The question seems pretty well formulated
I have a virtual machine which implements only AND, XOR, SHL and SHR, yet I have to do a "OR 0x01" operation.
The question seems pretty well formulated I have a virtual machine which implements only AND, XOR, SHL and SHR, yet I have to do a "OR 0x01" operation. 


First of all having a correct bitwise computation for the following two variables is sufficient, because they cover all combinations: We want for xor we get 0101 for and we get 0101 so if we connect them with an xor we are done. (A xor B) xor (A and B) 


I would just start with
and unleash some boolean algebra on that until it looks like
Admittedly, this is probably more work to actually do than going the "try every conceivable bit combination" route, but then you did ask for homework solution ideas. :) 


The truth table as summarized on Wikipedia here and gasp, basic CS 101 stuff, De Morgan's Law.... AND 0 & 0 0 0 & 1 0 1 & 0 0 1 & 1 1 OR 0  0 0 0  1 1 1  0 1 0  0 1 XOR 0 ^ 0 0 0 ^ 1 1 1 ^ 0 1 1 ^ 1 0 A Shift Left involves shifting the bits across from right to left, suppose: +++++++++ 76543210 +++++++++ 00000100 = 0x4 hexadecimal or 4 decimal or 100 in binary +++++++++ Shift Left by 2 places becomes +++++++++ 76543210 +++++++++ 00010000 = 0x10 hexadecimal or 16 decimal or 10000 in binary +++++++++ Shift Right by 1 places becomes +++++++++ 76543210 +++++++++ 00001000 = 0x8 hexadecimal or 8 decimal or 1000 in binary +++++++++ Then it is a matter of combining the bitwise operations according to the truth table above... 


I would just expand DeMorgan's law: 

