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Question
Solve the following:
Find the area enclosed between the circle x2 + y2 = 1 and the line x + y = 1, lying in the first quadrant.
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Solution
Required area = area of the region ACBDA
= (area of the region OACBO) – (area of the region OADBO) ...(1)
Now, area of the region OACBO
= area under the circle x2 + y2 = 1 between x = 0 and x = 1
= `int_0^1 y.dx`, where y2 = 1 – x2,
i.e. y = `sqrt(1 - x^2)`, as y > 0
= `int_0^1 sqrt(1 - x^2).dx`
= `[x/2 sqrt(1 - x^2) + 1/2 sin^-1 (x)]_0^1`
= `(1)/(2) sqrt(1 - 1) + 1/2 sin^-1 1- 0`
= `(1)/(2) xx pi/(2)`
= `π/(4)` ...(2)
Area of the region OADBO = area under the line x + y = 1 between x = 0 and x = 1
= `int_0^1y.dx`, where y = 1 – x
= `int_0^1 (1 - x).dx`
= `[x - x^2/2]_0^1`
= `1 - (1)/(2) - 0`
= `(1)/(2)` ...(3)
Put the value of equations (2) and (3) in equation (1)
∴ Required area = `(pi/4 - 1/2)`sq units.
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