Examples of 'is differentiable' in a sentence
Meaning of "is differentiable"
is differentiable: In mathematics, this phrase is used to describe a function for which the derivative exists at each point within its domain
How to use "is differentiable" in a sentence
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is differentiable
Suppose f has a local extremum at c and f is differentiable at c.
A function that is differentiable everywhere is continuous.
Even the simplest product is differentiable.
A heron is differentiable from a crane in flight.
Suppose that the function is differentiable at and.
Then f is differentiable and its derivative is.
Consider a function that is differentiable at a point.
It is differentiable into several distinct types based on the distribution of twelve different toxins.
A diffeomorphism is a bijection which is differentiable with differentiable inverse.
It is differentiable everywhere except for x 0.
Topological groups in which multiplication on one side is differentiable or linear.
Prove that f is differentiable at the origin.
It is a Lie group action if it is differentiable.
If is a point in and is differentiable at, then its derivative is given by.
If p is a point in Rn and F is differentiable.
See also
If f is differentiable at t, then the Dini derivative at t is the usual derivative at t.
How to prove a function is differentiable.
If f is differentiable at a point x0, then f must also be continuous at x0.
Proving this function is differentiable.
If f is differentiable at the point x0, then f is continuous at x0.
There is an implicit requirement that the stress is differentiable in the classical sense.
A function is differentiable at, then, then it is continuous at.
If the limit exists at a, the function is differentiable at a.
The signum function is differentiable with derivative 0 everywhere except at 0.
It follows that the semigroup is differentiable at 0.
Then is differentiable at y, and.
And, then the inverse function is differentiable at a and.
Is differentiable but not of class C1.
The function is differentiable on and.
Therefore, there are no values of a and b for which the function is differentiable.
Roughly, a continuous function is differentiable if its graph has no sharp " corners.
Then f has a local maximum at c and, by hypothesis 2, f is differentiable at c.
In particular, every function which is differentiable and has bounded derivative is uniformly continuous.
But so it 's defined over the interval, this is continuous, this is differentiable.
SOLUTION We are given that f is differentiable ( and therefore continuous ) everywhere.
If two values exist and coincide we will say that the function is differentiable at $$x=0 $ $.
In this case, g is differentiable and.
If f is differentiable at some point a, and g is differentiable at f ( a ), then.
The cubic root is defined and continuous everywhere, and is differentiable everywhere, except for zero.
Therefore, is differentiable at point.
Rademacher 's theorem says that a Lipschitz function on Rd is differentiable almost everywhere.
Suppose that f is differentiable at z0.
If and are differentiable at, and, then is differentiable at and.
Also, if and is differentiable at, then.
By Rademacher 's theorem a bi-Lipschitz mapping is differentiable almost everywhere.
Therefore, this function is differentiable but not of class " C " 1.
In this case, $ T $ is locally Lipschitz and then is differentiable almost everywhere.
I need to prove the following function is differentiable at 0 and find f ' ( 0 ).
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Similarly for a differentiable manifold it has to be a diffeomorphism
Harmonic functions are infinitely differentiable in open sets
Differentiable and holomorphic functions of a complex variable
