At the bottom of page 5 is the phrase "changes k to k ⊕ (1^{j+1})_{2}". Isn't 1 to any power still 1 even in binary? I'm thinking this must be a typo. I sent an email to Dr. Knuth to report this, but I don't expect to hear back for months. In the meantime, I'm trying to figure out what this is supposed to be.

This can be resolved by using the convention that (...)_{2} represents a bitwise representation. (1^{j+1})_{2} then consists solely of j+1 ones, rather than referring to an exponentiation. You can see this convention explained more explicitly in TAOCP Volume 4 Fascicle 1 at page 8, for example:
[I have substituted the symbol alpha by g to save encoding problems] Going back to your original query; k ⊕(1^{j+1})_{2} is equated with k ⊕ (2^{j+1}  1) implying that (1^{j+1})_{2} = (2^{j+1}  1): this holds because the lefthand side is the integer whose significant bits are j+1 (contiguous) ones; the righthand side is an exponentiation. For example, with j =3: (1^{4})_{2} = (1111)_{2} = (2^{4}  1) Hope that helps. 


A list of known typos can be found on the errata page: http://wwwcsfaculty.stanford.edu/~knuth/taocp.html Your reported typo is not there. If it really is a typo, you might be eligible for a cash reward from Knuth himself. 

