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It is easy to define a matrix of values in Octave. The size of the matrix is determined automatically, so it is not necessary to explicitly state the dimensions. The expression
a = [1, 2; 3, 4]
results in the matrix
/ \ | 1 2 | a = | | | 3 4 | \ /
Elements of a matrix may be arbitrary expressions, provided that the dimensions all make sense when combining the various pieces. For example, given the above matrix, the expression
[ a, a ]
produces the matrix
ans = 1 2 1 2 3 4 3 4
but the expression
[ a, 1 ]
produces the error
error: number of rows must match (1 != 2) near line 13, column 6
(assuming that this expression was entered as the first thing on line 13, of course).
Inside the square brackets that delimit a matrix expression, Octave looks at the surrounding context to determine whether spaces and newline characters should be converted into element and row separators, or simply ignored, so an expression like
a = [ 1 2 3 4 ]
will work. However, some possible sources of confusion remain. For example, in the expression
[ 1 - 1 ]
the ‘-’ is treated as a binary operator and the result is the scalar 0, but in the expression
[ 1 -1 ]
the ‘-’ is treated as a unary operator and the result is the
vector [ 1, -1 ]
. Similarly, the expression
[ sin (pi) ]
will be parsed as
[ sin, (pi) ]
and will result in an error since the sin
function will be
called with no arguments. To get around this, you must omit the space
between sin
and the opening parenthesis, or enclose the
expression in a set of parentheses:
[ (sin (pi)) ]
Whitespace surrounding the single quote character (‘'’, used as a
transpose operator and for delimiting character strings) can also cause
confusion. Given a = 1
, the expression
[ 1 a' ]
results in the single quote character being treated as a
transpose operator and the result is the vector [ 1, 1 ]
, but the
expression
[ 1 a ' ]
produces the error message
parse error: syntax error >>> [ 1 a ' ] ^
because not doing so would cause trouble when parsing the valid expression
[ a 'foo' ]
For clarity, it is probably best to always use commas and semicolons to separate matrix elements and rows.
The maximum number of elements in a matrix is fixed when Octave is compiled.
The allowable number can be queried with the function sizemax
. Note
that other factors, such as the amount of memory available on your machine,
may limit the maximum size of matrices to something smaller.
Return the largest value allowed for the size of an array.
If Octave is compiled with 64-bit indexing, the result is of class int64,
otherwise it is of class int32. The maximum array size is slightly
smaller than the maximum value allowable for the relevant class as reported
by intmax
.
See also: intmax.
When you type a matrix or the name of a variable whose value is a matrix, Octave responds by printing the matrix in with neatly aligned rows and columns. If the rows of the matrix are too large to fit on the screen, Octave splits the matrix and displays a header before each section to indicate which columns are being displayed. You can use the following variables to control the format of the output.
Query or set the internal variable that specifies the minimum number of significant figures to display for numeric output.
Note that regardless of the value set for output_precision
, the
number of digits of precision displayed is limited to 16 for double
precision values and 7 for single precision values.
When called from inside a function with the "local"
option, the
variable is changed locally for the function and any subroutines it calls.
The original variable value is restored when exiting the function.
See also: format, fixed_point_format.
It is possible to achieve a wide range of output styles by using
different values of output_precision
. Reasonable combinations can be
set using the format
function. See Basic Input and Output.
Query or set the internal variable that controls whether rows of a matrix may be split when displayed to a terminal window.
If the rows are split, Octave will display the matrix in a series of smaller pieces, each of which can fit within the limits of your terminal width and each set of rows is labeled so that you can easily see which columns are currently being displayed. For example:
octave:13> rand (2,10) ans = Columns 1 through 6: 0.75883 0.93290 0.40064 0.43818 0.94958 0.16467 0.75697 0.51942 0.40031 0.61784 0.92309 0.40201 Columns 7 through 10: 0.90174 0.11854 0.72313 0.73326 0.44672 0.94303 0.56564 0.82150
When called from inside a function with the "local"
option, the
variable is changed locally for the function and any subroutines it calls.
The original variable value is restored when exiting the function.
See also: format.
Octave automatically switches to scientific notation when values become
very large or very small. This guarantees that you will see several
significant figures for every value in a matrix. If you would prefer to
see all values in a matrix printed in a fixed point format, you can set
the built-in variable fixed_point_format
to a nonzero value. But
doing so is not recommended, because it can produce output that can
easily be misinterpreted.
Query or set the internal variable that controls whether Octave will use a scaled format to print matrix values.
The scaled format prints a scaling factor on the first line of output chosen such that the largest matrix element can be written with a single leading digit. For example:
fixed_point_format (true) logspace (1, 7, 5)' ans = 1.0e+07 * 0.00000 0.00003 0.00100 0.03162 1.00000
Notice that the first value appears to be 0 when it is actually 1. Because
of the possibility for confusion you should be careful about enabling
fixed_point_format
.
When called from inside a function with the "local"
option, the
variable is changed locally for the function and any subroutines it calls.
The original variable value is restored when exiting the function.
See also: format, output_precision.
• Empty Matrices: |
Next: Ranges, Up: Numeric Data Types [Contents][Index]