Nabla Operand • Gradient • Divergence • Curl • Laplacian

The nabla symbol, denoted as $\nabla$ , represents a vector differential operator commonly used in vector calculus. It is used to describe various operations involving vectors, such as gradients, divergences, and curls.

Here are some key operations associated with the nabla operator:

Gradient ( $\nabla f$ ):
- The gradient of a scalar function $f$ , results in a vector: $\nabla f = \frac{\partial f}{\partial x} \hat{i} + \frac{\partial f}{\partial y} \hat{j} + \frac{\partial f}{\partial z} \hat{k}$ ~Example: If $f (x, y, z) = x^{2} + y^{2} + z^{2}$ , then $\nabla f = < 2 x, 2 y, 2 z >$ .
Divergence ( $\nabla \cdot F$ ):
- The divergence of a vector field $F = (F_{x}, F_{y}, F_{z})$ is given by $\nabla \cdot F = \frac{\partial F _{x}}{\partial x} + \frac{\partial F _{y}}{\partial y} + \frac{\partial F _{z}}{\partial z}$ ~Example: If $F = (2 x, y^{2}, z)$ , then $\nabla \cdot F = 2 + 2 y + 1 = 2 y + 3$ .
Curl ( $\nabla \times F$ ):
- The curl of a vector field $F = (F_{x}, F_{y}, F_{z})$ is given by: $\nabla \times F = (\frac{\partial F _{z}}{\partial y} - \frac{\partial F _{y}}{\partial z}) \hat{i} + (\frac{\partial F _{x}}{\partial z} - \frac{\partial F _{z}}{\partial x}) \hat{j} + (\frac{\partial F _{y}}{\partial x} - \frac{\partial F _{x}}{\partial y}) \hat{k}$ *~Example: If $F = (2, y, 3 z + 2 x)$ , then $\nabla \times F = (0 - 0) \hat{i} + (0 - 1) \hat{j} + (0 - 0) \hat{k} = - 2 \hat{i}$ .
Laplacian ( $\nabla^{2} f$ ):
- The Laplacian of a scalar function $f$ is given by: $\nabla^{2} f = \frac{\partial ^{2} f}{\partial x ^{2}} + \frac{\partial ^{2} f}{\partial y ^{2}} + \frac{\partial ^{2} f}{\partial z ^{2}}$ ~Example:

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Nabla Operand • Gradient • Divergence • Curl • Laplacian

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