Difference between revisions of "Manuals/calci/MAKECOMPLEXIPLUS"

Revision as of 04:23, 28 April 2017

MAKECOMPLEXIPLUS(real,imaginary,suffix)

MAKECOMPLEXIPLUS function converts the imaginary coefficient of a complex number into 'positive' coefficient.
A complex number is a combination of a real and an imaginary number.
A number which is positive or negative, rational or irrational or decimals are called real numbers.
An Imaginary number is a number that when squring it gives a negative result.
For e.g. ${-4}^{2}=16$ . Because a negative times a negative is positive.
A complex number is a number is in the form $z=a+bi$ , where $a$ and $b$ are real numbers and $i$ is the imaginary unit. Where $i={\sqrt {-1}}$
To mention $i$ and $j$ , we must use the lower case only
In a complex number $z$ real part is denoted by $Re(z)$ & imaginary part is denoted by $Im(z)$ .
MAKECOMPLEXIPLUS returns the error value, when $real$ and $imaginary$ are non-numeric.
$Suffix$ should be either $i$ or $j$ , otherwise it shows error value.
A Complex number whose real part is zero is said to be purely imaginary.
A Complex number whose imaginary part is zero is a real number. In that cases we have to assign '0' for that part.

The syntax is to calculate MAKECOMPLEXIPLUS in ZOS is $MAKECOMPLEXIPLUS(REAL,IMAGINARY,SUFFIX)$
$REAL$ is the real part.
$IMAGINARY$ is the imaginary part.
$SUFFIX$ is imaginary unit which is either "i" or "j".

=MAKECOMPLEXIPLUS(4,-5) = 4-i5
=MAKECOMPLEXIPLUS(4,5) = 4+i5
=MAKECOMPLEXIPLUS(1,-10,"j") = 1-j10
=MAKECOMPLEXIPLUS(1,0) = 1+i0
=MAKECOMPLEXIPLUS(1..3,-5) = 1-i5 ; 2-i5; 3-i5

@@ Line 31: / Line 31: @@
 ==Examples==
-#=MAKECOMPLEXIPLUS(4,-5) = 4+i5
+#=MAKECOMPLEXIPLUS(4,-5) = 4-i5
 #=MAKECOMPLEXIPLUS(4,5) = 4+i5
-#=MAKECOMPLEXIPLUS(1,-10,"j") = 1+j10
+#=MAKECOMPLEXIPLUS(1,-10,"j") = 1-j10
 #=MAKECOMPLEXIPLUS(1,0) = 1+i0
-#=MAKECOMPLEXIPLUS(1..3,-5) = 1+i5 ; 2+i5; 3+i5
+#=MAKECOMPLEXIPLUS(1..3,-5) = 1-i5 ; 2-i5; 3-i5
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