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Please take a look here: picture of the question

Assume I want to decide the sign of $\frac{dz}{dt}|_{t=1} $ (and not t=2). As far as I can see: At $t=1$ i think that the derivative is positive... this is because the $x'(1)=0 ,y'(1)>0$ and $ z_y(3,0) > 0 $ . In one of my previous posts, Babak S. said he thinks I'm right.

On the other hand, at the point $(3,0) $ , the gradient must be perpendicular to the corresponding level set, so it must point towards the positive region of the x-axis, which means that the y'th-coordinate term of the gradient vector must be $0$ and thus $\frac{dz}{dt}|_{t=1} = 0$ ...

Can someone please explain to me what am I getting wrong here?

Glorfindel
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czash
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1 Answers1

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Why do you say $z_y(3,0) > 0$? As you observed correctly in your second paragraph, the gradient is in the $x$-direction at $(3,0)$, so $z_y(3,0) = 0$.