286. Gradient of a function is a constant. State True/False. a) True b) False
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Answer: b
Explanation: Gradient of any scalar function may be defined as a vector. The vector’s
magnitude and direction are those of the maximum space rate of change of φ.
b) False
Answer: b
Explanation: Gradient of any scalar function may be defined as a vector. The vector’s
magnitude and direction are those of the maximum space rate of change of φ.
b) False
Answer: b
Explanation: Gradient of any scalar function may be defined as a vector. The vector’s
magnitude and direction are those of the maximum space rate of change of φ.
Answer: b
Explanation: Gradient of any scalar function may be defined as a vector. The vector’s
magnitude and direction are those of the maximum space rate of change of φ.
Answer: b
Explanation: Gradient of any scalar function may be defined as a vector. The vector’s
magnitude and direction are those of the maximum space rate of change of φ.
False
Answer: b
Explanation: Gradient of any scalar function may be defined as a vector. The vector’s
magnitude and direction are those of the maximum space rate of change of φ.
Answer: b Explanation: Gradient of any scalar function may be defined as a vector. The vector’s magnitude and direction are those of the maximum space rate of change of φ.
Answer: b
Explanation: Gradient of any scalar function may be defined as a vector. The vector’s
magnitude and direction are those of the maximum space rate of change of φ.
The mathematical perception of the gradient is said to be