Evaluating Infinite Series: (2^n)/(n!) from n=0 to infinity

lvuittongirl22
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How do I evaluate the infinite series (2^n)/(n!) from n=0 to infinity?
(I don't know how you put the little E symbol and all that in so I had to write it out.)

I already found that it converges to 0 using the ratio test, but I don't know quite how to evaluate it.

Any help would be mondo appreciated! Thank you!
 
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Have you dealt with Taylor's series? In particular, do you know the Taylor's series for ex?
 
We went over them, but I'm not sure how to use them...
 
Thread 'Use greedy vertex coloring algorithm to prove the upper bound of χ'

Thread 'Use greedy vertex coloring algorithm to prove the upper bound of χ'

Hi! I am struggling with the exercise I mentioned under "Homework statement". The exercise is about a specific "greedy vertex coloring algorithm". One definition (which matches what my book uses) can be found here: https://people.cs.uchicago.edu/~laci/HANDOUTS/greedycoloring.pdf Here is also a screenshot of the relevant parts of the linked PDF, i.e. the def. of the algorithm: Sadly I don't have much to show as far as a solution attempt goes, as I am stuck on how to proceed. I thought...
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