The curve y `= x^((1)/(5))` has at (0,0)

The acute angles between the curves y=2x^(2)-x and y^(2)=x at (0, 0) and (1, 1) are alpha and beta respectively, then

The equation of the tangent to the curve y = e^(2x) at (0,1) is

Find the coordinates of the point on the curve, y= (x^(2)-1)/(x^(2) + 1) (x gt 0) where the gradient of the tangent to the curve is maximum

Find the equation of tangent to curve y=3x^(2) +4x +5 at (0,5) .

The curve y =f (x) satisfies (d^(2) y)/(dx ^(2))=6x-4 and f (x) has a local minimum vlaue 5 when x=1. Then f^(prime)(0) is equal to :

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

The equation of the normal to the curve y = sin x at (0,0) is

The curve given by x+y=e^(x y) has a tangent parallel to the y-axis at the point (a) (0,1) (b) (1,0) (c) (1,1) (d) none of these

The curve given by x+y=e^(x y) has a tangent parallel to the y - axis at the point (0,1) (b) (1,0) (c) (1,1) (d) none of these

The equation of the tangent tothe curve y={x^2 sin(1/x),x!=0 and 0, x=0 at the origin is