Truth Table Completion | Worksheet 4/10 - Beginner-Intermediate ste...

Question 1

Complete the truth table for the expression: ¬p ∨ (q ∧ r) What is the truth value when p=T, q=T, r=F?

Step 1: Break down the expression
Expression: ¬p ∨ (q ∧ r)
Given: p=T, q=T, r=F

Step 2: Evaluate inner expressions first
¬p = F
q ∧ r = T ∧ F = F

Step 3: Evaluate outer expression
F ∨ F = False
Remember: OR is True when at least one operand is True

Question 2

Complete the truth table for the expression: ¬p ∨ (q ∧ r) What is the truth value when p=T, q=F, r=F?

Step 1: Break down the expression
Expression: ¬p ∨ (q ∧ r)
Given: p=T, q=F, r=F

Step 2: Evaluate inner expressions first
¬p = F
q ∧ r = F ∧ F = F

Step 3: Evaluate outer expression
F ∨ F = False
Remember: OR is True when at least one operand is True

Question 3

Complete the truth table for the expression: p → (q ∨ r) What is the truth value when p=T, q=T, r=F?

Step 1: Break down the expression
Expression: p → (q ∨ r)
Given: p=T, q=T, r=F

Step 2: Evaluate inner expressions first
q ∨ r = T ∨ F = T

Step 3: Evaluate outer expression
p → (T) = T → T = True
Remember: Implication is False only when p is True and consequent is False

Question 4

Complete the truth table for the expression: (p ↔ q) ∧ r What is the truth value when p=T, q=T, r=F?

Step 1: Break down the expression
Expression: (p ↔ q) ∧ r
Given: p=T, q=T, r=F

Step 2: Evaluate inner expressions first
p ↔ q = T ↔ T = T
(Biconditional is True when both have same value)

Step 3: Evaluate outer expression
T ∧ F = False
Remember: AND is True only when both operands are True

Question 5

Complete the truth table for the expression: ¬p ∨ (q ∧ r) What is the truth value when p=T, q=T, r=F?

Step 1: Break down the expression
Expression: ¬p ∨ (q ∧ r)
Given: p=T, q=T, r=F

Step 2: Evaluate inner expressions first
¬p = F
q ∧ r = T ∧ F = F

Step 3: Evaluate outer expression
F ∨ F = False
Remember: OR is True when at least one operand is True

Question 6

Complete the truth table for the expression: ¬p ∨ (q ∧ r) What is the truth value when p=F, q=T, r=T?

Step 1: Break down the expression
Expression: ¬p ∨ (q ∧ r)
Given: p=F, q=T, r=T

Step 2: Evaluate inner expressions first
¬p = T
q ∧ r = T ∧ T = T

Step 3: Evaluate outer expression
T ∨ T = True
Remember: OR is True when at least one operand is True

Question 7

Complete the truth table for the expression: (p ↔ q) ∧ r What is the truth value when p=T, q=F, r=F?

Step 1: Break down the expression
Expression: (p ↔ q) ∧ r
Given: p=T, q=F, r=F

Step 2: Evaluate inner expressions first
p ↔ q = T ↔ F = F
(Biconditional is True when both have same value)

Step 3: Evaluate outer expression
F ∧ F = False
Remember: AND is True only when both operands are True

Question 8

Complete the truth table for the expression: ¬p ∨ (q ∧ r) What is the truth value when p=T, q=F, r=F?

Step 1: Break down the expression
Expression: ¬p ∨ (q ∧ r)
Given: p=T, q=F, r=F

Step 2: Evaluate inner expressions first
¬p = F
q ∧ r = F ∧ F = F

Step 3: Evaluate outer expression
F ∨ F = False
Remember: OR is True when at least one operand is True

Question 9

Complete the truth table for the expression: (p ∧ q) → r What is the truth value when p=T, q=F, r=F?

Step 1: Break down the expression
Expression: (p ∧ q) → r
Given: p=T, q=F, r=F

Step 2: Evaluate inner expressions first
p ∧ q = T ∧ F = F

Step 3: Evaluate outer expression
(F) → F = True
Remember: Implication is False only when antecedent is True and consequent is False

Question 10

Complete the truth table for the expression: ¬p ∨ (q ∧ r) What is the truth value when p=F, q=T, r=F?

Step 1: Break down the expression
Expression: ¬p ∨ (q ∧ r)
Given: p=F, q=T, r=F

Step 2: Evaluate inner expressions first
¬p = T
q ∧ r = T ∧ F = F

Step 3: Evaluate outer expression
T ∨ F = True
Remember: OR is True when at least one operand is True

Question 11

Complete the truth table for the expression: ¬p ∨ (q ∧ r) What is the truth value when p=F, q=F, r=F?

