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Simplify the difference quotient $\frac{f(x+h)-f(x)}{h}$ where
a) $f(x)=2x+3,$
b) $f(x)=\frac{1}{x+1},$
c) $f(x)=x^2.$

I believe that if anyone can help me out with the first one, the other two might come clearer to me. But I started out this problem by plugging in $f(x)$ and got: $$\dfrac{(2x+3)+f(h)-(2x+3)}{h}$$ I have no idea what to do after this. Because the $2x+3$'s can cancel out and leave me with just $\frac{f(h)}{h}$ but that doesn't make sense to me. Please help.

EDIT: The first one is solved and now for the second one, this is what I got: $$\dfrac{\frac{1}{(x+h)+1}-\frac{1}{x+1}}{h}$$ Now, to subtract fractions the denominator has to be the same and they are the exact same except for the first fraction has an $h$ while the other one does not. How would I go about this?

For the third problem, this is all of my work: $$\begin{align*}\dfrac{(x+h)^2-x^2}{h}&= \dfrac{x^2+2hx+h^2-x^2}{h}\\ &= \dfrac{2hx+h^2}{h}\\ &= \dfrac{h(2x+h)}{h}\\ &= 2x+h\end{align*}$$ Is this all correct?

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    Your work for the third problem is correct.2012-08-07
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    @Théophile Great! Thanks for checking it.2012-08-07

3 Answers 3

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for the first one 2x +3 2 ( X + H ) - ( 2X +3 ) ---------------------------- H 2X + 2 H - 2X + 3 _____________ H
2H =
__ = 2 H

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$f(x+h)$ means replace $x$ with $x+h$ in your function definition. If $f(x) = 2x+3$, then $f(x+h) = 2(x+h)+3$, not $2x+3+f(h)$.

Therefore, $$\frac{f(x+h)-f(x)}{h} = \frac{2(x+h)+3-\left(2x+3\right)}{h} = \frac{2x+2h+3-2x-3}{h} = \cdots$$

Edit: To answer your second question, how do you handle just $\frac{1}{x+h+1}-\frac{1}{x+1}$? One simple way: multiply the first term above and below by the second term's denominator, and vice-versa: $$\frac{1}{x+h+1}\frac{x+1}{x+1}-\frac{1}{x+1}\frac{x+h+1}{x+h+1} = \frac{(x+1)-(x+h+1)}{(x+h+1)(x+1)}.$$

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    Does it come out to be $h+6$?2012-08-07
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    @AustinBroussard No.2012-08-07
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    No. I have edited the post to add details. Follow the calculations through, and let me know if you have any other issues :)2012-08-07
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    Nevermind. I had a $+$ instead of a $-$. Is it just $h$?2012-08-07
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    No, it is not just $h$. Read my post more carefully. If $f(x) = 2x+3$, then what happens when you replace $x$ with $x+h$? The answer to that question is the value of $f(x+h)$.2012-08-07
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    I got the first one, I now need help with the second one.2012-08-07
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For the second one, you do the same thing: $$\dfrac{\frac{1}{(x+h)+1}-\frac{1}{x+1}}{h}=\dfrac{1}{h}\left(\frac{1}{(x+h)+1}-\frac{1}{x+1}\right)=\dfrac{1}{h}\dfrac{(x+1)-(x+h+1)}{(x+1)(x+h+1)}=\dfrac{1}{h}\dfrac{-h}{(x+1)(x+h+1)}=\ldots$$

Added: Now, you use the distributivity: $$(x+1)(x+h+1)=(x+1)x+(x+1)h+(x+1)1=(x^2+x)+(xh+h)+(x+1)=\ldots$$

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    Explain the first step more thoroughly please. I see that you took out the $\dfrac{1}{h}$ but how did the bottom go from $h$ to all of that?2012-08-07
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    @AustinBroussard The bottom $h$ is the factor $\dfrac{1}{h}$. The numerator $\dfrac{1}{x+h+1}-\dfrac{1}{x+1}$ became the factor $\dfrac{(x+1)-(x+h+1)}{(x+1)(x+h+1)}$. I will add the extra step.2012-08-07
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    @AustinBroussard Read my edit of my answer for the explanation of how to handle subtraction of fractions with different denominators. It may be helpful to review that material anyhow... in other words, how do you compute $\frac{1}{3}-\frac{1}{7}$...2012-08-07
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    For that, wouldn't you multiply $\frac{1}{3}$ by $7$ and $\frac{1}{7}$ by $3$ and then subtract the numerator.2012-08-07
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    OH. I see it now.2012-08-07
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    @AustinBroussard No, you would multiply $\frac{1}{3}$ by $\frac{7}{7}$, and so forth, which I think is what you meant. Either way, the same rules hold when subtracting fractions of variables. Try applying those rules and see where it gets you.2012-08-07
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    @AustinBroussard You use distributivity; see my edit.2012-08-07
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    So my answer I have now is: $\dfrac{1}{h}\left(\dfrac{-h}{x^2+2x+hx+h+1}\right)$. And then cancel the $\frac{1}{h}$ with the $-h$? So would my final answer be, $\dfrac{-1}{x^2+2x+xh+h+1}$?2012-08-07
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    @AustinBroussard This is almost right: first, you forgot a minus sign (see my computation above); then, you can cancel the $h$ in the numerator with the factor of $\dfrac{1}{h}$ in front.2012-08-07
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    Is my answer correct?2012-08-07
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    @AustinBroussard Yes.2012-08-07
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    I will re-edit once again for the third problem after I work it out.2012-08-07