💡 Words with a Similar Meaning to "Differentiable function"
Found via reverse dictionary — words that share a conceptual meaning.
| Word | Definition |
|---|---|
| smooth functionnoun | (mathematics) a function that has derivatives of all finite orders everywhere in its domain. |
| holomorphic function | In mathematics, a holomorphic function is a complex-valued function of one or more complex variables that is complex differentiable in a neighbourhood of each point in a domain in complex coordinate space . |
| partial derivativenoun | (mathematics) A derivative with respect to one variable of a function of several variables with the other variables held constant. |
| differential equationnoun | (calculus) An equation involving the derivatives of a function. |
| differential operatornoun | (mathematics, mathematical analysis) An operator defined as a function of the differentiation operator (the operator which maps functions to their derivatives). |
| integro-differential equation | In mathematics, an integro-differential equation is an equation that involves both integrals and derivatives of a function. |
| ranknoun | Strong in growth; growing with vigour or rapidity, hence, coarse or gross. |
| total derivative | In mathematics, the total derivative of a function at a point is the best linear approximation near this point of the function with respect to its arguments. |
| ordinary differential equationnoun | (calculus) An equation involving the derivatives of a function of only one independent variable. |
| continuous functionnoun | (mathematical analysis) a function whose value at any point in its domain is equal its limit at the same point |
| smoothnessnoun | The condition of being smooth; the degree or measure of said condition. |
| inclusion functionnoun | (mathematics) A function whose domain is a subset of its codomain, and for which all of the elements in its domain are fixed points. |
| stationary pointnoun | (mathematics) A point on a curve where the gradient is zero. This point can be a maximum, a minimum, or a point of inflection. |
| second derivativenoun | (calculus) The derivative of the derivative of a function. |
| real-valued function | In mathematics, a real-valued function is a function whose values are real numbers. |
| derivationnoun | The act of receiving anything from a source; the act of procuring an effect from a cause, means, or condition, as profits from capital, conclusions or opinions from evidence. |
| taylor seriesnoun | (calculus) A power series representation of given infinitely differentiable function f whose terms are calculated from the function's arbitrary order derivatives at given reference point a; the series f(a)+(f'(a))/(1!)(x-a)+(f(a))/(2!)(x-a)²+(f'(a))/(3!)(x-a)³+⋯=∑ₙ₌₀∞(f⁽ⁿ⁾(a))/(n!)(x-a)ⁿ. |
| indefinite integralnoun | (mathematics) A function whose derivative is a given function; an antiderivative. |
| weierstrass functionnoun | (mathematics) A real-valued function that is continuous everywhere but differentiable nowhere. |
| vector fieldnoun | (differential geometry) a function which associates, to each point on a surface, a vector in the tangent plane of that point |
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