[00Q] A formula is well formed if it meets all the rules in the list in [00G] and this additional rule: βgiven a well-formed formula \(π\) where the variable \(x\) is free, a formula of the form β\(β x, π\)β, or β\(β x, π\)β is a well-formed formula.β
We will say that a variable \(x\) is free in a well-formed formula if
the formula is atomic and the variable \(x\) appears in it; or if
the formula is of the form \(Β¬ πΌ\) and the variable \(x\) is free in \(πΌ\); or even if
the formula is of the form \(πΌβ§π½, πΌβ¨π½,πΌβ π½, πΌ\iff π½\) (or other logical connective introduced later) and the variable \(x\) is free in \(πΌ\) or \(π½\).
So in the formulas \((β x, π)\) or \((β x, π)\), the variable \(x\) is no longer free; we will say that βthe variable is quantifiedβ.