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Question
Find the area of the region bounded by the curves y2 = 4ax and x2 = 4ay
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Solution
Given equations of the parabolas are
y2 = 4ax .......(i)
and x2 = 4ay
∴ y = `x^2/(4"a")` .......(ii)
From (i), we get
y2 = 4ax
∴ y = `2sqrt("a")sqrt(x)` ......(iii) ......[∵ In first quadrant, y > 0]
Find the points of intersection of y2 = 4ax and x2 = 4ay.
Substituting (ii) in (i), we get
`((x^2)/(4"a"))` = 4ax
∴ x4 = 64a3x
∴ x(x3 − 64a3) = 0
∴ x[x3 − (4a)3] = 0
∴ x = 0 and x = 4a
When x = 0, y = 0 and when x = 4a, y = 4a
∴ The points of intersection are O (0, 0) and P (4a, 4a).
Draw PB ⊥ OX.
Required area = area of the region OAPCO
= area of the region OBPCO – area of the region OBPAO
= area under the parabola y2 = 4ax – area under the parabola x2 = 4ay
= `int_0^(4"a") 2sqrt("a")sqrt(x) "d"x - int_0^(4"a") x^2/(4"a") "d"x` ......[From (iii) and (ii)]
= `2sqrt("a") int_0^(4"a") x^(1/2) "d"x - int_0^(4"a") x^2/(4"a") "d"x`
= `2sqrt("a") [(x^(3/2))/(3/2)]_0^(4"a") - 1/(4"a") [x^3/3]_0^(4"a")`
= `4/3 sqrt("a")[(4"a")^(3/2) - 0] - 1/(12"a") [(4"a")^3 - 0]`
= `32/3 "a"^2 - 16/3 "a"^2`
= `16/3 "a"^2` sq.units
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