Advertisements
Advertisements
प्रश्न
Solve the following :
Find the area of the ellipse `x^2/(25) + y^2/(16)` = 1 using integration
उत्तर
By the symmetry of the ellipse, its area is equal to 4 times the area of the region OABO. Clearly for this region, the limits of integration are 0 and 5.
From the equation of the ellipse
`y^2/(16) = 1 - x^2/(25) = (25 - x^2)/(25)`
∴ y2 = `(16)/(25)(25 - x^2)`
In the first quadrant y > 0
∴ y = `(4)/(5)sqrt(25 - x^2)`
∴ Area of the ellipse = 4 (Area of the region OABO)
= `4int_0^5 y.dx`
= `4int_0^5 (4)/(5) sqrt(25 - x^2).dx`
= `(16)/(5) int_0^5 sqrt(25 - x^2).dx`
= `(16)/(5)[x/2 sqrt(25 - x^2) + (25)/(2)sin^-1 (x/5)]_0^5`
= `(16)/(5)(5/2 sqrt(25 - 25) + (25)/(2)sin^-1 (1)) - (16)/(5)[0/2 sqrt(25 - 0) + (25)/(2)sin^-1 (0)]`
= `(16)/(5) xx (25)/(2) xx pi/(2)`
= 20π sq. units.
