Difference between revisions of "Manuals/calci/IMDIV"

Revision as of 06:51, 25 November 2013

IMDIV(z1,z2)

$z1$ and $z2$ are complex numbers.

Description

This function gives the division of two complex numbers.
This function used to remove the $i$ (imaginary unit) from the denominator.
$z1,z2$ are the two complex numbers in the form of $z1=a+ib$ and $z2=c+id$ , where $a,b,c$ & $d$ are real numbers $i$ is the imaginary unit, $i={\sqrt {-1}}$ .
To do the division of complex number we have follow the steps:

step 1: We have to write the complex number is in the fraction form.
step 2: To find the conjugate of the denominator.
step 3: To mutiply the numerator and denominator with conjugate.

i.e. $IMDIV(z1,z2)={\frac {a+ib}{c+id}}={\frac {a+ib}{c+id}}*{\frac {c-id}{c-id}}={\frac {ac+bd}{c^{2}+d^{2}}}+{\frac {(bc-ad)i}{(c^{2}+d^{2})}}$

Examples

IMDIV("4+2i","3-i") = ${\frac {4+2i}{3-i}}*{\frac {3+i}{3+i}}$ = ${\frac {12+10i+2i^{2}}{3^{2}-i^{2}}}=10+{\frac {10i}{10}}$ (because $i^{2}=-1$ ) = $1+{\frac {i}{1}}=1+i$
IMDIV("3-5i,2-6i") = 0.9+0.2i
IMDIV("5","2+3i") = 0.769-1.153i
IMDIV("1+i","2") = 0.5+0.5i

References

Exponential function

@@ Line 13: / Line 13: @@
 ==Examples==
 #IMDIV("4+2i","3-i") =<math>\frac{4+2i}{3-i}*\frac{3+i}{3+i}</math> = <math>\frac{12+10i+2i^2}{3^2-i^2} = 10+\frac{10i}{10}</math> (because <math>i^2=-1</math>) = <math> 1+\frac{i}{1} = 1+i </math>
-#IMDIV("3-5i,2-6i")=0.9+0.2i
+#IMDIV("3-5i,2-6i") = 0.9+0.2i
-#IMDIV("5","2+3i")=0.769-1.153i
+#IMDIV("5","2+3i") = 0.769-1.153i
-#IMDIV("1+i","2")=0.5+0.5i
+#IMDIV("1+i","2") = 0.5+0.5i
 ==See Also==

Difference between revisions of "Manuals/calci/IMDIV"

Revision as of 06:51, 25 November 2013

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Description

Examples

See Also

References

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