If `f''(x)+f'(x)+f^(2)(x)=x^(2)` be the differentiable equation of a curve and let p be the point of maxima then number of tangents which can be drawn from p to `x^(2)-y^(2)=a^(2)` is/are……. .

If 9+f(x)+f'(x)=x^(2)+f^(2)(x) be the differential equation of a curve and let P be the point of minima of this curve then the number of tangents which can be drawn from P to the circle x^(2)+y^(2)=8 is

If 9+f(x)+f'(x)=x^(2)+f^(2)(x) be the differential equation of a curve and let P be the point of minima of this curve then the number of tangents which can be drawn from P to the circle x^(2)+y^(2)=8 is

If 9+f"(x)+ f'(x)=x^(2)+f^(2)(x) where f(x) is twice differentiable function such that f''(x)!=0AA x in R and P be the point of maxima of f(x) , then find the number of tangents which can be drawn from P to the circle x^(2)+y^(2)=9

if |f(x_(1))-f(x_(2))|<=(x_(1)-x_(2))^(2) Find the equation of gent to the curve y=f(x) at the point (1,2).

Let the equation of the circle is x^(2)+y^(2)=4 Find the total no.of points on y=|x| from which perpendicular tangents can be drawn are.

Let y=f(x) be a differentiable function such that f(-1)=2,f(2)=-1 and f(5)=3 then the equation f'(x)=2f(x) has

Find the equation of tangents to circle x^(2)+y^(2)-2x+4y-4=0 drawn from point P(2,3).

If |f(x_1) - f(x_2)| le (x_1 - x_2)^(2), AA x_1 , x_2 in R . Find the equation of tangent to the curve y = f(x) at the point (1, 2) .

Let f (x) be a continuous function (define for all x) which satisfies f ^(3) (x)-5 f ^(2) (x)+ 10f (x) -12 ge 0, f ^(2) (x) + 3 ge 0 and f ^(2) (x) -5f(x)+ 6 le 0 The equation of tangent that can be drawn from (2,0) on the curve y = x^(2) f (sin x) is :

Let f(x)=2x^(3)-3(2+p)x^(2)+12px If f(x) has exactly one local maxima and one local minima, then the number of integral values of p is ....