Which of the following condition is true for a monotonically increasing function f(x), which is differentiable in its domain?
Which of the following condition is true for a monotonically increasing function f(x), which is differentiable in its domain?
The correct option is B f’(x) ≥ 0
Let’s assume we have a function f(x) which is differentiable throughout its domain.
Let’s take two points which are in the domain of f(x). Let them be a & b, such that b > a.
It is given that function is monotonically increasing, so f(b) ≥ f(a).
Let’s assume there is a point c, such that c ∈ (a , b)
Now, with the mean value theorem we can say that
f’(c) = 
[It is nothing but that if we have a differentiable curve between (a,b) then we’ll find a point ‘c’ such that the slope of tangent at that point will be equal to the slope of the secant at points { a, f(a) } and { b, f(b) } ]
We can also write the above equation as -
f′(c)(b−a)=f(b)−f(a)
Or f′(c)(b−a)≥0 as we know that f(b)≥ f(a)
Or f′(c)≥0 as b>a
Here, ‘c’ was some random point between the points a & b which are again random points.
So in a general way we can say that f’(x) ≥ 0.
f’(x) ≥ 0
Let’s assume we have a function f(x) which is differentiable throughout its domain.
Let’s take two points which are in the domain of f(x). Let them be a & b, such that b > a.
It is given that function is monotonically increasing, so f(b) ≥ f(a).
Let’s assume there is a point c, such that c ∈ (a , b)
Now, with the mean value theorem we can say that
f’(c) =
[It is nothing but that if we have a differentiable curve between (a,b) then we’ll find a point ‘c’ such that the slope of tangent at that point will be equal to the slope of the secant at points { a, f(a) } and { b, f(b) } ]
We can also write the above equation as -
f′(c)(b−a)=f(b)−f(a)
Or f′(c)(b−a)≥0 as we know that f(b)≥ f(a)
Or f′(c)≥0 as b>a
Here, ‘c’ was some random point between the points a & b which are again random points.
So in a general way we can say that f’(x) ≥ 0.
