Thursday, March 19, 2015
Term 3 Discussion (Series Topics)
This is for discussing topics from term 3 (series), including homework, in-class
work or lessons, take-home readings, or anything else related to the
class from term 3. Please be sure to include your
name at the end of your post for credit. When answering a question, DO
NOT GIVE SOLUTIONS! Provide hints or explain a method that you used, but
do not give the final result. As always, RESPECT IS A MUST! Anyone
abusing this forum will be banned from future use (meaning, no extra
credit!!!).
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Will the quiz on friday be open calculator?
ReplyDeleteThanks,
Rachel Hersch
We will not be able to use our calculators
DeleteAngela Satullo
Will we have to find what a series converges to on the quiz?
ReplyDelete-Abby Siegal
I believe that we are only able to find what values geometric and telescoping series converge to. Otherwise, we can only determine if a series is converging or not. So, generally, you will be mostly just be determining convergence or divergence on the quiz. Hope that helps!
DeleteIn what instances do we have to test for absolute convergence? Will it be specified or is it just for ratio test?
ReplyDeleteThanks,
Emma Gijsbers
The question will specifically ask you to test for absolute convergence if it is needed. Also, both the ratio and the root test will give you absolute convergence.
DeleteIs there a way to find what a series converges to without needing a fancy calculator? Or should I be investing in a new calculator?
ReplyDelete- Maggie Hammond
Actually, there are only very few series that we can find an exact value for. There are ways of estimating the value of the series numerically, and for some types of series we can use remainder theorems.
DeleteFor the outline, one bullet says "Differentiation Rules," and then lists all of them...do we need a definition and example for every single one?
ReplyDeleteAmira
Yes, include an example for each rule.
DeleteYou can be creative, though, and find a single example that incorporates multiple rules.
DeleteHow does the continuity of a function change on a closed interval vs an open interval?
ReplyDeleteAngela Satullo
To be continuous on a closed interval the one sided limits at the end points must equal the function value at the endpoints. On an open interval there are no endpoints to consider.
DeleteHey Mr. Wilson,
ReplyDeleteI'm working on the outline and I came to the "derivatives of functions defined as series" bullet point and i was really confused as to what it was referring to.
Thanks,
Will S