limit question
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Bob Brown MSEE
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LIM LN(-x)= -infinity
x->0-
so answer: -infinity*2 = -infinity
x->0-
so answer: -infinity*2 = -infinity
markraz
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thanks but what process is used to determine this ? do I just have to memorize the graph?
D
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Another way
let x = 1-ε
then
\(\displaystyle \lim_{x\to1^-}ln(2-2x) \ = \lim_{ε \to 0}ln(2ε) \ = - ∞ (or DNE)\)
Yes to some extent you have to remember the graph of ln(x) - i.e. ln(x) goes to "increasingly negative" value as x → 0+ (approaching from right) .............. edit
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Hi Mark,
No, we don't need to memorize the graph of y = ln(2-2x)
We need to memorize the graph of y = ln(x)
After that, it helps to understand the topic of graph transformations (from precalculus); that is, if you know the steps to go from the graph of ln(x) to the graph of ln(2-2x), then you can "see" that the general behavior of ln(2-2x) as x approaches 1 from the left is the same as the behavior of ln(x) as x approaches zero from the right.
Cheers :cool:
markraz
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thanks, so there is no way around memorizing graphs?
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There's always a way.
If you don't want to memorize the general behavior of elementary functions -- like y=e^x, y=ln(x), y=sin(x), y=arcsin(x) -- then you can reconstruct what you need to know each time, by building a table of xy-values and plotting points.
(I think that it's easier in the long run to memorize a few graphs.)
ֺ
There's always a way.
If you don't want to memorize the general behavior of elementary functions -- like y=e^x, y=ln(x), y=sin(x), y=arcsin(x) -- then you can reconstruct what you need to know each time, by building a table of xy-values and plotting points.
(I think that it's easier in the long run to memorize a few graphs.)
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