The discussion focuses on the representation of complex numbers in polar form, specifically the role of "r" in the equation z=re^{i\theta}. The value of "r" is defined as the distance from the origin, calculated using the formula r=√(x²+y²). For the complex numbers 1+i and 1+4i, the values of "r" are √2 and √17, respectively. The angle θ is determined using the arctangent function, with θ=arctan(1/1)=π/4 for 1+i and θ=arctan(4/1)≈1.3 radians for 1+4i.
PREREQUISITESMathematicians, physics students, and anyone interested in complex analysis or the geometric interpretation of complex numbers.
bel said:The "r" is the distance from the origin. Thus, z=re^{i\psi}
z= r (cos(\psi)+i sin (\psi) ).
Hence, for z=1+i, r= \sqrt{1^2 + 1^2}= \sqrt{2}.
Oblio said:If it was 1+4i
Would it be:
r= \sqrt{1^2 + 4^2}?
Oblio said:Is a reasonable answer for this phase then:
/sqrt{2}e ^i(theta) ?
learningphysics said:wait... phase usually refers to the angle... what exactly does the question ask you to find?
from your original post:
"The phase of a complex number is z=re^{i\theta}"
that doesn't seem right... did you write this out word for word?
Oblio said:No, phase is just the angle but there doesn't seem to be any angle so.. yeah...
exact words are: phase is the value of theta when z is expressed as z=re^i(theta).
Can you find an angle with just 1+i ?
Oblio said:when looking at a more complicated one like sqrt[2e] ^ -i(pi)/4
is the entire exponent my imaginery part?
and the base is real?
Oblio said:hmm
the books a little iffy..
I'll say no its not actually.