Examples of 'differentiable function' in a sentence
Meaning of "differentiable function"
differentiable function - In mathematics, a differentiable function is a function that can be approximated by a linear function at any point in its domain, exhibiting smooth and continuous behavior
How to use "differentiable function" in a sentence
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differentiable function
Any differentiable function may be used for f.
Now we assume a twice differentiable function.
Be a differentiable function of degree.
Classification of critical points of a differentiable function.
Let be a differentiable function.
Existence of the convolution with a continuously differentiable function.
Nowhere differentiable function.
The Steklov mean value functions are continuous and the exponential mollification provides a differentiable function.
Where is continuously differentiable function with respect to each of its argument.
Approximate recorded dependency by continuous, monotonic, differentiable function.
Infinitely differentiable function.
Critical locus, the set of the critical points of a differentiable function.
Arbitrary differentiable function of y, playing the role of the arbitrary constant.
Proving continuity of a differentiable function.
In particular, any differentiable function must be continuous at every point in its domain.
See also
By Fermat 's theorem, all local maxima and minima of a differentiable function occur at critical points.
A differentiable function might not be C1.
Continuous, nowhere differentiable function.
If y is a differentiable function of t such that y > 0 and for some constant k, then.
Examples, The derivative of any differentiable function is of class 1.
In mathematics, an immersion is a differentiable function between differentiable manifolds whose derivative is everywhere injective.
Let f, Rn+m → Rm be a continuously differentiable function.
Differentiable may refer to: Differentiable function Differentiable manifold Differentiable stack Differentiable neural computer.
Let I ⊆ R be an interval and φ, → I be a differentiable function with integrable derivative.
Similarly, if is a real differentiable function over, defines a map from to.
The total variation of a differentiable function f { \ displaystyle f }.
So an equivalent term for a differentiable function is a " smooth function ".
Since { displaystyle g } is a differentiable function in one variable, the mean value theorem gives,.
Let f, Rn → R be a k times differentiable function at the point a ∈ Rn.
The derivative f ′ ( x ) of a differentiable function f ( x ) need not be continuous.
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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
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He could not function any other way
Function keys with preset multimedia actions
The desired function word will flash
