The shortest distance between the line `y-x=1` and the curve `x=y^(2)` is

The shortest distance between the line x=y and the curve y^(2)=x-2 is

The shortest distance between line y-x=1 and curve x=y^2 is (a) (3sqrt2)/8 (b) 8/(3sqrt2) (c) 4/sqrt3 (d) sqrt3/4

Find the shortest distance between the line x - y +1 = 0 and the curve y^2 = x.

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

The shortest distance between the point (0, 1/2) and the curve x = sqrt(y) , (y gt 0 ) , is:

The equation of the line of the shortest distance between the parabola y^(2)=4x and the circle x^(2)+y^(2)-4x-2y+4=0 is

If each a_i > 0 , then the shortest distance between the points (0,-3) and the curve y=1+a_1x^2+a_2 x^4+.......+a_n x^(2n) is

Find the shortest distance between the line y=x-2 and the parabola y=x^2+3x+2.

Find the shortest distance between the line y=x-2 and the parabola y=x^2+3x+2.

Find the shortest distance between the line y=x-2 and the parabola y=x^2+3x+2.