Let (a, b) and `(lambda,mu)` be two points on the curve y = f(x) . If the slope of the tangent to the curve at (x,y) be `phi(x)`, then `int_(a)^lambda phi(x) dx` is

Let (a,b) and (lambda,u) be two points on the curve y=f(x). If the slope of the tangent to the curve at (x,y) be?

or the curve y=3x^2 + 4x , find the slope of the tangent to the curve at a point where x-coordinate is -2

If (-1,2) and and (2,4) are two points on the curve y=f(x) and if g(x) is the gradient of the curve at point (x,y) then the value of the integral int_(-1)^(2) g(x) dx is

If (-1,2) and and (2,4) are two points on the curve y=f(x) and if g(x) is the gradient of the curve at point (x,y) then the value of the integral int_(-1)^(2) g(x) dx is

The slope of the tangent of the curve y=int_0^x (dx)/(1+x^3) at the point where x = 1 is

The slope of the tangent of the curve y=int_0^x (dx)/(1+x^3) at the point where x = 1 is

The slope of the tangent of the curve y=int_(0)^(x)(dx)/(1+x^(3)) at the point where x=1 is

The slope of the tangent to the curve y=int_(0)^(x)(1)/(1+t^3)dt at the point, where x=1 is