The area bounded between the parabolas x...

The area bounded between the parabolas `x^2=y/4"and"x^2=9y` and the straight line `y""=""2` is (1) `20sqrt(2)` (2) `(10sqrt(2))/3` (3) `(20sqrt(2))/3` (4) `10sqrt(2)`

Similar Questions

Explore conceptually related problems

The area bounded between the parabola x^(2)=y/4 and x^(2)=9y and the straight line y=2 is

Area bounded by the parabolas y=4x^(2), 9y=x^(2) and the line y = 2 is

The area bounded by the parabola y=4x^(2),y=(x^(2))/(9) and the line y=2 is (A) (20sqrt(2))/(3) (B) (10sqrt(2))/(3) (C) (40sqrt(2))/(3) (D) (sqrt(2))/(3)

The area bounded by the parabola 4y=3x^(2) , the line 2y=3x+12 and the y - axis is

Area bounded between the curves y=sqrt(4-x^(2)) and y^2=3|x| in square units is

The graph of straight line y = sqrt(3)x + 2sqrt(3) is :

The area bounded by the curves x^(2)+y^(2)=4 , |y|=sqrt(3)x and y - axis, is

(2)/(sqrt(x))+(3)/(sqrt(y))=2 and (4)/(sqrt(x))-(9)/(sqrt(y))=-1

The shortest distance between line y-x=1 and curve is : (1)(sqrt(3))/(4) (2) (3sqrt(2))/(8) (3) (8)/(3sqrt(2))(4)(4)/(sqrt(3))

The area bounded between the parabolas `x^2=y/4"and"x^2=9y` and the straight line `y""=""2` is (1) `20sqrt(2)` (2) `(10sqrt(2))/3` (3) `(20sqrt(2))/3` (4) `10sqrt(2)`

Similar Questions

Recommended Questions