eolas/Logic/DeMorgan's_Laws.md

---
categories:
  - Mathematics
tags: [logic, theorems]
---

DeMorgan's laws express some fundamental equivalences that obtain between the Boolean [connectives](Truth-functional%20connectives.md):

## First Law

> The negation of a conjunction is logically equivalent to the disjunction of the negations of the original conjuncts.

$$
\sim (P \& Q) \equiv \sim P \lor \sim Q
$$

The equivalence is demonstrated with the following truth-table

![demorgan-1.png](../img/demorgan-1.png)

## Second Law

> The negation of a disjunction is equivalent to the conjunction of the negation of the original disjuncts.

$$
\sim (P \lor Q) \equiv \sim P & \sim Q
$$

![demorgan-2.png](../img/demorgan-2.png)
Initial commit, pure MD 2022-04-23 13:26:53 +01:00			`---`
Last Sync: 2022-08-20 13:00:04 2022-08-20 13:00:04 +01:00			`categories:`
Reindexing 2022-09-06 13:26:44 +01:00			`- Mathematics`
			`tags: [logic, theorems]`
Initial commit, pure MD 2022-04-23 13:26:53 +01:00			`---`

			`DeMorgan's laws express some fundamental equivalences that obtain between the Boolean [connectives](Truth-functional%20connectives.md):`

			`## First Law`

			`> The negation of a conjunction is logically equivalent to the disjunction of the negations of the original conjuncts.`

			`$$`
			`\sim (P \& Q) \equiv \sim P \lor \sim Q`
			`$$`

			`The equivalence is demonstrated with the following truth-table`

			`![demorgan-1.png](../img/demorgan-1.png)`

			`## Second Law`

			`> The negation of a disjunction is equivalent to the conjunction of the negation of the original disjuncts.`

			`$$`
			`\sim (P \lor Q) \equiv \sim P & \sim Q`
			`$$`

			`![demorgan-2.png](../img/demorgan-2.png)`