The tangent to the curve `y=xe^(x^2)` passing through the point (1,e) also passes through the point

The tangent to the curve y=x^2-5x+5. parallel to the line 2y=4x+1, also passes through the point :

The normal lines to a given curve at each point (x,y) on the curve pass through the point (2,0) the curve passes through the point (2,3) formulate the differential equation representign the problem and hecne find the equation of the curve

A tangent to the hyperbola y = (x+9)/(x+5) passing through the origin is

Passing through the point (-4, 3) with slope 1/2 .

The circle passing through the point (-1,0) and touching the y-axis at (0,2) also passes through the point:

Given two curves: y=f(x) passing through the point (0,1) and g(x)=int_(-oo)^xf(t)dt passing through the point (0,1/n)dot The tangents drawn to both the curves at the points with equal abscissas intersect on the x-axis. Find the curve y=f(x)dot

The length of the diameter of the circle which touches the x-axis at the point (1,0) and passes through the point (2,3)

The common chord of the circle x^2+y^2+6x+8y-7=0 and a circle passing through the origin and touching the line y=x always passes through the point. (-1/2,1/2) (b) (1, 1) (1/2,1/2) (d) none of these

The line x = y touches a circle at the point (1, 1). If the circle also passes through the point (1, -3). Then its radius is 0