GNU Octave Manual Version 3 by John W. Eaton, David Bateman, Søren Hauberg Paperback (6"x9"), 568 pages ISBN 095461206X RRP £24.95 ($39.95) |
8.2 Calling Functions
A function is a name for a particular calculation. Because it has
a name, you can ask for it by name at any point in the program. For
example, the function sqrt
computes the square root of a number.
A fixed set of functions are built-in, which means they are
available in every Octave program. The sqrt
function is one of
these. In addition, you can define your own functions.
See section 11 Functions and Script Files, for information about how to do this.
The way to use a function is with a function call expression, which consists of the function name followed by a list of arguments in parentheses. The arguments are expressions which give the raw materials for the calculation that the function will do. When there is more than one argument, they are separated by commas. If there are no arguments, you can omit the parentheses, but it is a good idea to include them anyway, to clearly indicate that a function call was intended. Here are some examples:
sqrt (x^2 + y^2) # One argument ones (n, m) # Two arguments rand () # No arguments
Each function expects a particular number of arguments. For example, the
sqrt
function must be called with a single argument, the number
to take the square root of:
sqrt (argument)
Some of the built-in functions take a variable number of arguments, depending on the particular usage, and their behavior is different depending on the number of arguments supplied.
Like every other expression, the function call has a value, which is
computed by the function based on the arguments you give it. In this
example, the value of sqrt (argument)
is the square root of
the argument. A function can also have side effects, such as assigning
the values of certain variables or doing input or output operations.
Unlike most languages, functions in Octave may return multiple values. For example, the following statement
[u, s, v] = svd (a)
computes the singular value decomposition of the matrix a
and
assigns the three result matrices to u
, s
, and v
.
The left side of a multiple assignment expression is itself a list of expressions, and is allowed to be a list of variable names or index expressions. See also section 8.1 Index Expressions, and section 8.6 Assignment Expressions.
ISBN 095461206X | GNU Octave Manual Version 3 | See the print edition |