Difference between revisions of "Manuals/calci/IMDIV"

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==Examples==
 
==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("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+1i </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") = 0.7692307692307693 + -1.1538461538461537i
 
#IMDIV("1+i","2") = 0.5+0.5i
 
#IMDIV("1+i","2") = 0.5+0.5i
  

Revision as of 23:21, 26 March 2015

IMDIV(ComplexNumber1,ComplexNumber2)


  • and are in the form of a+bi.

Description

  • This function gives the division of two complex numbers.
  • This function used to remove the (imaginary unit) from the denominator.
  • and are in the form of and , where & are real numbers is the imaginary unit, .
  • Let z1 and z2 are the two Complex Numbers.
  • To do the division of complex number we have follow the steps:
step 1: Write the complex number in the fraction form.
step 2: Find the conjugate of the denominator.
step 3: Multiply the numerator and denominator with conjugate.
.
  • To find the Conjugate of a Complex Number we can use the function IMCONJUGATE.

ZOS Section

  • The syntax is to calculate the IMDIV in ZOS is .
    • and are in the form of a+bi.
  • For e.g.,IMDIV("3+2i","3-2i")
ImDiv

Examples

  1. IMDIV("4+2i","3-i") = = (because ) =
  2. IMDIV("3-5i,2-6i") = 0.9+0.2i
  3. IMDIV("5","2+3i") = 0.7692307692307693 + -1.1538461538461537i
  4. IMDIV("1+i","2") = 0.5+0.5i

See Also


References

Complex Division