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I have the following question:

Is the following statement true or false?

All logs to base 2

log2n is a member of O(log(n))

My attempt:

  • log2n - clogn <= 0
  • log2 + logn - clogn <= 0
  • 1 + logn(1-c) <= 0

Now correct me if I'm wrong, but I have to find values for n (variable) and c (constant) which either prove or disprove this...

Generally this seems to be true:

Choose

n0 = 2, c = 3 -> TRUE 
n1 = 3, c = 3 -> TRUE 
n2 = 4, c = 3 -> TRUE

Therefore, the statement seems true, logn increases as n does. But there are also values for which the above statement will never hold:

e.g.

Choose c = 1 evaluates to greater than zero regardless of the increasing value of n.

So I am confused as to whether this is true or false....

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I'm confused too :-) –  Johan Apr 19 '11 at 10:42

1 Answer 1

up vote 1 down vote accepted

You could just use the fact that the logarithm of a product is the sum of the logarithms of the factors:

log(2n) = log(2)+log(n) = O(log(n))

share|improve this answer
    
Ok that does tell me it's true. Unfortunately I have to prove it using the method above. I am just confused to why certain values evaluate to false. –  user559142 Apr 19 '11 at 10:47
    
@user559142: All you have to do is show that the condition is satisfied for one value of c (for all sufficiently large n). You don't have to prove (and it's generally not the case) that the condition holds for every c. –  NPE Apr 19 '11 at 11:18
    
ah really! that makes it easy! thanks a lot –  user559142 Apr 19 '11 at 11:36

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