305. Identify the nature of the field, if the divergence is zero and curl is also zero.
Ratna yadavEnlightened
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c Explanation: Since the vector field does not diverge (moves in a straight path), the divergence is zero. Also, the path does not possess any curls, so the field is irrotational.
c
See lessExplanation: Since the vector field does not diverge (moves in a straight path), the
divergence is zero. Also, the path does not possess any curls, so the field is irrotational.
C Explanation: Since the vector field does not diverge (moves in a straight path), the divergence is zero. Also, the path does not possess any curls, so the field is irrotational.
C
See lessExplanation: Since the vector field does not diverge (moves in a straight path), the
divergence is zero. Also, the path does not possess any curls, so the field is irrotational.
Answer: c Explanation: Since the vector field does not diverge (moves in a straight path), the divergence is zero. Also, the path does not possess any curls, so the field is irrotational.
Answer: c
See lessExplanation: Since the vector field does not diverge (moves in a straight path), the
divergence is zero. Also, the path does not possess any curls, so the field is irrotational.
Answer: Solenoidal, irrotational Explanation: Since the vector field does not diverge (moves in a straight path), the divergence is zero. Also, the path does not possess any curls, so the field is irrotational.
Answer: Solenoidal, irrotational
See lessExplanation: Since the vector field does not diverge (moves in a straight path), the
divergence is zero. Also, the path does not possess any curls, so the field is irrotational.
c) Explanation: Since the vector field does not diverge (moves in a straight path), the divergence is zero. Also, the path does not possess any curls, so the field is irrotational.
c)
See lessExplanation: Since the vector field does not diverge (moves in a straight path), the
divergence is zero. Also, the path does not possess any curls, so the field is irrotational.