Math  /  Calculus

QuestionFind the maximum rate of change of ff at the given point and the direction in which it occurs. f(x,y)=sin(xy),(9,0)f(x, y)=\sin (x y), \quad(9,0)
Step 1 Recall that the direction in which the maximum rate of change of f(x,y)f(x, y) occurs at a point (a,b)(a, b) is given by the vector f(a,b)\nabla f(a, b). For f(x,y)=sin(xy)f(x, y)=\sin (x y), we have f(x,y)=\nabla f(x, y)=\square

Studdy Solution
The maximum rate of change is the magnitude of the gradient vector at (9,0)(9, 0):
f(9,0)=02+92=9 \|\nabla f(9, 0)\| = \sqrt{0^2 + 9^2} = 9
The direction of the maximum rate of change is given by the unit vector in the direction of f(9,0)\nabla f(9, 0):
Since f(9,0)=(0,9)\nabla f(9, 0) = (0, 9), the direction is simply (0,1)(0, 1).
The maximum rate of change of f f at the point (9,0)(9, 0) is 9 \boxed{9} , and it occurs in the direction of the vector (0,1) \boxed{(0, 1)} .

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