Karldahemster
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I have done part i) but am having difficulty with part ii)
Thank you
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Complex number question (1 Viewer)
- Thread starter Karldahemster
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I have done part i) but am having difficulty with part ii)
Thank you
camelrider
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You can definitely solve it that way, but if the marker is strict, you may not receive full marks for not using the directive "hence".. Write $z = r\, \mathrm{cis}(\theta)$ (so our goal is to solve for $r$ and $\theta$ first. See what the equation $z^3 = 8i$ when we substitute $z = r\, \mathrm{cis}(\theta)$, and then compare modulus and argument of both sides of the equation. $)
To do (ii), since you showed that -2i is a root of z^3-8i=0, it follows from the Factor Theorem that (z+2i) is a factor.
Therefore z^3-8i=(z+2i)(z^2+Az-4) , where A can be found from equating coefficients of z^2.
Then find the roots of the quadratic to find the remaining roots of z^3=8i.
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Oh yeah, I didn't even notice the "hence" (or look at part (i)).
I think introducing a new constant is a bit risky, especially because I myself tend to mix up the signs and this method better satisfies the "hence" requirement.
Since:
^3=8i)
Therefore:
^3\\(z-(-2i))(z-(-2i)z+(-2i)^2)=0\\(z+2i)(z+2i-4)=0\end{aligned})
Hence
is a root
Now solve to for the other two roots, you would use the quadratic formula but you can also solve using mod-arg form but you needed to complete the above step to satisfy "hence".
Since:
Therefore:
Hence
Now solve to for the other two roots, you would use the quadratic formula but you can also solve using mod-arg form but you needed to complete the above step to satisfy "hence".
Last edited:
as integrand says u can use roots of unity, or factorise z^3=8i to get roots.roots of unity is better thou:
z^3 = 8i
z^3 = 8cis(90)
r^3cis(3x)=8cis(90+360k)
where k is and integer. by adding 360 nothing happens; so all integer value of k allow this condition to be true.
equate r and 8, 3x and 90+360k
r^3=8, r=2
3x=90+360k
x= 30+120k
x= 30, 150,270(-90) , going any further or under for value of k would cause repeats in angles. eg: 390=30
so answer are 2cis30,2cis150,2cis-90
2cis-90 is -2i btw, all the other values also correspond with unique complex numbers
z^3 = 8i
z^3 = 8cis(90)
r^3cis(3x)=8cis(90+360k)
where k is and integer. by adding 360 nothing happens; so all integer value of k allow this condition to be true.
equate r and 8, 3x and 90+360k
r^3=8, r=2
3x=90+360k
x= 30+120k
x= 30, 150,270(-90) , going any further or under for value of k would cause repeats in angles. eg: 390=30
so answer are 2cis30,2cis150,2cis-90
2cis-90 is -2i btw, all the other values also correspond with unique complex numbers