Pseudocode is a compact and informal highlevel description of a computer programming algorithm that uses the structural conventions of a programming language, but is intended for human reading rather than machine reading. Pseudocode typically omits details that are not essential for human understanding of the algorithm, such as variable declarations, systemspecific code and subroutines. The programming language is augmented with natural language descriptions of the details, where convenient, or with compact mathematical notation. The purpose of using pseudocode is that it is easier for humans to understand than conventional programming language code, and that it is a compact and environmentindependent description of the key principles of an algorithm. It is commonly used in textbooks and scientific publications that are documenting various algorithms, and also in planning of computer program development, for sketching out the structure of the program before the actual coding takes place.
No standard for pseudocode syntax exists, as a program in pseudocode is not an executable program. Pseudocode resembles, but should not be confused with, skeleton programs including dummy code, which can be compiled without errors. Flowcharts can be thought of as a graphical alternative to pseudocode.
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Textbooks and scientific publications related to computer science and numerical computation often use pseudocode in description of algorithms, so that all programmers can understand them, even if they do not all know the same programming languages. In textbooks, there is usually an accompanying introduction explaining the particular conventions in use. The level of detail of such languages may in some cases approach that of formalized generalpurpose languages — for example, Knuth's seminal textbook The Art of Computer Programming describes algorithms in a fullyspecified assembly language for a nonexistent microprocessor.
A programmer who needs to implement a specific algorithm, especially an unfamiliar one, will often start with a pseudocode description, and then simply "translate" that description into the target programming language and modify it to interact correctly with the rest of the program. Programmers may also start a project by sketching out the code in pseudocode on paper before writing it in its actual language, as a topdown structuring approach.
As the name suggests, pseudocode generally does not actually obey the syntax rules of any particular language; there is no systematic standard form, although any particular writer will generally borrow style and syntax for example control structures from some conventional programming language. Popular syntax sources include Pascal, BASIC, C, C++, Java, Lisp, and ALGOL. Variable declarations are typically omitted. Function calls and blocks of code, for example code contained within a loop, is often replaced by a oneline natural language sentence.
Depending on the writer, pseudocode may therefore vary widely in style, from a nearexact imitation of a real programming language at one extreme, to a description approaching formatted prose at the other.
Pascal style pseudocode example:
<variable> = <expression> if <condition> do stuff; else do other stuff; while <condition> do stuff; for <variable> from <first value> to <last value> by <step> do stuff with variable; function <function name>(<arguments>) do stuff with arguments; return something; <function name>(<arguments>) // Function call
For more examples, see articles with example pseudocode.
In numerical computation, pseudocode often consists of mathematical notation, typically from set and matrix theory, mixed with the control structures of a conventional programming language, and perhaps also natural language descriptions. This is a compact and often informal notation that can be understood by a wide range of mathematically trained people, and is frequently used as a way to describe mathematical algorithms. For example, the sum operator (capitalsigma notation) or the product operator (capitalpi notation) may represent a for loop and perhaps a selection structure in one expression:
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Normally nonASCII typesetting is used for the mathematical equations, for example by means of TeX or MathML markup, or proprietary formula editors.
Mathematical style pseudocode is sometimes referred to as pidgin code, for example pidgin ALGOL (the origin of the concept), pidgin Fortran, pidgin BASIC, pidgin Pascal, pidgin C, and pidgin Ada.
Various attempts to bring elements of natural language grammar into computer programming have produced programming languages such as HyperTalk, Lingo, AppleScript, SQL and Inform. In these languages, parentheses and other special characters are replaced by prepositions, resulting in quite talkative code. This may make it easier for a person without knowledge about the language to understand the code and perhaps also to learn the language. However, the similarity to natural language is usually more cosmetic than genuine. The syntax rules are just as strict and formal as in conventional programming, and do not necessarily make development of the programs easier.
An alternative to using mathematical pseudocode (involving set theory notation or matrix operations) for documentation of algorithms is to use a formal mathematical programming language that is a mix of nonASCII mathematical notation and program control structures. Then the code can be parsed and interpreted by a machine.
Several formal specification languages include set theory notation using special characters. Examples are:
Some array programming languages include vectorized expressions and matrix operations as nonASCII formulas, mixed with conventional control structures. Examples are:
Since the usual aim of pseudocode is present a simple form of some algorithm, you could use a language syntax closer to the problem domain. This would make the expression of ideas in the pseudocode simpler to convey in those domains.
Pseudocode (sometimes written as pseudocode) is a form of code that is written for humans, not machines, to read. It is often written to show how an algorithm works.
FOR I FROM 1 TO 100: PRINT I
Prints all the integers from 1 to 100.
SET X = 1 FOR I FROM 1 TO 16: PRINT X SET X = X * 2
This pseudocode outputs powers of two.
define AND(A, B) do if A then return B endif return 0 end define
The above pseudocode sample computes a logical and function.
