Learn – Algebra/Precalculus – Complex numbers

1 Geometric structure
- 1.1 Exercises
  - 1.1.1 Problem set
2 Addition
- 2.1 Exercises
3 Modulus and argument
- 3.1 Exercises
4 Polar form
- 4.1 Exercises
  - 4.1.1 Problem set
  - 4.1.2 Problem set
5 Multiplication
- 5.1 Exercises
6 Conjugate
- 6.1 Exercises
7 Division
- 7.1 Exercises
8 Exponentiation
- 8.1 Exercises
9 Roots
- 9.1 Exercises
10 Miscellaneous
- 10.1 Exercises

Geometric structure

Exercises

Problem set

For each of the following, mark the number on the complex (coordinate) plane.

$i$
$4i$
$-3i$
$2+5i$
$-5+2i$
$-4-3i$

Addition

Exercises

Problem set

For each of the following, simplify.

$3i+4i$
$7i-2i$
$-2i+6i$
$-5i-4i$

Problem set

For each of the following, simplify.

$(3+4i)+(5+2i)$
$(-2+5i)+(5-6i)$
$(-5-2i)-(-2+2i)$
$(-4-7i)-(7-4i)$

Problem set

In each of the following, complex numbers $z_1$ and $z_2$ are shown on the complex plane. Plot the complex number $z_1 + z_2$ on the plane.

Modulus and argument

Exercises

Problem set

For each of following complex numbers, mark the number on the complex plane and find the modulus of the number.

$3+4i$
$-4+3i$
$-2-2i$
$5-5i$
$-3+3\sqrt{3}i$
$-7\sqrt{3}-21i$
$3$
$3i$

Problem set

For each of following complex numbers, mark the number on the complex plane and find the argument of the number.

$4$
$-100$
$123i$
$-51.7i$

Problem set

For each of following complex numbers, mark the number on the complex plane and find the argument of the number.

$3+3i$
$-5+5i$
$-2-2\sqrt{3}i$
$6-2\sqrt{3}i$
$-12+4\sqrt{3}i$
$-5\sqrt{3}-15i$

Problem set

In each of the following problems, find the complex number $z$ .

$|z| = 4, \arg(z) = 0$
$|z| = 3, \arg(z) = \frac{\pi}{2}$
$|z| = 12.35, \arg(z) = \pi$
$|z| = 134.5, \arg(z) = \frac{3\pi}{2}$
$|z| = 4, \arg(z) = -\frac{\pi}{2}$
$|z| = 4.7, \arg(z) = -\frac{3\pi}{2}$

Problem set

In each of the following problems, find the complex number $z$ .

$|z| = 2, \arg(z) = \frac{\pi}{4}$
$|z| = 3, \arg(z) = \frac{\pi}{3}$
$|z| = 5, \arg(z) = \frac{5\pi}{6}$
$|z| = 10, \arg(z) = \frac{5\pi}{4}$
$|z| = 6, \arg(z) = \frac{5\pi}{3}$

Problem set

In each of the following problems, find the complex number $z$ .

$|z| = 4, \arg(z) = -\frac{\pi}{4}$
$|z| = 6, \arg(z) = -\frac{4\pi}{3}$
$|z| = 10.3, \arg(z) = 19\pi$
$|z| = 18, \arg(z) = \frac{20\pi}{3}$
$|z| = 22, \arg(z) = -\frac{31\pi}{4}$
$|z| = 3, \arg(z) = -\frac{194\pi}{3}$

Problem set

For complex numbers $z, z_1$ and $z_2$ , justify the following.

$|z_1+z_2| \le |z_1| + |z_2|$
$|z_1z_2| = |z_1||z_2|$

Polar form

Exercises

Problem set

Write each of the following complex numbers in polar form.

$3+3i$
$-4+4i$
$-\sqrt{3}-i$
$\sqrt{27}-3i$
$-2+\sqrt{12}i$

Problem set

Write each of the following complex numbers in polar form.

$3$
$-6.9$
$-8i$
$-10.3i$
$-\pi$
$-1.2\overline{34}i$

Multiplication

Exercises

Problem set

Evaluate the following.

