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How do you tell if a function is not differentiable on a graph?

Posted on October 21, 2022 by David Darling

Table of Contents

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  • How do you tell if a function is not differentiable on a graph?
  • At what numbers is f not differentiable?
  • How do you know if a function is differentiable at a point?
  • What does not differentiable mean?
  • Where is a graph continuous but not differentiable?

How do you tell if a function is not differentiable on a graph?

A function is not differentiable at a if its graph has a vertical tangent line at a. The tangent line to the curve becomes steeper as x approaches a until it becomes a vertical line. Since the slope of a vertical line is undefined, the function is not differentiable in this case.

At what numbers is f not differentiable?

We can say that f is not differentiable for any value of x where a tangent cannot ‘exist’ or the tangent exists but is vertical (vertical line has undefined slope, hence undefined derivative).

How do you show f is differentiable?

A differentiable function is a function that can be approximated locally by a linear function. [f(c + h) − f(c) h ] = f (c). The domain of f is the set of points c ∈ (a, b) for which this limit exists. If the limit exists for every c ∈ (a, b) then we say that f is differentiable on (a, b).

What types of graphs are not differentiable?

The four types of functions that are not differentiable are: 1) Corners 2) Cusps 3) Vertical tangents 4) Any discontinuities Page 3 Give me a function is that is continuous at a point but not differentiable at the point. A graph with a corner would do.

How do you know if a function is differentiable at a point?

For a function to be differentiable at any point x=a in its domain, it must be continuous at that particular point but vice-versa is not always true. Solution: For checking the continuity, we need to check the left hand and right-hand limits and the value of the function at a point x=a. L.H.L = R.H.L = f(a) = 0.

What does not differentiable mean?

A function which jumps is not differentiable at the jump nor is one which has a cusp, like |x| has at x = 0. Generally the most common forms of non-differentiable behavior involve a function going to infinity at x, or having a jump or cusp at x.

How do you know if a graph is continuous and differentiable?

If f is differentiable at x=a, then f is continuous at x=a. Equivalently, if f fails to be continuous at x=a, then f will not be differentiable at x=a. A function can be continuous at a point, but not be differentiable there.

What is differentiable graph?

In mathematics, a differentiable function of one real variable is a function whose derivative exists at each point in its domain. In other words, the graph of a differentiable function has a non-vertical tangent line at each interior point in its domain.

Where is a graph continuous but not differentiable?

The absolute value function is continuous (i.e. it has no gaps). It is differentiable everywhere except at the point x = 0, where it makes a sharp turn as it crosses the y-axis. A cusp on the graph of a continuous function. At zero, the function is continuous but not differentiable.

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