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Chapter 11: Problem 21
Find an equation of the tangent plane to the surface at the given point. $$ x y^{2}+3 x-z^{2}=4, \quad(2,1,-2) $$
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Find a normal vector to the level curve \(f(x, y)=c\) at \(P.\) $$ \begin{array}{l} f(x, y)=\frac{x}{x^{2}+y^{2}} \\ c=\frac{1}{2}, \quad P(1,1) \end{array} $$
Differentiate implicitly to find the first partial derivatives of \(w\). \(\cos x y+\sin y z+w z=20\)
In Exercises \(83-86,\) show that the function is differentiable by finding values for \(\varepsilon_{1}\) and \(\varepsilon_{2}\) as designated in the definition of differentiability, and verify that both \(\varepsilon_{1}\) and \(\varepsilon_{2} \rightarrow 0\) as \((\boldsymbol{\Delta x}, \boldsymbol{\Delta} \boldsymbol{y}) \rightarrow(\mathbf{0}, \mathbf{0})\) \(f(x, y)=x^{2}-2 x+y\)
Let \(w=f(x, y)\) be a function where \(x\) and \(y\) are functions of two variables \(s\) and \(t\). Give the Chain Rule for finding \(\partial w / \partial s\) and \(\partial w / \partial t\)
If \(f(x, y)=0,\) give the rule for finding \(d y / d x\) implicitly. If \(f(x, y, z)=0,\) give the rule for finding \(\partial z / \partial x\) and \(\partial z / \partial y\) implicitly.
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