Difference between revisions of "022 Exam 2 Sample B, Problem 1"

Revision as of 16:15, 17 May 2015

Find the derivative of $y\,=\,\ln {\frac {(x+1)^{4}}{(2x-5)(x+4)}}.$

Foundations:
This problem requires several advanced rules of differentiation. In particular, you need
The Chain Rule: If $f$ and $g$ are differentiable functions, then
$(f\circ g)'(x)=f'(g(x))\cdot g'(x).$
The Product Rule: If $f$ and $g$ are differentiable functions, then
$(fg)'(x)=f'(x)\cdot g(x)+f(x)\cdot g'(x).$
The Quotient Rule: If $f$ and $g$ are differentiable functions and $g(x)\neq 0$ , then
$\left({\frac {f}{g}}\right)'(x)={\frac {f'(x)\cdot g(x)-f(x)\cdot g'(x)}{\left(g(x)\right)^{2}}}.$
Additionally, we will need our power rule for differentiation:
$\left(x^{n}\right)'\,=\,nx^{n-1},$ for $n\neq 0$ ,
as well as the derivative of natural log:
$\left(\ln x\right)'\,=\,{\frac {1}{x}}.$

Solution:

Step 1:
We need to identify the composed functions in order to apply the chain rule. Note that if we set $g(x)\,=\,\ln x$ , and
$f(x)\,=\,{\frac {(x+1)^{4}}{(2x-5)(x+4)}},$
we then have $y\,=\,g\circ f(x)\,=\,g\left(f(x)\right).$

Step 2:
We can now apply all three advanced techniques. For $f'(x)$ , we can use both the quotient and product rule to find
${\begin{array}{rcl}f'(x)&=&\displaystyle {\frac {((x+1)^{4})'(2x-5)(x+4)-((2x-5)(x+4))'(x+1)^{4}}{(2x-5)^{2}(x+4)^{2}}}\\\\&=&\displaystyle {{\frac {(4(x+1)^{3})(2x-5)(x+4)-(2(x+4)+(2x-5))(x+1)^{4}}{(2x-5)^{2}(x+4)^{2}}}.}\end{array}}$

Step 3:

We can now use the chain rule to find

{\begin{array}{rcl}y'&=&\left(g\circ f\right)'(x)\\\\&=&g'\left(f(x)\right)\cdot f'(x)\\\\&=&\displaystyle {\left[{\frac {(2x-5)(x+4)}{(x+1)^{4}}}\right]{\frac {((x+1)^{4})'(2x-5)(x+4)-((2x-5)(x+4))'(x+1)^{4}}{(2x-5)^{2}(x+4)^{2}}}}\\\\&=&\displaystyle {\left[{\frac {(2x-5)(x+4)}{(x+1)^{4}}}\right]{\frac {(4(x+1)^{3})(2x-5)(x+4)-(2(x+4)+(2x-5))(x+1)^{4}}{(2x-5)^{2}(x+4)^{2}}}.}\end{array}}

Note that many teachers do not prefer a cleaned up answer, and may request that you do not simplify. This problem seems like it would be of that type, as it doesn't simplify too well. Nevertheless, it's always a good idea to ask the teacher if you aren't sure of his or her intent.

Final Answer:
$y'=\left[{\frac {(2x-5)(x+4)}{(x+1)^{4}}}\right]{\frac {(4(x+1)^{3})(2x-5)(x+4)-(2(x+4)+(2x-5))(x+1)^{4}}{(2x-5)^{2}(x+4)^{2}}}.$

Return to Sample Exam

@@ Line 72: / Line 72: @@
 &=&\displaystyle{\left[\frac{(2x-5)(x+4)}{(x+1)^4} \right]\frac{(4(x+1)^3)(2x-5)(x+4)-(2(x+4)+(2x-5))(x+1)^4}{(2x-5)^2(x+4)^2}. }
 \end{array}</math>
-Note that many teachers <u>'''do not'''</u> prefer a cleaned up answer, and may request that you <u>'''do not simplify'''</u>.  In this case, we could write the answer as<br>
+Note that many teachers <u>'''do not'''</u> prefer a cleaned up answer, and may request that you <u>'''do not simplify'''</u>.  This problem seems like it would be of that type, as it doesn't simplify too well.  Nevertheless, it's always a good idea to ask the teacher if you aren't sure of his or her intent.
-|-
-|
-::<math>y'=\left[\frac{(2x-5)(x+4)}{(x+1)^4} \right]\frac{(4(x+1)^3)(2x-5)(x+4)-(2(x+4)+(2x-5))(x+1)^4}{(2x-5)^2(x+4)^2}. </math>
 |}

Difference between revisions of "022 Exam 2 Sample B, Problem 1"

Revision as of 16:15, 17 May 2015

Navigation menu

Search