We define recursively the Ulam numbers by setting u1 = 1, u2 = 2, and for each
subsequent integer n, we set n equal to the next Ulam number if it can be written
uniquely as the sum of two different Ulam numbers; e.g.: u3 = 3, u4 = 4, u5 = 6,
etc.
Prove that there are infinitely many Ulam numbers.
Now a D4 BONUS.
3 (=1+2).
Find another Ulam number is that is the sum of two consecutive Ulam numbers.
How about a 3rd one?
1. 3rd line from the bottom : erase the 1st
is.2. How about a 3rd one? - nobody addressed it yet...