Let C be the set of curves having the property that the point of intersection of tangent with y-axis is equidistant from the point of tangency and origin (0,0)
If `C_(1),C_(2) in C`
`C_(1): Curve is passing through (1,0)
C_(2): Curve is passing through (-1,0)
The number of common tangents for `C_(1) and C_(2)` is

Let C be the set of curves having the property that the point of intersection of tangent with y-axis is equidistant from the point of tangency and origin (0,0) If C_(3) in C C_(3): is passing through (2,4). If (x)/(a)+(y)/(b)=1. is tangent to C_(3) , then

Let C be the set of curves having the property that the point of intersection of tangent with y-axis is equidistant from the point of tangency and origin (0,0) If common tangents of C_(1) and C_(2) form an equilateral triangle, where C_(1),C_(2) in C and C_(1): Curve passes through f(2,0), then C_(2) may passes through

A curve is such that the mid-point of the portion of the tangent intercepted between the point where the tangent is drawn and the point where the tangent is drawn and the on the line y=x. If the curve passes through (1,0), then the curve is

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

Let C be the entroid of the triangle with vertices (3, -1) and ( 2, 4). Let P be the point of intersection of the lines x+3y-1=0 and 3x-y+1=0 . Then the line passing through the points C and P also passes through the poing :

Let C be the curve f(x)=ln^2x+2lnx and A(a,f(a)), b(b,f(b)) where (a

A curve satisfies the property that y intercept of tangent at any point P is equal to radius vector of point P.If the curve passes through (1,0) , then it also passes through (Multiple Correct Type) 1) (-1,0) 2) (0,(1)/(2)) (3) (0,-(1)/(2))

A curve y=ax^2+bx+c passing through the point (1,2) has slope of tangent at orign equal to 1 , then ordered triplet (a,b,c) may be