Follow-up: Weird sums

August 16, 2007 · Follow Up, The Mathcast, numbers · Permalink

«« CS. Perfect Sums· · · CT. Odd People »»

What numbers can 1,2,4,8,16,… etc “form”? Well, every number can be “formed” by summing various powers of 2. For example, 13 = 1 + 4 + 8.

In this way, we could say that a power of 2, say 64, is “full of divisors” since it has enough divisors to form any number up to 64. Its divisors are of course 1, 2, 4, 8, 16 and 32, and we can form any number from 1 to 63 by summing up these divisors as needed.

But what other numbers of “full of divisors”?

22 is not “full of divisors” since 1, 2 and 11 are obviously not enough to form any number from 1 to 21.

But 88 is full of divisors! Not hard to see why if you take a close look…

So here is a quick puzzle that will help us out with the solution to Perfect Sums

Check that: given any number Q, there is a k so that 2k Q is full of divisors. (For 11, k=3 and 23 11 is full of divisors.)

Why is 88 “full of divisors”? 1, 2, 4, 8 can form any number up to 11, and 11, 22, 44 can form any multiple of 11 up to 77. So all together 1,2,4,8,11,22,44 can form any number from 1 to 87.

RSS feed for comments on this post · TrackBack URL

Leave a Comment

You must be logged in to post a comment.

The Math Factor
Podcast Website


Quality Math Talk Since 2004

June 8, 2008: The Firefly Festival is coming up quick! Join us in a amazing woven performance space for an evening of summer fun!

Want us to discuss something on the show? Let us know!

Heya! Do us a favor and link here from your site!