354. The Laplacian operator cannot be used in which one the following?
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d Explanation: Poisson equation, two-dimensional heat and wave equations are general cases of Laplacian equation. Maxwell equation uses only divergence and curl, which is first order differential equation, whereas Laplacian operator is second order differential equation. Thus Maxwell equation will nRead more
d
See lessExplanation: Poisson equation, two-dimensional heat and wave equations are general
cases of Laplacian equation. Maxwell equation uses only divergence and curl, which is
first order differential equation, whereas Laplacian operator is second order differential
equation. Thus Maxwell equation will not employ Laplacian operator.
D Explanation: Poisson equation, two-dimensional heat and wave equations are general cases of Laplacian equation. Maxwell equation uses only divergence and curl, which is first order differential equation, whereas Laplacian operator is second order differential equation. Thus Maxwell equation will nRead more
D
See lessExplanation: Poisson equation, two-dimensional heat and wave equations are general cases of Laplacian equation. Maxwell equation uses only divergence and curl, which is first order differential equation, whereas Laplacian operator is second order differential equation. Thus Maxwell equation will not employ Laplacian operator.
D Explanation: Poisson equation, two-dimensional heat and wave equations are general cases of Laplacian equation. Maxwell equation uses only divergence and curl, which is first order differential equation, whereas Laplacian operator is second order differential equation. Thus Maxwell equation will nRead more
D
See lessExplanation: Poisson equation, two-dimensional heat and wave equations are general
cases of Laplacian equation. Maxwell equation uses only divergence and curl, which is
first order differential equation, whereas Laplacian operator is second order differential
equation. Thus Maxwell equation will not employ Laplacian operator
Answer: d Explanation: Poisson equation, two-dimensional heat and wave equations are general cases of Laplacian equation. Maxwell equation uses only divergence and curl, which is first order differential equation, whereas Laplacian operator is second order differential equation. Thus Maxwell equatioRead more
Answer: d
See lessExplanation: Poisson equation, two-dimensional heat and wave equations are general
cases of Laplacian equation. Maxwell equation uses only divergence and curl, which is
first order differential equation, whereas Laplacian operator is second order differential
equation. Thus Maxwell equation will not employ Laplacian operator.
d) Explanation: Poisson equation, two-dimensional heat and wave equations are general cases of Laplacian equation. Maxwell equation uses only divergence and curl, which is first order differential equation, whereas Laplacian operator is second order differential equation. Thus Maxwell equation willRead more
d)
See lessExplanation: Poisson equation, two-dimensional heat and wave equations are general
cases of Laplacian equation. Maxwell equation uses only divergence and curl, which is first order differential equation, whereas Laplacian operator is second order differential equation. Thus Maxwell equation will not employ Laplacian operator.
Maxwell equation
Maxwell equation
See lessd) Maxwell equation Explanation: Poisson equation, two-dimensional heat and wave equations are general cases of Laplacian equation. Maxwell equation uses only divergence and curl, which is first order differential equation, whereas Laplacian operator is second order differential equation. Thus MaxweRead more
d)
Maxwell equation
Explanation:
Poisson equation, two-dimensional heat and wave equations are general cases of Laplacian equation. Maxwell equation uses only divergence and curl, which is first order differential equation, whereas Laplacian operator is second order differential equation. Thus Maxwell equation will not employ Laplacian operator.
See lessd Explanation: Poisson equation, two-dimensional heat and wave equations are general cases of Laplacian equation. Maxwell equation uses only divergence and curl, which is first order differential equation, whereas Laplacian operator is second order differential equation. Thus Maxwell equation will nRead more
d
Explanation: Poisson equation, two-dimensional heat and wave equations are general
cases of Laplacian equation. Maxwell equation uses only divergence and curl, which is
first order differential equation, whereas Laplacian operator is second order differential
equation. Thus Maxwell equation will not employ Laplacian operator.
See lessAnswer: d Explanation: Poisson equation, two-dimensional heat and wave equations are general cases of Laplacian equation. Maxwell equation uses only divergence and curl, which is first order differential equation, whereas Laplacian operator is second order differential equation. Thus Maxwell equatioRead more
Answer: d
See lessExplanation: Poisson equation, two-dimensional heat and wave equations are general
cases of Laplacian equation. Maxwell equation uses only divergence and curl, which is
first order differential equation, whereas Laplacian operator is second order differential
equation. Thus Maxwell equation will not employ Laplacian operator.