The tangents to the curve `y = (x-2)^(2)-1` at its points of intersection with the line `x - y = 3`, intersect at the point:

Equation of the tangent to the curve y=1-2^(x//2) at the point of intersection with the Y-axes is

The equation of the tangents to the curve (1+x^(2))y=1 at the points of its intersection with the curve (x+1)y=1 , is given by

The equation of the tangent to the curve y=1-e^((x)/(2)) at the point of intersection with the y -axis,is

(a) Find the slope of the tangent to the cube parabola y = x^(3) at the point x=sqrt(3)/(3) (b) Write the equations of the tangents to the curve y = (1)/(1+x^(2)) at the 1 points of its intersection with the hyperbola y = (1)/(x+1) (c) Write the equation of the normal to the parabola y = x^(2) + 4x + 1 perpendicular to the line joining the origin of coordinates with the vertex of the parabola. (d) At what angle does the curve y = e^(x) intersect the y-axis

The cosine of the angle between the curves y=3^(x-1)ln x and y=x^(x)-1 at their point of intersection on the line y=0, is

Find the point of intersection of the line, x/3 - y/4 = 0 and x/2 + y/3 = 1