Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

Hello I've tried my best to understand big-theta and now I get the main conception of the proofs for Big-Oh and Big-Omega but i couldn't find and example that is close to my excercise, because i cant do the proof for that one:

Prove, by exhibiting witnesses, that 4n^2 + 4n = Big-Theta(2n^2 + 32n)

I know that i have to prove it for Big-Oh and Big-Omega in order to prove Big-Theta, but i have no idea how to start. I mean the equation on the right side confuses me.

share|improve this question
1  
BTW, theta is a set, so it is not proper to say 4n^2 + 4n = Big-Theta(2n^2 + 32n). Rather, say 4n^2 + 4n in Big-Theta(2n^2 + 32n). –  ThomasMcLeod Mar 28 '11 at 21:11
    
@ThomasMcLeod, while what you said is true strictly speaking, I thought it was accepted convention to abuse notation like that. –  Michael McGowan Mar 28 '11 at 21:53
    
Yes, this is the standard notation. Confusing at first but used in almost all algorithms books. –  ypercube Mar 28 '11 at 22:36
3  
I wouldn't say abusing, but overloading the = operator. –  ypercube Mar 28 '11 at 22:39
1  
@THomas: Nope. It is very convenient in writing asymptotic expressions. For instance things like log n! = nlog n - n + O(log n). Sum_{primes p <= n} 1/p = log log n + A + O(1/log^2 n) etc. This is quite prevalent in mathematical literature and is really very convenient. Of course, unless you know what it means, you cannot make sense of those expressions... While I agree there might be some confusion to people who are unfamiliar, the convenience far outweighs the possible issues due to confusion. –  Aryabhatta Mar 29 '11 at 5:50

1 Answer 1

up vote 3 down vote accepted

By the definition of big-theta, you need to show that there exist two constants, k1 and k2, such that for all sufficiently large values of n,

k1 * |2n^2 + 32n| <= |4n^2 + 4n| <= k2 * |2n^2 + 32n|

(Since your functions are all positive for positive n, you can drop the absolute values.) Just show that each inequality can be satisfied separately and you're done.

P.S. If this is homework, please tag it so.

share|improve this answer
    
What is the equation that i would get. I'm sorry for the dumb question but I'm really unsure about the answer I get. –  Zee Mar 29 '11 at 13:14
1  
@Zee - let's take the left-hand inequality. As mentioned, we'll drop the absolute value signs. You need to show that there is a k1 and an N such that for all n > N, k1 * (2 n ^2 + 32 n ) <= 4 n ^2 + 4 n . This can be rewritten as (4-2 k1 )n^2 - 28 n >= 0. For large n , this will be dominated by the n ^2 term, so it will eventually be positive provided 4 - 2 k1 is positive. So any k1 < 2 will do (such as k1 = 1). Once you pick a k1 , it's a simple exercise to calculate the threshold N . A similar analysis can be used for the right side. –  Ted Hopp Mar 29 '11 at 21:22
    
@Ted Hopp many thanks. –  Zee Apr 2 '11 at 1:19
    
@Ted encouraging the homework tag is deprecated. meta.stackexchange.com/questions/60422/is-homework-an-exception/… –  jcolebrand Apr 2 '11 at 1:22
    
@drachenstern - From the rest of the postings on that page (particularly the one just above it by Jeff Atwood who wrote the blog post on the death of meta tags), I don't see that it's deprecated at all; just that some would like it to be. –  Ted Hopp Apr 3 '11 at 4:34

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.