Difference between revisions of "022 Sample Final A, Problem 4"

Revision as of 12:06, 30 May 2015

Use implicit differentiation to find ${\frac {dy}{dx}}:\qquad x+y=x^{3}y^{3}$

Foundations:
When we use implicit differentiation, we combine the chain rule with the fact that $y$ is a function of $x$ , and could really be written as $y(x).$ Because of this, the derivative of $y^{3}$ with respect to $x$ requires the chain rule, so
${\frac {d}{dx}}\left(y^{3}\right)=3y^{2}\cdot {\frac {dy}{dt}}.$

Solution:

Step 1:
First, we differentiate each term separately with respect to $x$ to find that $x^{3}-y^{3}-y=x$ differentiates implicitly to
$3x^{2}-3y^{2}\cdot {\frac {dy}{dx}}-{\frac {dy}{dx}}=1$ .

Step 2:
Since they don't ask for a general expression of $dy/dx$ , but rather a particular value at a particular point, we can plug in the values $x=1$ and $y=0$ to find
$3(1)^{2}-3(0)^{2}\cdot {\frac {dy}{dx}}-{\frac {dy}{dx}}=1,$
which is equivalent to $3-{\frac {dy}{dx}}=1$ . This solves to $dy/dx=2.$

Final Answer:
$dy/dx=2.$

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−	~~<span style="font-size:135%"><font face=Times Roman>~~<span class="exam"> Use implicit differentiation to find <math>\frac{dy}{dx}: \qquad x+y = x^3y^3</math>	+	<span class="exam"> Use implicit differentiation to find <math>\frac{dy}{dx}: \qquad x+y = x^3y^3</math>

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