Difference between revisions of "009A Sample Final 1, Problem 4"

Revision as of 11:41, 4 March 2016

If

y=x^{2}+\cos(\pi (x^{2}+1))

compute ${\frac {dy}{dx}}$ and find the equation for the tangent line at $x_{0}=1$ . You may leave your answers in point-slope form.

Foundations:
1. What two pieces of information do you need to write the equation of a line?
You need the slope of the line and a point on the line.
2. What does the Chain Rule state?
For functions $f(x)$ and $g(x),$ $~{\frac {d}{dx}}(f(g(x)))=f'(g(x))g'(x).$

Solution:

Step 1:
First, we compute ${\frac {dy}{dx}}.$ We get
${\frac {dy}{dx}}=2x-\sin(\pi (x^{2}+1))(2\pi x).$

Step 2:
To find the equation of the tangent line, we first find the slope of the line.
Using $x_{0}=1$ in the formula for ${\frac {dy}{dx}}$ from Step 1, we get
$m=2(1)-\sin(2\pi )2\pi =2.$
To get a point on the line, we plug in $x_{0}=1$ into the equation given.
So, we have $y=1^{2}+\cos(2\pi )=2.$
Thus, the equation of the tangent line is $y=2(x-1)+2.$

Final Answer:
${\frac {dy}{dx}}=2x-\sin(\pi (x^{2}+1))(2\pi x)$
$y=2(x-1)+2$

@@ Line 50: / Line 50: @@
 !Final Answer: &nbsp;
 |-
-|<math>\frac{dy}{dx}=2x-\sin(\pi(x^2+1))(2\pi x)</math>
+|&nbsp;&nbsp; <math>\frac{dy}{dx}=2x-\sin(\pi(x^2+1))(2\pi x)</math>
 |-
-|<math>y=2(x-1)+2</math>
+|&nbsp;&nbsp; <math>y=2(x-1)+2</math>
 |}
 [[009A_Sample_Final_1|'''<u>Return to Sample Exam</u>''']]