eolas/Logic/Proofs/Biconditional_Introduction.md

---
categories:
  - Logic
tags: [derivation-rules]
---

# Biconditional introduction

The biconditional means if $P$ is the case, $Q$ must be the case and if $Q$ is the case, $P$ must be the case. Thus to introduce this operator we must demonstrate both that $Q$ follows from $P$ and that $P$ follows from $Q$. We do this via two sub-proofs.

![](/img/bi-intro.png)
Initial commit, pure MD 2022-04-23 13:26:53 +01:00			`---`
Last Sync: 2022-08-20 12:30:04 2022-08-20 12:30:04 +01:00			`categories:`
Autosave: 2022-12-25 15:00:05 2022-12-25 15:00:05 +00:00			`- Logic`
			`tags: [derivation-rules]`
Initial commit, pure MD 2022-04-23 13:26:53 +01:00			`---`
Reindexing 2022-09-06 13:26:44 +01:00
Autosave: 2022-12-25 15:00:05 2022-12-25 15:00:05 +00:00			`# Biconditional introduction`
Initial commit, pure MD 2022-04-23 13:26:53 +01:00
Autosave: 2022-12-25 15:00:05 2022-12-25 15:00:05 +00:00			`The biconditional means if $P$ is the case, $Q$ must be the case and if $Q$ is the case, $P$ must be the case. Thus to introduce this operator we must demonstrate both that $Q$ follows from $P$ and that $P$ follows from $Q$. We do this via two sub-proofs.`

			`![](/img/bi-intro.png)`