The area of the smaller portion intercepted between curves `x^(2)+y^(2)=8` and `y^(2)=2x` is `pi+(2)/(3)` `2 pi+(2)/(3)` `2 pi+(4)/(3)` `pi+(4)/(3)`

The area(in sq.units) of the smaller portionenclosed between the curves,x^(2)+y^(2)=4 and y^(2)=3x, is

" Q."4[" The area of the smaller portion enclosed by the "],[" curves "x^(2)+y^(2)=9" and "y^(2)=8x" is "]

the area of the region described by A={x,y]=x^(2)+y^(2)<= and y^(2)<=1-x} is (a) (pi)/(2)-(2)/(3) (b) (pi)/(2)+(2)/(3)(cc)(pi)/(2)+(4)/(3)(d)(pi)/(2)-(4)/(3)

The area of the region described by A={(x,y):x^(2)+y^(2)<=1 and quad y^(2)<=1-x} is (1) (pi)/(2)+(4)/(3)(2)(pi)/(2)-(4)/(3)(3)(pi)/(2)-(2)/(3)(4)(pi)/(2)+(2)/(3)

The area of the region described by A={(x,y):x^(2)+y^(2)<=1 and y^(2)<=1-x} is (A) (pi)/(2)+(4)/(3)(B)(pi)/(2)-(4)/(3)(C)(pi)/(2)-(2)/(3)(D)(pi)/(2)+(2)/(3)

Area enclosed between the curves |y|=1-x^(2) and x^(2)+y^(2)=1 is (3 pi-8)/(3) (b) (pi-8)/(3)(2 pi-8)/(3) (d) None of these

Then angle of intersection of the normal at the point (-(5)/(sqrt(2)),(3)/(sqrt(2))) of the curves x^(2)-y^(2)=8 and 9x^(2)+25y^(2)=225 is 0 (b) (pi)/(2) (c) (pi)/(3) (d) (pi)/(4)

The angles at which the circles (x-1)^(2)+y^(2)=10andx^(2)+(y-2)^(2)=5 intersect is (pi)/(6) (b) (pi)/(4) (c) (pi)/(3) (d) (pi)/(2)

The angle between the tangents to the curve y=x^(2)-5x+6 at the point (2,0) and (3,0) is (pi)/(2) (b) (pi)/(3) (c) pi (d) (pi)/(4)