The discussion revolves around the properties of complex numbers, specifically focusing on proving that if a complex number \( z \) is an nth root of a real number \( x \), then its complex conjugate \( \bar{z} \) is also an nth root of \( x \).
There is an ongoing exploration of the properties of complex conjugates and their relationship to nth roots. Some participants have provided clarifications and guidance on the definitions involved, while others are still grappling with the foundational concepts of complex numbers.
Participants acknowledge varying levels of familiarity with complex numbers, with some expressing a need for foundational understanding before progressing further in the discussion.
Dick said:Hmm. i is a square root (i.e. 2nd root) of -1. |i|=1. 1 isn't a square root of -1. Did you mean x is a nonnegative real number?
Nick_273 said:Sorry, i meant z repeated, not absolute value... its late and I'm tired :P
angus.myers said:Did you ever manage to get this problem solved?
z = a - ib and z= a+ib are complex conjugates are they not? Where both a and b are real numbers.
so in this case, if z = n(sqrt)ia
then the complex conjugate is = n(sqrt)-ia
is this correct?
angus.myers said:I think here it's more a case of what the complex conjugate of z actually is. I think that is where I am having difficulties! I've never touched on complex numbers before, I'm trying to read up on it but am obviously having basic ground work issues.
How would one go about finding the complex conjugate. Is there a set of guidelines for this?
angus.myers said:Wow! I'm an idiot! haha, Thank you for that! I didn't think of it that way and I think I was trying to over complicate things!
so
z = (a +ib)^n and z(bar) = (a - ib)^n
when asked:
Prove that if the complex number z is an nth root of the real number x then
z is also an nth root of x.
means that ib = 0, as i isn't a real number? so if x is a real number, ib holds a value that is equal to 0.
Therefore z = z(bar) when b = 0?
Thank you for your help!