Proving the Equivalence of p ∧ T and pp ∨ F: Truth Table Analysis

p ∧ T ≡ pp ∨ F ≡ p

To prove that p ∧ T ≡ pp ∨ F ≡ p, we can use truth tables:

First, let’s analyze p ∧ T:

p | T | p ∧ T
–|—|——
T | T | T
F | T | F

We can clearly see that p ∧ T will always result in just p itself

To prove that p ∧ T ≡ pp ∨ F ≡ p, we can use truth tables:

First, let’s analyze p ∧ T:

p | T | p ∧ T
–|—|——
T | T | T
F | T | F

We can clearly see that p ∧ T will always result in just p itself.

Now, let’s analyze pp ∨ F:

p | p | pp ∨ F
–|—|——-
T | T | T
F | F | F

We can clearly see that pp ∨ F will also always result in just p itself.

Therefore, we have proven that p ∧ T ≡ pp ∨ F ≡ p, since in both cases we get the same result: p.

More Answers:

Exploring the Laws of Boolean Algebra: Proving Equations using Associative Law
Proving Equivalence using Truth Tables: p ∧ (q ∨ r ) ≡ (p ∧ q) ∨ (p ∧ r ), and p ∨ (q ∧ r ) ≡ (p ∨ q) ∧ (p ∨ r )
Equivalence Proof: Simplifying p ∧ (p ∨ q) ≡ p

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