# Well-formed formula

In mathematical logic, propositional logic and predicate logic, a **well-formed formula**, abbreviated **WFF** or **wff**, often simply **formula**, is a finite sequence of symbols from a given alphabet that is part of a formal language.^{[1]} A formal language can be identified with the set of formulas in the language.

A formula is a syntactic object that can be given a semantic meaning by means of an interpretation. Two key uses of formulas are in propositional logic and predicate logic.

A key use of formulas is in propositional logic and predicate logic such as first-order logic. In those contexts, a formula is a string of symbols φ for which it makes sense to ask "is φ true?", once any free variables in φ have been instantiated. In formal logic, proofs can be represented by sequences of formulas with certain properties, and the final formula in the sequence is what is proven.

Although the term "formula" may be used for written marks (for instance, on a piece of paper or chalkboard), it is more precisely understood as the sequence of symbols being expressed, with the marks being a token instance of formula. Thus the same formula may be written more than once, and a formula might in principle be so long that it cannot be written at all within the physical universe.

Formulas themselves are syntactic objects. They are given meanings by interpretations. For example, in a propositional formula, each propositional variable may be interpreted as a concrete proposition, so that the overall formula expresses a relationship between these propositions. A formula need not be interpreted, however, to be considered solely as a formula.

This definition can also be written as a formal grammar in Backus–Naur form, provided the set of variables is finite:

is a formula, because it is grammatically correct. The sequence of symbols

A complex formula may be difficult to read, owing to, for example, the proliferation of parentheses. To alleviate this last phenomenon, precedence rules (akin to the standard mathematical order of operations) are assumed among the operators, making some operators more binding than others. For example, assuming the precedence (from most binding to least binding) 1. ¬ 2. → 3. ∧ 4. ∨. Then the formula

This is, however, only a convention used to simplify the written representation of a formula. If the precedence was assumed, for example, to be left-right associative, in following order: 1. ¬ 2. ∧ 3. ∨ 4. →, then the same formula above (without parentheses) would be rewritten as

The definition of a formula comes in several parts. First, the set of **terms** is defined recursively. Terms, informally, are expressions that represent objects from the domain of discourse.

Finally, the set of formulas is defined to be the smallest set containing the set of atomic formulas such that the following holds:

An *atomic formula* is a formula that contains no logical connectives nor quantifiers, or equivalently a formula that has no strict subformulas.
The precise form of atomic formulas depends on the formal system under consideration; for propositional logic, for example, the atomic formulas are the propositional variables. For predicate logic, the atoms are predicate symbols together with their arguments, each argument being a term.

According to some terminology, an *open formula* is formed by combining atomic formulas using only logical connectives, to the exclusion of quantifiers.^{[3]} This is not to be confused with a formula which is not closed.

In earlier works on mathematical logic (e.g. by Church^{[4]}), formulas referred to any strings of symbols and among these strings, well-formed formulas were the strings that followed the formation rules of (correct) formulas.

Several authors simply say formula.^{[5]}^{[6]}^{[7]}^{[8]} Modern usages (especially in the context of computer science with mathematical software such as model checkers, automated theorem provers, interactive theorem provers) tend to retain of the notion of formula only the algebraic concept and to leave the question of well-formedness, i.e. of the concrete string representation of formulas (using this or that symbol for connectives and quantifiers, using this or that parenthesizing convention, using Polish or infix notation, etc.) as a mere notational problem.

While the expression *well-formed formula* is still in use,^{[9]}^{[10]}^{[11]} these authors do not necessarily^{[weasel words]} use it in contradistinction to the old sense of *formula*, which is no longer common in mathematical logic.^{[citation needed]}

The expression "well-formed formulas" (WFF) also crept into popular culture. *WFF* is part of an esoteric pun used in the name of the academic game "WFF 'N PROOF: The Game of Modern Logic," by Layman Allen,^{[12]} developed while he was at Yale Law School (he was later a professor at the University of Michigan). The suite of games is designed to teach the principles of symbolic logic to children (in Polish notation).^{[13]} Its name is an echo of *whiffenpoof*, a nonsense word used as a cheer at Yale University made popular in *The Whiffenpoof Song* and The Whiffenpoofs.^{[14]}