Step 1: Break down the expression
Expression: ¬p ∨ (q ∧ r)
Given: p=F, q=F, r=F

Step 2: Evaluate inner expressions first
¬p = T
q ∧ r = F ∧ F = F

Step 3: Evaluate outer expression
T ∨ F = True
Remember: OR is True when at least one operand is True

Question 12

Complete the truth table for the expression: (p ∧ q) → r What is the truth value when p=T, q=F, r=T?

Step 1: Break down the expression
Expression: (p ∧ q) → r
Given: p=T, q=F, r=T

Step 2: Evaluate inner expressions first
p ∧ q = T ∧ F = F

Step 3: Evaluate outer expression
(F) → T = True
Remember: Implication is False only when antecedent is True and consequent is False

Question 13

Complete the truth table for the expression: (p ↔ q) ∧ r What is the truth value when p=T, q=F, r=F?

Step 1: Break down the expression
Expression: (p ↔ q) ∧ r
Given: p=T, q=F, r=F

Step 2: Evaluate inner expressions first
p ↔ q = T ↔ F = F
(Biconditional is True when both have same value)

Step 3: Evaluate outer expression
F ∧ F = False
Remember: AND is True only when both operands are True

Question 14

Complete the truth table for the expression: (p ↔ q) ∧ r What is the truth value when p=T, q=T, r=F?

Step 1: Break down the expression
Expression: (p ↔ q) ∧ r
Given: p=T, q=T, r=F

Step 2: Evaluate inner expressions first
p ↔ q = T ↔ T = T
(Biconditional is True when both have same value)

Step 3: Evaluate outer expression
T ∧ F = False
Remember: AND is True only when both operands are True

Question 15

Complete the truth table for the expression: (p ∧ q) → r What is the truth value when p=F, q=F, r=F?

Step 1: Break down the expression
Expression: (p ∧ q) → r
Given: p=F, q=F, r=F

Step 2: Evaluate inner expressions first
p ∧ q = F ∧ F = F

Step 3: Evaluate outer expression
(F) → F = True
Remember: Implication is False only when antecedent is True and consequent is False

Question 16

Complete the truth table for the expression: (p ∧ q) → r What is the truth value when p=F, q=F, r=F?

Step 1: Break down the expression
Expression: (p ∧ q) → r
Given: p=F, q=F, r=F

Step 2: Evaluate inner expressions first
p ∧ q = F ∧ F = F

Step 3: Evaluate outer expression
(F) → F = True
Remember: Implication is False only when antecedent is True and consequent is False

Question 17

Complete the truth table for the expression: ¬p ∨ (q ∧ r) What is the truth value when p=F, q=T, r=F?

Step 1: Break down the expression
Expression: ¬p ∨ (q ∧ r)
Given: p=F, q=T, r=F

Step 2: Evaluate inner expressions first
¬p = T
q ∧ r = T ∧ F = F

Step 3: Evaluate outer expression
T ∨ F = True
Remember: OR is True when at least one operand is True

Question 18

Complete the truth table for the expression: (p ↔ q) ∧ r What is the truth value when p=F, q=T, r=T?

Step 1: Break down the expression
Expression: (p ↔ q) ∧ r
Given: p=F, q=T, r=T

Step 2: Evaluate inner expressions first
p ↔ q = F ↔ T = F
(Biconditional is True when both have same value)

Step 3: Evaluate outer expression
F ∧ T = False
Remember: AND is True only when both operands are True

Question 19

Complete the truth table for the expression: ¬p ∨ (q ∧ r) What is the truth value when p=T, q=F, r=F?

Step 1: Break down the expression
Expression: ¬p ∨ (q ∧ r)
Given: p=T, q=F, r=F

Step 2: Evaluate inner expressions first
¬p = F
q ∧ r = F ∧ F = F

Step 3: Evaluate outer expression
F ∨ F = False
Remember: OR is True when at least one operand is True

Question 20

Complete the truth table for the expression: (p ↔ q) ∧ r What is the truth value when p=T, q=F, r=F?

Step 1: Break down the expression
Expression: (p ↔ q) ∧ r
Given: p=T, q=F, r=F

Step 2: Evaluate inner expressions first
p ↔ q = T ↔ F = F
(Biconditional is True when both have same value)

Step 3: Evaluate outer expression
F ∧ F = False
Remember: AND is True only when both operands are True

Truth Table Completion Beginner-Intermediate Worksheet: Focus on common variations practice Truth Table Completion BEGINNER INTERMEDIATE

What you'll learn in this worksheet:

Question 1

Question 2

Question 3

Question 4

Question 5

Question 6

Question 7

Question 8

Question 9

Question 10

Question 11

Question 12

Question 13

Question 14

Question 15

Question 16

Question 17

Question 18

Question 19

Question 20