Difference between revisions of "Manuals/calci/IMLN"
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*This function gives the Natural Logarithm of a complex number. | *This function gives the Natural Logarithm of a complex number. | ||
*In IMLN(z), where <math>z</math> is the complex number in the form of <math>x+iy</math>. i.e <math>x</math> & <math>y</math> are the real numbers. | *In IMLN(z), where <math>z</math> is the complex number in the form of <math>x+iy</math>. i.e <math>x</math> & <math>y</math> are the real numbers. | ||
− | *<math>I</math> imaginary unit <math>i=sqrt{-1}</math>. | + | *<math>I</math> imaginary unit <math>i=\sqrt{-1}</math>. |
*A logarithm of <math>z</math> is a complex number w such that <math>z = e^w</math> and it is denoted by <math>ln(z)</math>. | *A logarithm of <math>z</math> is a complex number w such that <math>z = e^w</math> and it is denoted by <math>ln(z)</math>. | ||
*If <math>z = x+iy</math> with <math>x</math> & <math>y</math> are real numbers then natural logarithm of a complex number : | *If <math>z = x+iy</math> with <math>x</math> & <math>y</math> are real numbers then natural logarithm of a complex number : |
Revision as of 05:14, 16 December 2013
IMLN(z)
- is the complex number is of the form
Description
- This function gives the Natural Logarithm of a complex number.
- In IMLN(z), where is the complex number in the form of . i.e & are the real numbers.
- imaginary unit .
- A logarithm of is a complex number w such that and it is denoted by .
- If with & are real numbers then natural logarithm of a complex number :
adding integer multiples of gives all the others.
- We can use COMPLEX function to convert real and imaginary number in to a complex number.
Examples
- IMLN("3-2i")=1.28247467873077-0.588002603547568i
- IMLN("6+7i")=2.22132562824516+0.862170054667226i
- IMLN("4")=1.38629436111989 But calci is not considering the zero value of imaginary value of z.
- IMLN("10i")=2.30258509299405+1.5707963267949i
See Also