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 line through the points (a, b) and (-a, -b) passes through the point

The line through the points (a , b) and (-a , -b) passes through the point

For the curve y=4x^3-2x^5, find all the points at which the tangent passes through the origin.

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

In a plane there are 37 straight lines, of which 13 pass through the point A and 11 pass through the point B. Besides, no three lines pass through one point , on line passes through both points A and B , and no two are parallel. Them the number of interaction points the lines have is equal to

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. (a) (-1/2,1/2) (b) (1, 1) (c) (1/2,1/2) (d) none of these

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

The normal at any point to a curve always passes through a given point (a, b) , if the curve passes through the origin, then the curve is a/an -

If a curve passes through the point (1, -2) and has slope of the tangent at any point (x,y) on it as (x^2-2y)/x , then the curve also passes through the point