The curve `y=ax^(3)+bx^(2)+cx` is inclined at `45^(@)` to x-axis at (0,0) but it touches x-axis at (1,0) , then a+b+c+10 is

If the curve y=ax^(3) +bx^(2) +c x is inclined at 45^(@) to x-axis at (0, 0) but touches x-axis at (1, 0) , then

The curve y=ax^(3)+bx^(2)+cx is inclined by 45^(@) to x-axis at origin and it touches x-axis at (1,0). Then

The curve y=f(x)=ax^(3)+bx^(2)+cx is inclined at 45^(@) to positive direction of x -axis at (0,0), but it touches x -axis at (1,0) then value of ((f''(1)*f''(2))/(2f(2))) is

The curve y = ax ^(3) + bx ^(2) + cx + 5 touches the x-axis at P (-2, 0) and cuts the y-axis at a point Q where its gradient is 3, then 2a + 4b is equal to :

The curve y=ax^(3)+bx^(2)+cx+5 touches the x -axis at P(-2,0) and cuts the y-axis at the point Q where its gradient is 3. Find the equation of the curve completely.

A curve with equation of the form y=ax^(4)+bx^(3)+cx+d has zero gradient at the point (0,1) and also touches the x -axis at the point (-1,0) then a=3 b.b=4 c.c+d=1 d.for x<-1, the curve has a negative gradient

A curve with equation of the form y=ax^(4)+bx^(3)+cx+d has zero gradient at the point (0,1) and also touches the x-axis at the point (-1,0) then a=3 (b) b=4c+d=1 for x<-1, the curve has a negative gradient

A polynomial ax^(3)+bx^(2)+cx+d in xy -plane intersects x -axis at (1,0) and (-1,0) and y -axis at (0,2) .The value of b is :