Difference between revisions of "Manuals/calci/IMLOG10"
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==Examples== | ==Examples== | ||
− | #IMLOG10("6+7i")=0.964709462857146+0.37443569720420i | + | #=IMLOG10("6+7i")=0.964709462857146+0.37443569720420i |
− | #IMLOG10("4-5i")=0.806391928359868-0.389151908999031i | + | #=IMLOG10("4-5i")=0.806391928359868-0.389151908999031i |
− | #IMLOG10("8")=0.903089986991944 | + | #=IMLOG10("8")=0.903089986991944 |
− | #IMLOG10("3i")=0.477121254719662+0.682188176920921i | + | #=IMLOG10("3i")=0.477121254719662+0.682188176920921i |
− | #IMLOG10("0")=NULL | + | #=IMLOG10("0")=NULL |
*Imln("8") for that it should consider the imaginary value is zero, but calci is not considering like EXCEL | *Imln("8") for that it should consider the imaginary value is zero, but calci is not considering like EXCEL | ||
Revision as of 05:27, 16 December 2013
IMLOG10(z)
- is the complex number is of the form
Description
- This function gives the common logarithm of a complex number.
- IMLOG10(z), where is the complex number in the form of . i.e & are the real numbers.
- is the imaginary unit ..
- Log base 10, is known as the common Logarithm or Decadic logarithm, is the logarithm to the base 10.
- To find the common logarithm of a complex number, we have to calculate from the Natural Logarithm.
- So .
- We can use COMPLEX function to convert real and imaginary number into a complex number.
Examples
- =IMLOG10("6+7i")=0.964709462857146+0.37443569720420i
- =IMLOG10("4-5i")=0.806391928359868-0.389151908999031i
- =IMLOG10("8")=0.903089986991944
- =IMLOG10("3i")=0.477121254719662+0.682188176920921i
- =IMLOG10("0")=NULL
- Imln("8") for that it should consider the imaginary value is zero, but calci is not considering like EXCEL
See Also