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Consider the complex number 2 = V17 (cos(104°) + i sin(104°)).Plot z in the complex plane below.If necessary, round the point's coordinates to the nearest integer.Im5+4+3+2+1 +ReA+-5+-4-3-2-112345-1+-2-3
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Consider the complex number 2 = V17 (cos(104°) + i sin(104°)).Plot z in the complex plane below.If necessary, round the point's coordinates to the nearest integer.Im5+4+3+2+1 +ReA+-5+-4-3-2-112345-1+-2-3 +-4+-5 +

Consider the complex number 2 = V17 (cos(104°) + i sin(104°)).Plot z in the complex-example-1
User Cubic
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Recall that to plot a point in the complex plane we have to know its real part and its imaginary part.

The real part of the given number is


\sqrt[]{17}\cos 104^(\circ),

and its imaginary part is


\sqrt[]{17}\sin 104^(\circ).

Simplifying the above expressions, and rounding to the nearest integer we get that:


\begin{gathered} \operatorname{Re}(z)=-1, \\ \operatorname{Im}(z)=4. \end{gathered}

Therefore, the point has coordinates (-1,4).

Answer:

Consider the complex number 2 = V17 (cos(104°) + i sin(104°)).Plot z in the complex-example-1
User Lukas Barth
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5.9k points
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