Ratna yadav
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Enlightened
Asked: 2022-06-19T20:58:07+05:30 In:

352. Find the Laplace equation value of the following potential field V = ρ cosφ + z

  • 0
352. Find the Laplace equation value of the following potential field V = ρ cosφ + z

    5 Answers

    1. Enlightened

      a Explanation: (Del)2 (ρ cosφ + z)= (cos φ/r) – (cos φ/r) + 0 = 0, this satisfies Laplace equation. The value is 0.

      a
      Explanation: (Del)2
      (ρ cosφ + z)= (cos φ/r) – (cos φ/r) + 0
      = 0, this satisfies Laplace equation. The value is 0.

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      • 0
    3. Explainer

      A Explanation: (Del)2 (ρ cosφ + z)= (cos φ/r) – (cos φ/r) + 0 = 0, this satisfies Laplace equation. The value is 0.

      A
      Explanation: (Del)2
      (ρ cosφ + z)= (cos φ/r) – (cos φ/r) + 0
      = 0, this satisfies Laplace equation. The value is 0.

      See less
      • 0
    5. Enlightened

      Answer: 0 Explanation: (Del)2 (ρ cosφ + z)= (cos φ/r) – (cos φ/r) + 0 = 0, this satisfies Laplace equation. The value is 0.

      Answer: 0
      Explanation: (Del)2
      (ρ cosφ + z)= (cos φ/r) – (cos φ/r) + 0
      = 0, this satisfies Laplace equation. The value is 0.

      See less
      • 0
    7. Enlightened

      Answer: a Explanation: (Del)2 (ρ cosφ + z)= (cos φ/r) – (cos φ/r) + 0 = 0, this satisfies Laplace equation. The value is 0.

      Answer: a
      Explanation: (Del)2
      (ρ cosφ + z)= (cos φ/r) – (cos φ/r) + 0
      = 0, this satisfies Laplace equation. The value is 0.

      See less
      • 0
    9. Enlightened

      a) Explanation: (Del)2 (ρ cosφ + z)= (cos φ/r) – (cos φ/r) + 0 = 0, this satisfies Laplace equation. The value is 0.

      a)
      Explanation: (Del)2
      (ρ cosφ + z)= (cos φ/r) – (cos φ/r) + 0
      = 0, this satisfies Laplace equation. The value is 0.

      See less
      • 0

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