In the Polar form, why is there a 2kpi? (1 Viewer)

Vipul_K · Dec 2, 2021

I was trying to comprehend the roots of a complex number. i understood demovier's theorem but I am unable to link it to the roots of complex numbers, The only part I do not understand conceptually is why is there a +2kpi?... can someone explain with reference to polar form only? (please don't use euler's form)

tito981 · Dec 2, 2021

Vipul_K said:
I was trying to comprehend the roots of a complex number. i understood demovier's theorem but I am unable to link it to the roots of complex numbers, The only part I do not understand conceptually is why is there a +2kpi?... can someone explain with reference to polar form only? (please don't use euler's form)

If you think of a sine or cos graph, the graph repeats every 2 pi because it has a period of 2pi, hence since a complex number can be expressed as z=cosx++isinx, the value of z should be the same every 2pi, as it is made up of components with period 2pi. Hence, since z is the sane for multiple 2pi's it is expressed as +2kpi.

Vipul_K · Dec 2, 2021

tito981 said:
If you think of a sine or cos graph, the graph repeats every 2 pi because it has a period of 2pi, hence since a complex number can be expressed as z=cosx++isinx, the value of z should be the same every 2pi, as it is made up of components with period 2pi. Hence, since z is the sane for multiple 2pi's it is expressed as +2kpi.

OMG U ARE A LIFE SAVER.... Now I understand why.... THANKS A LOT!

CM_Tutor · Dec 2, 2021

I can add any integer multiple of $2\pi$ to a complex number and get the same complex number. So,

$\begin{align*} z = \cfrac{1+i\sqrt{3}}{2} &= \cos{\cfrac{\pi}{3}} + i\sin{\cfrac{\pi}{3}} \\ &= \cos{\left(2\pi + \cfrac{\pi}{3}\right)} + i\sin{\left(2\pi + \cfrac{\pi}{3}\right)} = \cos{\cfrac{7\pi}{3}} + i\sin{\cfrac{7\pi}{3}} \\ &= \cos{\left(2\pi \times 2 + \cfrac{\pi}{3}\right)} + i\sin{\left(2\pi \times 2 + \cfrac{\pi}{3}\right)} = \cos{\cfrac{13\pi}{3}} + i\sin{\cfrac{13\pi}{3}} \\ &= ... \\ &= \cos{\left(2\pi \times 100 + \cfrac{\pi}{3}\right)} + i\sin{\left(2\pi \times 100 + \cfrac{\pi}{3}\right)}= \cos{\cfrac{601\pi}{3}} + i\sin{\cfrac{601\pi}{3}} \\ &= ... \end{align*}$

and

$\begin{align*} z = \cfrac{1+i\sqrt{3}}{2} = \cos{\cfrac{\pi}{3}} + i\sin{\cfrac{\pi}{3}} &= \cos{\left(2\pi \times -1 + \cfrac{\pi}{3}\right)} + i\sin{\left(2\pi \times -1 + \cfrac{\pi}{3}\right)} = \cos{\cfrac{-5\pi}{3}} + i\sin{\cfrac{-5\pi}{3}} = \cos{\cfrac{5\pi}{3}} - i\sin{\cfrac{5\pi}{3}} \\ &= \cos{\left(2\pi \times -2 + \cfrac{\pi}{3}\right)} + i\sin{\left(2\pi \times -2 + \cfrac{\pi}{3}\right)}= \cos{\cfrac{-11\pi}{3}} + i\sin{\cfrac{-11\pi}{3}} = \cos{\cfrac{11\pi}{3}} - i\sin{\cfrac{11\pi}{3}} \\ &= \cos{\left(2\pi \times -3 + \cfrac{\pi}{3}\right)} + i\sin{\left(2\pi \times -3 + \cfrac{\pi}{3}\right)}= \cos{\cfrac{-17\pi}{3}} + i\sin{-17\cfrac{\pi}{3}} = \cos{\cfrac{17\pi}{3}} - i\sin{\cfrac{17\pi}{3}} \\ &= ... \\ &= \cos{\left(2\pi \times -100 + \cfrac{\pi}{3}\right)} + i\sin{\left(2\pi \times -100 + \cfrac{\pi}{3}\right)}= \cos{\cfrac{-599\pi}{3}} + i\sin{\cfrac{-599\pi}{3}} = \cos{\cfrac{599\pi}{3}} - i\sin{\cfrac{599\pi}{3}} \\ &= ... \end{align*}$

because, for each of these forms, we have:

$\cos{\cfrac{\pi}{3}} = \cos{\cfrac{7\pi}{3}} = \cos{\cfrac{13\pi}{3}} = ... = \cos{\cfrac{601\pi}{3}} = ... = \cfrac{1}{2} = \Re{(z)$

and

$\cos{\cfrac{\pi}{3}} = \cos{\cfrac{-5\pi}{3}} = \cos{\cfrac{-11\pi}{3}} = ... = \cos{\cfrac{-599\pi}{3}} = ... = \cfrac{1}{2} = \Re{(z)$

and

$\sin{\cfrac{\pi}{3}} = \sin{\cfrac{7\pi}{3}} = \sin{\cfrac{13\pi}{3}} = ... = \sin{\cfrac{601\pi}{3}} = ... = \cfrac{\sqrt{3}}{2} = \Im{(z)$

and

$\sin{\cfrac{\pi}{3}} = \sin{\cfrac{-5\pi}{3}} = \sin{\cfrac{-11\pi}{3}} = ... = \sin{\cfrac{-599\pi}{3}} = ... = \cfrac{\sqrt{3}}{2} = \Im{(z)$

In the Polar form, why is there a 2kpi? (1 Viewer)

Vipul_K

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tito981

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Vipul_K

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CM_Tutor

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