Lesson Worksheet: Cube Roots of Unity Mathematics

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In this worksheet, we will practice identifying the cubic roots of unity using de Moivre’s theorem.

Q1:

Find all the values of 𝑧 for which 𝑧=1.

  • A1,𝜋3+𝑖𝜋3cossin, cossin2𝜋3+𝑖2𝜋3
  • B1,𝜋2+𝑖𝜋2cossin, cossin𝜋2+𝑖𝜋2
  • C1,𝜋3+𝑖𝜋3cossin, cossin𝜋3+𝑖𝜋3
  • D1,2𝜋3+𝑖2𝜋3cossin, cossin2𝜋3+𝑖2𝜋3
  • E1,𝜋3+𝑖𝜋3cossin, cossin2𝜋3+𝑖2𝜋3

Q2:

Let 𝑧=𝑒 and 𝑧=𝑒 be the complex cubic roots of unity.

Evaluate 𝑧. How does this compare with 𝑧?

  • A2𝑒, 𝑧=2𝑧
  • B𝑒, 𝑧=𝑧
  • C2𝑒, 𝑧>2𝑧
  • D𝑒, 𝑧<𝑧
  • E𝑒, 𝑧=𝑧

Evaluate 𝑧. How does this compare with 𝑧?

  • A2𝑒, 𝑧>𝑧
  • B𝑒, 𝑧<𝑧
  • C2𝑒, 𝑧=2𝑧
  • D𝑒, 𝑧=𝑧
  • E𝑒, 𝑧=𝑧

Q3:

Evaluate 𝜔𝜔 where 𝜔 is a complex cube root of unity.

Q4:

Write 𝜔 in its simplest form, where 𝜔 is a primitive cube root of unity.

  • A𝜔
  • B𝜔
  • C1

Q5:

Write 𝜔 in its simplest form, where 𝜔 is a primitive cube root of unity.

  • A𝜔
  • B𝜔
  • C1

Q6:

Evaluate 1+𝜔, where 𝜔 is a primitive cube root of unity.

  • A1
  • B1
  • C𝜔
  • D𝜔
  • E𝜔

Q7:

Evaluate 8𝜔+15+5𝜔+1𝜔 where 𝜔 is a complex cube root of unity.

Q8:

Evaluate 9𝜔+9𝜔+6+6𝜔+6𝜔, where 𝜔 is a nontrivial cubic root of unity.

  • A100𝜔
  • B64𝜔
  • C100𝜔
  • D64𝜔

Q9:

Given that 𝜔is one of the complex cubic roots of unity, find the complex conjugate of 1+𝜔.

  • A1𝜔
  • B1+𝜔
  • C𝜔
  • D1𝜔

Q10:

What is (8+𝜔), where 𝜔 is a primitive cube root of unity?

  • A49
  • B48
  • C0
  • D57

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