3.2 MGF1106
Given the number of rows in the truth for the compound statement
(~n^q) The number of rows in the truth table is 4
Let p represent a false statement and let q represent a true statement. Find the truth value of the following statement ~(~p^(q^~p)]
False
Let p represent a false statement, and let q and r represent true statements. Find the truth value of the given compound statement
False
Let p represent a false statement, and let q represent a true statement. Find the truth value of the given compound statement
False
Let p represent a true statement, and let q represent a true statement. Find the truth value of the following statement ~(pv~q)
False
Let p represent a true statement, and let q represent a true statement. Find the truth value of the given compound statement ~pv~q
False
The disjunction pVq is false only if
P is false and q is false
Construct a truth table for the given compound statement ~p^q
P q ~p^q T T F T F F F T T F F F
If pv(q^~q) is true, what must be the truth value of p?
True
If q is true, what must be the truth value of (pvq) v q?
True
Let p represent a false statement and let q represent a true statement. Find the truth value of the given compound statement
True
Let p represent a false statement and let q represent a true statement. Find the truth value of the given compound statement, pvq
True
Let q represent a true statement. Let p represent a false statement, and let s represent a false statement. Find the truth value of the following statement.
~[(q^~p) ^s]
Let s represent a false statement, Let p represent a true statement and let q represent a true statement. Find the truth value of the following statement
~[~q^(~svp)]
Let p represent a true statement, let q represent a false statement, and let r represent a false statement. Find the truth value of the given compound sentence
The compound statement p^(qvr) is false
Let p represent a true statement. Let q represent a true statement, and let r represent a false statement. Find the truth value of the given compound statement.
The compound statement ~(p^q)^(r^~q) is false
(p^~Q)v~p
p q (p^q)v~p T T T F F T F F
(pv~Q) ^ (pvq)
p q (pv~q)^(pvq) T T T T F T F T F F F F
p^~q
p q p^~q T T F T F T F T F F F F
