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)
Given these values for the boolean variables
Why does the following logical expression evaluate to



Substitute in the values of
Flip the negated values:
Replace the ORed statements (if one side is true, the whole statement is true):
Replace the ANDed statement (if both sides are true, the whole statement is true):



True or False is always True. 


Actually, please tell us what's so confusing; I am slightly confused that you find it confusing at all. 


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. 

