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https://goremote.ics.purdue.edu/Citrix/XenApp/auth/login.aspx
 
https://goremote.ics.purdue.edu/Citrix/XenApp/auth/login.aspx
 
You will probably need to install the Citrix software.  Once you do and are logged in, select Applications -> Standard Software -> Computational Packages -> Maple 14 and the software will load remotely. Brig  --[[User:Brericks|Brericks]] 10:50, 30 October 2010 (UTC)
 
You will probably need to install the Citrix software.  Once you do and are logged in, select Applications -> Standard Software -> Computational Packages -> Maple 14 and the software will load remotely. Brig  --[[User:Brericks|Brericks]] 10:50, 30 October 2010 (UTC)
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Another great resource I've found is: http://www.wolframalpha.com/
  
 
Question #14, is f(x) even?  I know that pi*exp(-X) is neither odd or even, but when I graph the 2 conditions, they are symmetrical about the origin.  To solve the problem, do I split up the integrals like Question #20?
 
Question #14, is f(x) even?  I know that pi*exp(-X) is neither odd or even, but when I graph the 2 conditions, they are symmetrical about the origin.  To solve the problem, do I split up the integrals like Question #20?

Revision as of 17:15, 31 October 2010

Homework 10 collaboration area

Are there instructions on how to remotely access MAPEL anywhere? It would be nice to have access to check my work.

Login to software remote at the following link: https://goremote.ics.purdue.edu/Citrix/XenApp/auth/login.aspx You will probably need to install the Citrix software. Once you do and are logged in, select Applications -> Standard Software -> Computational Packages -> Maple 14 and the software will load remotely. Brig --Brericks 10:50, 30 October 2010 (UTC)

Another great resource I've found is: http://www.wolframalpha.com/

Question #14, is f(x) even? I know that pi*exp(-X) is neither odd or even, but when I graph the 2 conditions, they are symmetrical about the origin. To solve the problem, do I split up the integrals like Question #20?

Question #20, The integral for a_o, a_n, and b_n all have a term f(x)=0 (conditions are 0 to 2). Does this integral=0 there is no area when I draw the graph?


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