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complex
Create a complex number.
Calling Sequence
c=complex(a) c=complex(a,b)
Arguments
- a
a 1-by-1 or a n-by-m real matrix of doubles, the real part. If
ahas an imaginary part, an error is generated.- b
a 1-by-1 or a n-by-m real matrix of doubles, the imaginary part (default b=0). If
bhas an imaginary part, an error is generated.- c
a n-by-m complex matrix of doubles, the complex number.
Description
c=complex(a) creates a complex number from its real part a
and zero as the imaginary part.
c=complex(a,b) creates a complex number from its real part a
and imaginary part b.
This function is a substitute for expressions such as a+%i*b,
especially in cases where the complex arithmetic interferes with particular
floating point numbers such as %inf or
%nan.
Examples
In the following example, we create a complex number from its real and imaginary parts.
complex(1,2) complex([1 2],[3 4])
If a only is specified, then the imaginary
part is set to zero.
complex([1 2 3])
If a is a scalar and b
is a matrix, then the result c has the same
size as b.
Similarily, if b is a scalar and a
is a matrix, then the result c has the same
size as a.
c = complex([1 2 3], 4) c = complex(1, [2 3 4])
If a and b are two
matrices with different sizes, an error is generated, as in the
following session.
-->complex(ones(2,3),ones(4,5))
!--error 10000
complex: Incompatible input arguments #1 and #2: Same sizes expected.
at line 33 of function complex called by :
complex(ones(2,3),ones(4,5))
The purpose of the complex function is to manage
IEEE floating point numbers such as Nans or Infinities.
In the following example, we show that creating a complex number where
the real and imaginary parts are complex is not straightforward if
we use the complex arithmetic.
This is because the product %i times %inf
is evaluated as (0+%i) * (%inf+%i*0).
This produces the intermediate expression 0*%inf,
which is %nan.
-->%inf+%i*%inf
ans =
Nan + Inf
The solution of this issue is to use the complex
function.
-->complex(%inf,%inf)
ans =
Inf + Inf
See Also
- imult — multiplicação pela parte imaginária i
Authors
INRIA - Farid Belahcene
2011 - DIGITEO - Michael Baudin
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