔOMA Area of region bounded by OA,
y = `2x, x = 1` and `x`-axis
= `int_0^1 2xdx = [x^2]_0^1` = 1
Putting the there value in (3)
∴ Area of region OMACO = `4/3 - 1 = 1/3` sq.units
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