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Find the Gradient Field of the Function f(x,y,z)=(x+yy+z)6f ( x , y , z ) = \left( \frac { x + y } { y + z } \right) ^ { 6 }

Question 262

Multiple Choice

Find the gradient field of the function.
- f(x,y,z) =(x+yy+z) 6f ( x , y , z ) = \left( \frac { x + y } { y + z } \right) ^ { 6 }


A) f=6(x+y) 5(y+z) 6i+6(x+y) 5(zx) (y+z) 7j6(x+y) 6(y+z) 7k{\nabla} f = \frac { 6 ( x + y ) ^ { 5 } } { ( y + z ) ^ { 6 } } i + \frac { 6 ( x + y ) ^ { 5 } ( z - x ) } { ( y + z ) ^ { 7 } } j - 6 \frac { ( x + y ) ^ { 6 } } { ( y + z ) ^ { 7 } } \mathbf { k }
B) f=6(x+yy+z) 5i+6(x+y) 5(z+x) (y+z) 7j+6(x+y) 6(y+z) 7k{\nabla} f = 6 \left( \frac { x + y } { y + z } \right) ^ { 5 } i + \frac { 6 ( x + y ) ^ { 5 } ( z + x ) } { ( y + z ) ^ { 7 } } j + 6 \frac { ( x + y ) ^ { 6 } } { ( y + z ) ^ { 7 } } k
C) f=6(x+yy+z) 5i+6(x+y) 5(zx) (y+z) 7j+6(x+y) 6(y+z) 7k{\nabla} f = 6 \left( \frac { x + y } { y + z } \right) ^ { 5 } i + \frac { 6 ( x + y ) ^ { 5 } ( z - x ) } { ( y + z ) ^ { 7 } } j + 6 \frac { ( x + y ) ^ { 6 } } { ( y + z ) ^ { 7 } } \mathbf { k }
D) f=6(x+yy+z) 5i+6(x+y) 5(z+x) (y+z) 7j6(x+y) 6(y+z) 7k{\nabla} f = 6 \left( \frac { x + y } { y + z } \right) ^ { 5 } i + \frac { 6 ( x + y ) ^ { 5 } ( z + x ) } { ( y + z ) ^ { 7 } } j - 6 \frac { ( x + y ) ^ { 6 } } { ( y + z ) ^ { 7 } } k

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