Gradient and Laplace operator of a scalar field

Gradient and Laplace operator of a scalar field
A sGradient and Laplace operator of a scalar field
A scalar field is a function that takes a point in space and assign a number to it calar field is a function that takes a point in space and assign a number to it
1. The gradient of a scalar field is a vector field denoted by or and it is defined as follows
:1. The gradient of a scalar field is a vector field denoted by or and it is defined as follows :
2. Laplace operator: The differential operator is called Laplace operator and it is defined as follows
2. Laplace operator: The differential operator is called Laplace operator and it is defined as follows
Divergence and the Curl of a vector field
The divergence of a vector field
is a scalar field and it is defined as follows
Divergence and the Curl of a vector field
The divergence of a vector field
is a scalar field and it is defined as follows
Divergence and the Curl of a vector field
The divergence of a vector field
is a scalar field and it is defined as follows
Divergence and the Curl of a vector field
The divergence of a vector field
is a scalar field and it is defined as follows