I have checked all over the internet and I cannot find why is gradient shows you the steepest ascent and not the steepest descent
How can we proof that?
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http://math.stackexchange.com/a/223265/43760 – BobaFret Feb 17 '17 at 01:57
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The directional derivative of function $f$ at point $a$ along vector $\bf v$ is ${\bf v} \cdot {\nabla f(a)}$. So if ${\bf v} = \nabla f(a)$, we get $(\nabla f(a)) \cdot (\nabla f(a))$. But the dot product of any vector with itself $\ge 0$. Therefore it's ascent, not descent.
Robert Israel
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