Difference between revisions of "Manuals/calci/IMPOWER"

Revision as of 22:44, 19 December 2013

IMPOWER(z,n)

This function gives the value of powers of complex number.
DeMoivre's Theorem is a generalized formula to compute powers of a complex number in it's polar form.
i'is the imaginary unit, $i={\sqrt {-1}}$
Then the power of a complex number is defined by $(z)^{n}=(x+iy)^{n}=r^{n}*e^{in\theta }=r^{n}(cosn\theta +isinn\theta )$ where $r={\sqrt {x^{2}+y^{2}}}$ . and $\theta =tan^{-}1(y/x)$ , Failed to parse (syntax error): {\displaystyle \theta∈(-\pi,\pi]} .
This formula is called DeMoivre's theorem of complex numbers.
We can use COMPLEX function to convert real and imaginary number in to a complex number.
In IMPOWER(z,n), $n$ can be integer, fractional or negative.
If $n$ is non-numeric, function will return error value.

@@ Line 15: / Line 15: @@
 ==Examples==
-#IMPOWER("4+5i",3)=-235.99999+115i
+#=IMPOWER("4+5i",3) = -235.99999+115i
-#IMPOWER("9-7i",4)=-14852-8063.999999i
+#=IMPOWER("9-7i",4) = -14852-8063.999999i
-#IMPOWER("6",9)=10077696
+#=IMPOWER("6",9) = 10077696
-#IMPOWER("i",10)=-1+6.1257422745431E-16i
+#=IMPOWER("i",10) = -1+6.1257422745431E-16i
 ==See Also==