The angle between the curves, `y = x^(2)` and `y^(2) - x = 0` at the point (1, 1) is
a)`(pi)/(2)`a)`tan^(-1)""(4)/(3)`c)`(pi)/(3)`d)`tan^(-1)""(3)/(4)`

Find the length of the tangent for the curve y = x^(3) + 3x^(2) + 4x - 1 at point x = 0.

Find the angle between the curves C_(1): x^(2) - (y^(2))/(3) = a^(2) and C_(2): xy^(3) = c .

If the angle between the curves y=2^(x) and y=3^(x) is alpha , then the value of tan alpha is equal to a) (log((3)/(2)))/(1+(log2)(log3)) b) (6)/(7) c) (1)/(7) d) (log(6))/(1+(log2)(log3))

The value of tan^(-1) (2) + tan^(-1) (3) is equal to a) (3pi)/(4) b) (pi)/(4) c) (pi)/(3) d) tan^(-1) (6)

The angle between the line (x-3)/2=(y-1)/1=(z+4)/(-2) and the plane, x+y+z+5=0 is :

The angle between the pair of straight lines y^(2) sin ^(2) theta -xy sin ^(2) theta +x^(2) (cos^(2) theta-1) =0 is : a) (pi)/(3) b) (pi)/(4) c) (pi )/(6) d) (pi)/(2)

Length of the tangents from the point (1,2) to the circles x^(2)+y^(2)+x+y-4=0 and 3x^(2)+3y^(2)-x-y-k=0 are in the ratio 4:3 , then k is equal to a) (37)/(2) b) (4)/(37) c)21 d) (39)/(4)

The shortest distance between the circles (x-1) ^(2) + (y +2) ^(2) =1 and (x + 2) ^(2)+ (y-2) ^(2) = 4 is a)1 b)2 c)3 d)4

The angle between the line (3x-1)/3=(y+3)/(-1)= (5-2 z )/4 and the plane 3x-3y-6z=10 is equal to a) pi/6 b) pi/4 c) pi/3 d) pi/2