Examples of 'differentiable' in a sentence
Meaning of "differentiable"
Differentiable is a mathematical term used to describe a function that can be derived at each point within its domain, allowing for the calculation of its rate of change
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- Having a derivative, said of a function whose domain and codomain are manifolds.
- able to be differentiated; distinguishable, as for example by differing appearance or measurable characteristics.
How to use "differentiable" in a sentence
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differentiable
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.
The function is not differentiable at the origin.
Any differentiable function may be used for f.
It is not necessary for u and v to be continuously differentiable.
A function differentiable at a point is continuous at that point.
Prove that this function not differentiable.
Every differentiable fiber bundle is a fibered manifold.
I must here assume f three times differentiable.
Local differentiable forms are defined in this context.
A function that has derivatives is said to be differentiable.
The frames are differentiable structures in logical formulas.
Suppose f has a local extremum at c and f is differentiable at c.
They are easily differentiable through their tasting.
See also
Differentiable manifolds are very important in physics.
Suppose that the function is differentiable at and.
Continuously differentiable at the original outflow boundary.
Classification of critical points of a differentiable function.
A function that is differentiable everywhere is continuous.
This is not surprising because f is not differentiable at zero.
Some also use differentiable or even analytic functions.
The limits f and g are weakly differentiable.
A heron is differentiable from a crane in flight.
Thus both multiplication and inversion are differentiable maps.
Then f is differentiable and its derivative is.
This is not true for real differentiable functions.
Must be differentiable on the open interval.
A diffeomorphism is a bijection which is differentiable with differentiable inverse.
Be a solenoidal vector field which is twice continuously differentiable.
Integral images of continuously differentiable functions of a complex variable.
For a diffeomorphism we need f and its inverse to be differentiable.
And it must be differentiable over the open interval.
Another generalization holds for continuously differentiable functions.
The study of calculus on differentiable manifolds is known as differential geometry.
A plane is together an algebraic surface and a differentiable surface.
Prove that f is differentiable at the origin.
Finding where a function is not differentiable.
Not differentiable at certain values of x.
Now we assume a twice differentiable function.
A mild solution is a classical solution if and only if it is continuously differentiable.
The basis function is no longer differentiable at that point.
Differentiable dynamical systems.
Then we say that f is k times differentiable at the point a.
It is a continuous curve which is of infinite length and nowhere differentiable.
However it turns out f is not differentiable at the origin.
Every differentiable covering space is a fibered manifold with discrete fiber.
All goods and services are differentiable.
Let be a differentiable function.
Existence of the convolution with a continuously differentiable function.
