Question

Find the area of the region bounded by the parabolas y² = 6x and x² = 6y.

Answer 1

The intersecting points of the given parabolas are obtained by solving these equations for x and y

Which are 0(0, 0) and (6, 6).

Hence Area OABC = `int_0^6 (sqrt(6x) - x^2/6) "d"x`

= `|2sqrt(6)  x^(3/2)/3 - x^3/18|_0^6`

= `2sqrt(6)  (6)^(3/2)/3 - (6)^3/18`

= 12 sq.units