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- Dictionarygradient/ˈɡreɪdɪənt/
noun
- 1. an inclined part of a road or railway; a slope: "fail-safe brakes for use on steep gradients" Similar
- 2. an increase or decrease in the magnitude of a property (e.g. temperature, pressure, or concentration) observed in passing from one point or moment to another.
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In Calculus, a gradient is a term used for the differential operator, which is applied to the three-dimensional vector-valued function to generate a vector. The symbol used to represent the gradient is ∇ (nabla).
The gradient, represented by the blue arrows, denotes the direction of greatest change of a scalar function. The values of the function are represented in greyscale and increase in value from white (low) to dark (high). In vector calculus, the gradient of a scalar-valued differentiable function of several variables is the vector field (or ...
What Is the Definition of Gradient? The gradient is the inclination of a line. The gradient is often referred to as the slope (m) of the line. The gradient or slope of a line inclined at an angle θ θ is equal to the tangent of the angle θ θ.
a measure of a change that occurs between different quantities of something such as temperature or pressure over a particular distance: This study shows how organisms are organized across major environmental gradients. At an altitude of ten miles, there is a distinct temperature gradient. Fewer examples.
The meaning of GRADIENT is the rate of regular or graded ascent or descent : inclination. How to use gradient in a sentence. Did you know?
Gradient definition: the degree of inclination, or the rate of ascent or descent, in a highway, railroad, etc.. See examples of GRADIENT used in a sentence.
We know the definition of the gradient: a derivative for each variable of a function. The gradient symbol is usually an upside-down delta, and called “del” (this makes a bit of sense – delta indicates change in one variable, and the gradient is the change in for all variables).
Gradient. The gradient for a function of several variables is a vector-valued function whose components are partial derivatives of those variables. The gradient can be thought of as the direction of the function's greatest rate of increase.
a measure of a change that occurs between different quantities of something such as temperature or pressure over a particular distance: This study shows how organisms are organized across major environmental gradients. At an altitude of ten miles, there is a distinct temperature gradient. Fewer examples.
Sep 20, 2024 · gradient, in mathematics, a differential operator applied to a three-dimensional vector-valued function to yield a vector whose three components are the partial derivatives of the function with respect to its three variables. The symbol for gradient is ∇.