2021 AMC 12A Spring Problem 13

Below is the professionally curated solution for Problem 13 of the 2021 AMC 12A Spring, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 2021 AMC 12A Spring solutions, or check the answer key.

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Concepts:De Moivre’s Theoremcomplex number

Difficulty rating: 1780

13.

Of the following complex numbers z,z, which one has the property that z5z^5 has the greatest real part?

2-2

3+i-\sqrt3 + i

2+2i-\sqrt2 + \sqrt2\, i

1+3i-1 + \sqrt3\, i

2i2i

Solution:

Each listed number has modulus 2,2, so z5z^5 has modulus 32,32, and its real part is 32cos(5θ),32\cos(5\theta), where θ\theta is the argument of z.z. The arguments are 180,180^\circ, 150,150^\circ, 135,135^\circ, 120,120^\circ, and 90.90^\circ.

Multiplying by 55 gives 900180,900^\circ \equiv 180^\circ, 75030,750^\circ \equiv 30^\circ, 675315,675^\circ \equiv 315^\circ, 600240,600^\circ \equiv 240^\circ, and 45090.450^\circ \equiv 90^\circ. The largest cosine is cos30,\cos 30^\circ, from z=3+i,z = -\sqrt3 + i, giving real part 163.16\sqrt3.

Thus, the correct answer is B.

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