The curve `y=ax^(3)+bx^(2)+cx+5` touches x-axis at P(-2,0) and cuts the y-axis at a point Q where its gradient is 3. then find the values of a,b,c

The curve y=ax^(3)+bx^(2)+cx is inclined at angle 45^(0) to x-axis at (0,0) but it touches X-axis at (1,0) then the value of a,b,c are given by

Equation of the circle touching the y-axis at (0,sqrt3) and cuts the x-axis in the points (-1,0) and (-3,0) is

A circle touches x-axis and cuts off constant length 2p from y-axis then the locus of its centre is

If 1,2,3 and 4 are the roots of x^4+ax^3+bx^2+cx+d=0 , then find the values of a,b,c and d.

A circle touches x-axis and cuts off a constant length 2l from the y-axis. The locus of its centre of

At the point (2, 5) on the curve y=x^3-2x+1 the gradient of the curve is increasing

Circle touching y-axis and centre (3,2) is

If the tangent to the curve 2y^(3)=ax^(2)+x^(3) at the point cuts off intercepts alpha and beta on the coordinate axes, where alpha^(2)+beta^(2)=61 then the value of |a| is