4.5 The chain rule (Page 5/9)

Calculus volume 3 Page 5 / 9

Implicit differentiation of a function of two or more variables

Suppose the function $z = f (x, y)$ defines $y$ implicitly as a function $y = g (x)$ of $x$ via the equation $f (x, y) = 0 .$ Then

\frac{d y}{d x} = - \frac{\partial f / \partial x}{\partial f / \partial y}

provided $f_{y} (x, y) \neq 0 .$

If the equation $f (x, y, z) = 0$ defines $z$ implicitly as a differentiable function of $x and y,$ then

\frac{d z}{d x} = - \frac{\partial f / \partial x}{\partial f / \partial z} and \frac{d z}{d y} = - \frac{\partial f / \partial y}{\partial f / \partial z}

as long as $f_{z} (x, y, z) \neq 0 .$

[link] is a direct consequence of [link] . In particular, if we assume that $y$ is defined implicitly as a function of $x$ via the equation $f (x, y) = 0,$ we can apply the chain rule to find $d y / d x :$

\begin{matrix} \frac{d}{d x} f (x, y) & = & \frac{d}{d x} (0) \\ \frac{\partial f}{\partial x} \cdot \frac{d x}{d x} + \frac{\partial f}{\partial y} \cdot \frac{d y}{d x} & = & 0 \\ \frac{\partial f}{\partial x} + \frac{\partial f}{\partial y} \cdot \frac{d y}{d x} & = & 0. \end{matrix}

Solving this equation for $d y / d x$ gives [link] . [link] can be derived in a similar fashion.

Let’s now return to the problem that we started before the previous theorem. Using [link] and the function $f (x, y) = x^{2} + 3 y^{2} + 4 y - 4,$ we obtain

\begin{matrix} \frac{\partial f}{\partial x} = 2 x \\ \frac{\partial f}{\partial y} = 6 y + 4. \end{matrix}

Then [link] gives

\frac{d y}{d x} = - \frac{\partial f / \partial x}{\partial f / \partial y} = - \frac{2 x}{6 y + 4} = - \frac{x}{3 y + 2},

which is the same result obtained by the earlier use of implicit differentiation.

Implicit differentiation by partial derivatives

Calculate $d y / d x$ if $y$ is defined implicitly as a function of $x$ via the equation $3 x^{2} - 2 x y + y^{2} + 4 x - 6 y - 11 = 0 .$ What is the equation of the tangent line to the graph of this curve at point $(2, 1) ?$
Calculate $\partial z / \partial x$ and $\partial z / \partial y,$ given $x^{2} e^{y} - y z e^{x} = 0 .$

Set $f (x, y) = 3 x^{2} - 2 x y + y^{2} + 4 x - 6 y - 11 = 0,$ then calculate $f_{x}$ and $f_{y} :$ $\begin{matrix} f_{x} = 6 x - 2 y + 4 \\ f_{y} = −2 x + 2 y - 6. \end{matrix}$
The derivative is given by

$\frac{d y}{d x} = - \frac{\partial f / \partial x}{\partial f / \partial y} = - \frac{6 x - 2 y + 4}{−2 x + 2 y - 6} = \frac{3 x - y + 2}{x - y + 3} .$

The slope of the tangent line at point $(2, 1)$ is given by

${\frac{d y}{d x} |}_{(x, y) = (2, 1)} = \frac{3 (2) - 1 + 2}{2 - 1 + 3} = \frac{7}{4} .$

To find the equation of the tangent line, we use the point-slope form ( [link] ):

$\begin{matrix} y - y_{0} & = & m (x - x_{0}) \\ y - 1 & = & \frac{7}{4} (x - 2) \\ y & = & \frac{7}{4} x - \frac{7}{2} + 1 \\ y & = & \frac{7}{4} x - \frac{5}{2} . \end{matrix}$

Graph of the rotated ellipse defined by $3 x^{2} - 2 x y + y^{2} + 4 x - 6 y - 11 = 0 .$
We have $f (x, y, z) = x^{2} e^{y} - y z e^{x} .$ Therefore,

$\begin{matrix} \frac{\partial f}{\partial x} = 2 x e^{y} - y z e^{x} \\ \frac{\partial f}{\partial y} = x^{2} e^{y} - z e^{x} \\ \frac{\partial f}{\partial z} = − y e^{x} . \end{matrix}$

