Write the complex numbers $4cis120^@$ and $9cis((3pi)/2)$ in the form $a+ib$ ?

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Answer 1 · 2017-05-31T08:20:34

See explanation.

I assume that the "cis" is an abbreviation of $(cos + i sin)$ . If we use the formula we get:

$Bi$

$4*(cos120+isin120)=4*(cos(90+30)+isin(90+30))$

$=4*(-sin30+icos30)=4*(-1/2+i*sqrt3/2)=-2+2sqrt3i$

As real component is negative and imaginary component is positive, this lies in second quadrant.

$Bii$

$9*(cos((3pi)/2)+isin((3pi)/2))=9*(0+i*(-1))=-9i$

As real component is zero and imaginary component is negative, this lies on imaginary axis, $9$ points below $0+i0$ .

The sketched numbers are as shown below:

graph{(x^2+(y+9)^2-0.12)((x+2)^2+(y-2sqrt3)^2-0.1)=0 [-20.5, 19.5, -12.44, 7.56]}

Write the complex numbers 4cis120^@4cis120^@ and 9cis((3pi)/2)9cis((3pi)/2) in the form a+iba+ib?