# Translating “neither…nor” into a mathematical logical expression

Having some difficulty doing translations for complicated neither...nor sentences.

With these characters:

``````~  Negation
V  Disjunction
&  Conjunction
``````

I'm trying to translate and understand, for example:

"Neither John nor Mary are standing in front of either Jim or Cary"

I have been told that a successful translation of "Neither e nor a is to the right of c" is translated as follows: ~(RightOf(e, c) V RightOf(e, c))

What about just doing a translation on: "I like neither chocolate nor vanilla"

~(Like(chocolate) V Like(Vanilla))

Any food for thought would be appreciated.

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It's been a long time since I've studied that. You need to learn de morgan's law and basic boolean algebra identities. These will help you with building technical skills in manipulating complex expressions. Your last expression is correct and you have used de morgan's identity ~L(x)&~L(y) <-> ~(L(x) V L(y)) –  Nickolodeon Mar 5 '11 at 1:41
my poor brain :'( –  Nick Rolando Mar 5 '11 at 1:41
This might be better asked on math.stackexchange.com. My brain hurts just using `and` and `or` :) –  Mike Caron Mar 5 '11 at 1:46
What confuses me the most is: –  KerxPhilo Mar 5 '11 at 1:46
err, sorry i'm new to stackoverflow. I didn't know that the enter key would complete my comment. What confuses me the most is the sentence: "I like neither chocolate nor vanilla" is translated to ~((Like(chocolate) V Like(vanilla)) and the sentence: "Neither e nor a is to the right of c and to the left of b" is translated to ~(RightOf(e, c) & LeftOf(e, b)) & ~(RightOf(a, c) & LeftOf(a, b)). Both sentences use neither...nor, however in the second sentence I see no disjunction, but in the first it exists. –  KerxPhilo Mar 5 '11 at 1:49