Using [link] ,

$\begin{matrix} \begin{matrix} \frac{\partial z}{\partial x} & = - \frac{\partial f / \partial x}{\partial f / \partial y} \\ = - \frac{2 x e^{y} - y z e^{x}}{− y e^{x}} \\ = \frac{2 x e^{y} - y z e^{x}}{y e^{x}} \end{matrix} & and & \begin{matrix} \frac{\partial z}{\partial y} & = - \frac{\partial f / \partial y}{\partial f / \partial z} \\ = - \frac{x^{2} e^{y} - z e^{x}}{− y e^{x}} \\ = \frac{x^{2} e^{y} - z e^{x}}{y e^{x}} . \end{matrix} \end{matrix}$

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Find $d y / d x$ if $y$ is defined implicitly as a function of $x$ by the equation $x^{2} + x y - y^{2} + 7 x - 3 y - 26 = 0 .$ What is the equation of the tangent line to the graph of this curve at point $(3, −2) ?$

$\frac{d y}{d x} = {\frac{2 x + y + 7}{2 y - x + 3} |}_{(3, −2)} = \frac{2 (3) + (−2) + 7}{2 (−2) - (3) + 3} = - \frac{11}{4}$
Equation of the tangent line: $y = - \frac{11}{4} x + \frac{25}{4}$

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Key concepts

The chain rule for functions of more than one variable involves the partial derivatives with respect to all the independent variables.
Tree diagrams are useful for deriving formulas for the chain rule for functions of more than one variable, where each independent variable also depends on other variables.

Key equations

Chain rule, one independent variable
$\frac{d z}{d t} = \frac{\partial z}{\partial x} \cdot \frac{d x}{d t} + \frac{\partial z}{\partial y} \cdot \frac{d y}{d t}$
Chain rule, two independent variables
$\frac{d z}{d u} = \frac{\partial z}{\partial x} \cdot \frac{\partial x}{\partial u} + \frac{\partial z}{\partial y} \cdot \frac{\partial y}{\partial u}$
$\frac{d z}{d v} = \frac{\partial z}{\partial x} \cdot \frac{\partial x}{\partial v} + \frac{\partial z}{\partial y} \cdot \frac{\partial y}{\partial v}$
Generalized chain rule
$\frac{\partial w}{\partial t_{j}} = \frac{\partial w}{\partial x_{1}} \frac{\partial x_{1}}{\partial t_{j}} + \frac{\partial w}{\partial x_{2}} \frac{\partial x_{1}}{\partial t_{j}} + ⋯ + \frac{\partial w}{\partial x_{m}} \frac{\partial x_{m}}{\partial t_{j}}$

For the following exercises, use the information provided to solve the problem.

Let $w (x, y, z) = x y cos z,$ where $x = t, y = t^{2},$ and $z = arcsin t .$ Find $\frac{d w}{d t} .$

$\frac{d w}{d t} = y cos z + x cos z (2 t) - \frac{x y sin z}{\sqrt{1 - t^{2}}}$

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Let $w (t, v) = e^{t v}$ where $t = r + s$ and $v = r s .$ Find $\frac{\partial w}{\partial r}$ and $\frac{\partial w}{\partial s} .$

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If $w = 5 x^{2} + 2 y^{2}, x = −3 s + t,$ and $y = s - 4 t,$ find $\frac{\partial w}{\partial s}$ and $\frac{\partial w}{\partial t} .$

$\frac{\partial w}{\partial s} = −30 x + 4 y,$ $\frac{\partial w}{\partial t} = 10 x - 16 y$

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If $w = x y^{2}, x = 5 cos (2 t),$ and $y = 5 sin (2 t),$ find $\frac{\partial w}{\partial t} .$

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If $f (x, y) = x y, x = r cos θ,$ and $y = r sin θ,$ find $\frac{\partial f}{\partial r}$ and express the answer in terms of $r$ and $θ .$

$\frac{\partial f}{\partial r} = r sin (2 θ)$

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Suppose $f (x, y) = x + y, u = e^{x} sin y, x = t^{2},$ and $y = π t,$ where $x = r cos θ$ and $y = r sin θ .$ Find $\frac{\partial f}{\partial θ} .$

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Source: OpenStax, Calculus volume 3. OpenStax CNX. Feb 05, 2016 Download for free at http://legacy.cnx.org/content/col11966/1.2

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