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

If the curve y=ax^(2)+bx+c passes through the point (1, 2) and the line y = x touches it at the origin, then

The curve y=ax^(2)+bx+c passes through the point (1,2) and its tangent at origin is the line y=x .The area bounded by the curve, the ordinate of the curve at minima and the tangent line is

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 - (a) (sqrt3,0) (b) (-1,2) (c) (-sqrt2,1) (d) (3,0)

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

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

If the curve y=ax^(2)+bx+c , x in R ,passes through the point (1,2) and the tangent line to this curve at origin is y=x, then the possible values of a,b,c are:

Find the equation of a curve passing through the point (0,1) .If the slope of the tangent to the curve at any point (x,y) is equal to the sum of the x coordinate (abscissa) and the product of the x coordinate and y coordinate (ordinate) of that point.

In the curve y=x^(3)+ax and y=bx^(2)+c pass through the point (-1,0) and have a common tangent line at this point then the value of a+b+c is

Let C be a curve defined by y=e^(a+bx^(2)) .The curve C passes through the point P(1,1) and the slope of the tangent at P is (-2). Then the value of 2a-3b is