...what was that exercise? What were its instructions? In particular, what is the "limit" for this "problem"? (Neither of the two expressions is a limit, having no "limit" statement....)
When you reply, please include all information...along with a clear statement of your thoughts and efforts so far....
I have corrected the questions.
In future, kindly please
reply with corrections, clarifications, etc, so that the (literal) thread of the conversation is not lost.
this is where I got stuck.
I would be very glad if someone can help me with this Limit problem.
1.lim{x->0) sin(x)(1-cos(x))/2x^8 =
lim{x->0)sin(x)/2x^8*1-cos(x) = 1/2lim(x->0)sin(x)/x^8*1-cos(x)
I will guess that the original exercise was the following:
. . . . .\(\displaystyle \mbox{1. Find the following: }\, \)\(\displaystyle \displaystyle \lim_{x\, \rightarrow\, 0}\, \)\(\displaystyle \dfrac{\sin(x)\, (1\, -\, \cos(x))}{2x^8}\)
Then your "work done" was this:
. . . . .\(\displaystyle \displaystyle \lim_{x\, \rightarrow\, 0}\,\)\(\displaystyle \dfrac{\sin(x)}{2x^8\, (1\, -\, \cos(x))}\, =\, \dfrac{1}{2}\,\)\(\displaystyle \displaystyle \lim_{x\, \rightarrow\, 0}\,\)\(\displaystyle \dfrac{\sin(x)}{x^8\, (1\, -\, \cos(x))}\)
But this makes no sense, so maybe some grouping symbols went missing somewhere...? Also, what did you do after taking the "2" from the denominator out front? What trig limits, etc, did you bring to bear?
2.
lim{x->0) xsin(x)/1-cos(x) =lim(x->0)x/1-cos(x)*sin(x)
I'm sorry, but I don't follow. How is the sine going from the numerator (in the first "limit" statement) to the denominator (in the second "limit" statement)? What steps came in between? What was your reasoning?
Please be complete. Thank you!
