Difference between revisions of "009A Sample Final A, Problem 4"

4. Find an equation for the tangent line to the function  ${\displaystyle -x^{3}-2xy+y^{3}=-1}$ at the point ${\displaystyle (1,1)}$.

Foundations:
Since only two variables are present, we are going to differentiate everything with respect to x in order to find an expression for the slope, m = y ' = dy/dx. Then we can use the point-slope equation form ${\displaystyle y-y_{1}=m(x-x_{1})}$ at the point ${\displaystyle \left(x_{1},y_{1}\right)=(1,1)}$ to find the equation of the tangent line.
Note that implicit differentiation will require the product rule and the chain rule. In particular, differentiating 2xy must be treated as
${\displaystyle (2x)\cdot (y),}$
which has as a derivative
${\displaystyle 2\cdot y+2x\cdot y'=2y+2x\cdot y'.}$

Finding the slope:
We use implicit differentiation on our original equation to find
${\displaystyle -3x^{2}-2y-2x\cdot y'+3y^{2}\cdot y'=0.}$
From here, I would immediately plug in (1,1) to find y ':
${\displaystyle -3-2-2y'+3y'=0}$, or ${\displaystyle y'=5.}$

Writing the Equation of the Tangent Line:
Now, we simply plug our values of x = y = 1 and m = 5 into the point-slope form to find the tangent line through (1,1) is
${\displaystyle y-1=5(x-1),}$
or in slope-intercept form
${\displaystyle y=5x-4.}$

Return to Sample Exam