# (A XOR B) XOR C gate using ONLY 2 inputs XOR

I have the following truth table, which seems to correspond (A XOR B) XOR C, i can be wrong because it's been a long time I didn't do this kind of thing.

Truth table :

A | B | C | Output

1 | 0 | 0 | 1

0 | 1 | 0 | 1

0 | 0 | 1 | 1

1 | 1 | 0 | 0

0 | 1 | 1 | 0

1 | 0 | 1 | 0

1 | 1 | 1 | 1

The logic gate corresponding to the previous truth table done using only 2 inputs XOR needs at least 5 XOR, 6 XOR, 7 XOR, 8 XOR or is it impossible ?

Another question, i learned today that there will be logical gates, two's complement, this kind of things on the competitive exam I take in 2 days (too long MCQ foe 2h). Do someone know which basics should i learn relearn ? Maybe karnaugh diagram ? that's one of the only thing I remember by name, there's probably easier thing I should check first ?

Ty in advance guys

• All of ‘and’, ‘or’ and ‘xor’ gates can have 2 or more inputs. (btw your table is missing the first ‘0 0 0’ row) – quamrana Apr 15 at 18:25
• Your question is about digital logic. Maybe it fits best here: electronics.stackexchange.com/questions/tagged/digital-logic – 1010 Apr 15 at 18:36
• Y but the answer is about using only 2 inputs XOR (if it's possible).The line with '0 0 0' was missing on the statement, idk if i was wilful, maybe just an omission – Noir_Lacté Apr 15 at 18:47
• your xor operators map directly to 2 input xor gates, if that's what you are asking. – 1010 Apr 15 at 20:38