Difference between revisions of "Manuals/calci/MAKECOMPLEXIMINUSSIMPLE"

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(Created page with "<div style="font-size:30px">'''MAKECOMPLEXIMINUSSIMPLE(imaginary)'''</div><br/> *<math>imaginary</math> is the imaginary part of the complex number. ==Description== *MAKECO...")
 
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*A Complex number whose real part is zero is said to be purely imaginary.
 
*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.  
 
*A Complex number whose imaginary part is zero is a real number. In that cases we have to assign '0' for that part.  
#=MAKECOMPLEXIMINUSSIMPLE (8) gives <math>5-i2</math>
+
#=MAKECOMPLEXIMINUSSIMPLE (8) gives <math>0-i8</math>
#=MAKECOMPLEXIMINUSSIMPLE (2,["j"]) gives <math>5-j2</math>
+
#=MAKECOMPLEXIMINUSSIMPLE (2,["j"]) gives <math>0-j2</math>
  
 
==ZOS==
 
==ZOS==
  
*The syntax is to calculate MAKECOMPLEXIMINUS in ZOS is  
+
*The syntax is to calculate MAKECOMPLEXIMINUSSIMPLE in ZOS is <math>MAKECOMPLEXIMINUSSIMPLE (IMAGINARY)</math>
<math>MAKECOMPLEXIMINUSSIMPLE (IMAGINARY)</math>
 
  
 
*<math>IMAGINARY</math> is the imaginary part.
 
*<math>IMAGINARY</math> is the imaginary part.
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==Examples==
 
==Examples==
  
#=MAKECOMPLEXIMINUSSIMPLE(5) = 4-i5
+
#=MAKECOMPLEXIMINUSSIMPLE(5) = 0-i5
#=MAKECOMPLEXIMINUSSIMPLE(-5,["j") = 4+i5  
+
#=MAKECOMPLEXIMINUSSIMPLE(-5) = 0+i5  
#=MAKECOMPLEXIMINUSSIMPLE(1) = 1+i0
+
#=MAKECOMPLEXIMINUSSIMPLE(1) = 0-i1
#=MAKECOMPLEXIMINUSSIMPLE(1..3) = 1-i5 ; 2-i5; 3-i5
+
#=MAKECOMPLEXIMINUSSIMPLE(-3,["j"]) = 0+j3
  
  
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*[[Manuals/calci/COMPLEX | COMPLEX]]
 
*[[Manuals/calci/COMPLEX | COMPLEX]]
 +
*[[Manuals/calci/MAKECOMPLEXIMINUS| MAKECOMPLEXIMINUS]]
 
*[[Manuals/calci/MAKECOMPLEXISIMPLE| MAKECOMPLEXISIMPLE]]
 
*[[Manuals/calci/MAKECOMPLEXISIMPLE| MAKECOMPLEXISIMPLE]]
 
*[[Manuals/calci/IMAGINARY | IMAGINARY]]
 
*[[Manuals/calci/IMAGINARY | IMAGINARY]]

Revision as of 04:30, 17 April 2017

MAKECOMPLEXIMINUSSIMPLE(imaginary)


  • is the imaginary part of the complex number.

Description

  • MAKECOMPLEXIMINUSSIMPLE function represents a complex number using the imaginary coefficient mentioned in the argument. Here the imaginary coefficient is converted to negative value.
  • As the argument does not contain real number, the real number coefficient is considered zero.
  • 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. . Because a negative times a negative is positive.
  • A complex number is in the form , where and are real numbers and is the imaginary unit. Where
  • To mention and , we must use the lower case only
  • In a complex number real part is denoted by & imaginary part is denoted by .
  • MAKECOMPLEXIMINUSSIMPLE returns the error value, when and are non-numeric.
  • should be either or , 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.
  1. =MAKECOMPLEXIMINUSSIMPLE (8) gives
  2. =MAKECOMPLEXIMINUSSIMPLE (2,["j"]) gives

ZOS

  • The syntax is to calculate MAKECOMPLEXIMINUSSIMPLE in ZOS is
  • is the imaginary part.


Examples

  1. =MAKECOMPLEXIMINUSSIMPLE(5) = 0-i5
  2. =MAKECOMPLEXIMINUSSIMPLE(-5) = 0+i5
  3. =MAKECOMPLEXIMINUSSIMPLE(1) = 0-i1
  4. =MAKECOMPLEXIMINUSSIMPLE(-3,["j"]) = 0+j3


Related Videos

Complex Numbers

See Also


References

Complex Numbers