Polish notation: Difference between revisions
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In [[mathematics]] and [[computer science]], '''Polish notation''' is a way of expressing arithmetic or algebraic formulae which is unambiguous without the use of parentheses. | In [[mathematics]] and [[computer science]], '''Polish notation''' is a way of expressing arithmetic or algebraic formulae which is unambiguous without the use of parentheses. | ||
In ordinary "algebraic" or "infix" notation a [[binary operator]] such as × or + is written between the two operands, and an expression such as ''a'' × ''b'' + ''c'' is then ambiguous. | In ordinary "algebraic" or "infix" notation a [[binary operator]] such as × or + is written between the two operands, and an expression such as ''a'' × ''b'' + ''c'' is then ambiguous. One solution to this difficulty is to use a convention for ''priority'' or ''[[operator precedence|precedence]]'', for example that multiplication precedes addition and then use brackets to show that the usual priority is not to be used (one such convention is "[[BODMAS]]"). Hence | ||
:<math>(a \times b) + c = a \times b + c \neq a \times (b + c) . \, </math> | :<math>(a \times b) + c = a \times b + c \neq a \times (b + c) . \, </math> | ||
In | In ''prefix notation'' the operator precedes its two operands: the operand may be a term or another expression. So | ||
:<math>{+}{\times} a b c = {+} ({\times a b}) c = {+} (a \times b) c = (a \times b) + c \,;</math> | :<math>{+}{\times} a b c = {+} ({\times a b}) c = {+} (a \times b) c = (a \times b) + c \,;</math> | ||
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Here brackets have been inserted to show the order in which the operations are performed, but are not part of or necessary for the notation. | Here brackets have been inserted to show the order in which the operations are performed, but are not part of or necessary for the notation. | ||
In ''reverse'' | In ''postifx'' or ''reverse Polish'' notation the operator follows its two operands. | ||
:<math>a b {\times} c {+} = (a \times b) + c \,;</math> | :<math>a b {\times} c {+} = (a \times b) + c \,;</math> | ||
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Expressions in reverse Polish notation are particularly well adapted to evaluation on a [[stack]]. | Expressions in reverse Polish notation are particularly well adapted to evaluation on a [[stack]]. | ||
The name "Polish notation" refers to the nationality of its inventor, [[Jan Łukasiewicz]] (1878-1956). | |||
==Applications== | |||
Practical applications of Polish notations involve avoiding the need, and possible overhead, of parenthesizing to disambiguate the order of operations. | |||
===Calculators=== | |||
Hewlett-Packard scientific calculators traditionally use reverse Polish notation (RPN), while most other vendors used parenthesized algebraic notation. The human interface to a calculator does not necessarily show the expression being entered, so the human elegance of a parenthesized expression may not be available. Unquestionably, the learning curve for an RPN calculator is greater, but it allows fewer keystrokes. | |||
===Programming languages=== | |||
Various programming languages, often for resource constrained environments, such as [[FORTH]], expect the original program to be written in a Polish notation. Other languages may not require Polish entry, but convert the program into an internal Polish form that efficiently runs on an [[interpreter]].[[Category:Suggestion Bot Tag]] |
Latest revision as of 11:01, 5 October 2024
In mathematics and computer science, Polish notation is a way of expressing arithmetic or algebraic formulae which is unambiguous without the use of parentheses.
In ordinary "algebraic" or "infix" notation a binary operator such as × or + is written between the two operands, and an expression such as a × b + c is then ambiguous. One solution to this difficulty is to use a convention for priority or precedence, for example that multiplication precedes addition and then use brackets to show that the usual priority is not to be used (one such convention is "BODMAS"). Hence
In prefix notation the operator precedes its two operands: the operand may be a term or another expression. So
Here brackets have been inserted to show the order in which the operations are performed, but are not part of or necessary for the notation.
In postifx or reverse Polish notation the operator follows its two operands.
Expressions in reverse Polish notation are particularly well adapted to evaluation on a stack.
The name "Polish notation" refers to the nationality of its inventor, Jan Łukasiewicz (1878-1956).
Applications
Practical applications of Polish notations involve avoiding the need, and possible overhead, of parenthesizing to disambiguate the order of operations.
Calculators
Hewlett-Packard scientific calculators traditionally use reverse Polish notation (RPN), while most other vendors used parenthesized algebraic notation. The human interface to a calculator does not necessarily show the expression being entered, so the human elegance of a parenthesized expression may not be available. Unquestionably, the learning curve for an RPN calculator is greater, but it allows fewer keystrokes.
Programming languages
Various programming languages, often for resource constrained environments, such as FORTH, expect the original program to be written in a Polish notation. Other languages may not require Polish entry, but convert the program into an internal Polish form that efficiently runs on an interpreter.