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8 votes
8 votes
A regular hexagon has vertices at
1-2i, 0, a, b, c, d as in the picture.

What is the Imaginary part of
a?

A regular hexagon has vertices at 1-2i, 0, a, b, c, d as in the picture. What is the-example-1
User Amit Sharad
by
2.6k points

1 Answer

7 votes
7 votes

We can obtain
a by multiplying
1-2i by
e^(i2\pi/3), since this corresponds to rotating the point
1-2i in the plane counterclockwise about the origin by an angle of
\frac{2\pi}3, the measure of any interior angle of the hexagon.


a \, e^(i2\pi/3) = (1 - 2i) \, e^(i2\pi/3) \\\\ ~~~~~~~~= (1 - 2i) \left(\cos\left(\frac{2\pi}3\right) + i \sin\left(\frac{2\pi}3\right)\right) \\\\ ~~~~~~~~ = (1 - 2i) \left(-\frac12 + i\frac{\sqrt3}2\right) \\\\ ~~~~~~~~ = \sqrt3-\frac12 + i\left(1 + \frac{\sqrt3}2\right)

Then


\mathrm{Im}(a) = \boxed{1 + \frac{\sqrt3}2}

User GO VEGAN
by
2.8k points