# Confusing Boolean Expression

Given these values for the boolean variables `x`, `y`, and `z`:

``````x = true
y = false
z = true
``````

Why does the following logical expression evaluate to `true`?

``````(x || !y) && (!x || z)
``````
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(true||true) && (false || true) is true So where do you have the problem ? –  abhiasawa Jan 26 '12 at 3:19
Should this be tagged as homework? –  David Hoerster Jan 26 '12 at 3:20
@DavidHoerster I don't think this is a homework problem. Even professors wouldn't give such simple problems :P –  abhiasawa Jan 26 '12 at 3:21

X is true in the first grouping causing the first grouping to be true. Z is true in the second grouping causing the second grouping to be true. Therefore group 1 and group 2 are true.

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True or False is always True. `true || false` True and True is always True. `true && true`

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Substitute in the values of `x`, `y`, and `z`:

``````(true || !false) && (!true || true)
``````

Flip the negated values:

``````(true || true) && (false || true)
``````

Replace the ORed statements (if one side is true, the whole statement is true):

``````true && true
``````

Replace the ANDed statement (if both sides are true, the whole statement is true):

``````true
``````
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``````(x || !y) && (!x || z)