$-5\times(-4-7i)$
$(3+4i)\times(2+3i)$
$(3+0i)\times(-10+0i)$
$(-2+5i)\times(3-4i)$
$\left(3\,\cos \frac{19\pi}{6}+i\,3\,\sin \frac{19\pi}{6}\right)\times\left(2\,\cos \left(-\frac{19\pi}{6}\right)+i\,2\,\sin \left(-\frac{19\pi}{6}\right)\right)$
$\left(\sqrt{2}\,\cos \frac{13\pi}{3}+i\,\sqrt{2}\,\sin\frac{13\pi}{3}\right)\times\left(\sqrt{8}\,\cos\frac{5\pi}{3}+i\,\sqrt{8}\,\sin\frac{5\pi}{3}\right)$
$\left(\sqrt{6}\,\cos \left(-\frac{\pi}{3}\right)+i\,\sqrt{6}\,\sin\left(-\frac{\pi}{3}\right)\right)\times\left(\sqrt{3}\,\cos\left(-\frac{\pi}{6}\right)+i\,\sqrt{3}\,\sin\left(-\frac{\pi}{6}\right)\right)$
$\left(\sqrt{4}\,\cos \left(-\frac{\pi}{4}\right)+i\,\sqrt{4}\,\sin\left(-\frac{\pi}{4}\right)\right)\times\left(\sqrt{6}\,\cos\frac{5\pi}{4}+i\,\sqrt{6}\,\sin\frac{5\pi}{4}\right)$

Problem set

In each of the following, complex numbers $z_1$ and $z_2$ are shown on the complex plane. Plot the complex number $z_1z_2$ on the plane.

Problem set

In each of the following, complex numbers $z_1$ and $z_2$ are shown on the complex plane. Plot the complex number $z_1z_2$ on the plane.

Conjugate

Exercises

Problem set

For each of the following problems, find the conjugate of the given complex number.

$-\sqrt{2}+4.3i$
$-\sqrt{5}-\sqrt{3}i$
$-\pi i$
$-5$

Problem set

For each of the following problems, find the conjugate of the given complex number, and express your answer in polar form.

$3\cos \frac{\pi}{6}+i\,3\sin \frac{\pi}{6}$
$2\cos \frac{\pi}{7}+i\,2\sin \frac{\pi}{7}$
$5\cos \frac{31\pi}{9}+i\,5\sin \frac{31\pi}{9}$
$31.256\cos \left(\frac{-93\pi}{5}\right)+i\,31.256\sin \left(\frac{-93\pi}{5}\right)$

Problem set

For each of the following problems, plot the conjugate of the given complex number.

Problem set

For complex numbers $z, z_1$ and $z_2$ , justify the following.

$\overline{z_1+z_2} = \overline{z_1}+\overline{z_2}$
$\overline{z_1z_2} = \overline{z_1}\,\,\overline{z_2}$
$\overline{\frac{z_1}{z_2}} = \frac{\overline{z_1}}{\overline{z_2}}$
$\overline{z^{10}} = \left(\overline{z}\right)^{10}$

Problem set

In each of the following problems, solve for $z$ .

$z\overline{z} = 11, \arg(z) = -\frac{\pi}{2}$
$z+\overline{z} = -6, \arg{z} = -\frac{3\pi}{4}$
$z+\overline{z} = -5, |z| = 5$
$z+\overline{z} = -10, z-\overline{z} = 8i$
$z+\overline{z} = -40, z-\overline{z} = 0$
$z\times \left(r\cos\frac{4\pi}{11}+i\,r\sin\frac{4\pi}{11}\right) = 4r$
$w\times z \times \overline{w} = \left(\frac{|w|^2}{2}-i\,\frac{|w|^2}{2}\right)$

Division

Exercises

Problem set

In each of the following problems, solve for $z$ .

$3\times z = -9+15i$
$(7+4i)\times z = 65$
$z \times (-4-i) = 68$

Problem set

Evaluate the following.

$\frac{9-12i}{3}$
$\frac{35-42i}{-7}$

Problem set

Find the values of each of the following.

$\frac{7+4i}{2-3i}$

$\frac{-3-4i}{-3+4i}$

$\frac{-2+5i}{2-5i}$

$\frac{9\cos\frac{3\pi}{4}+i\,9\sin\frac{3\pi}{4}}{3\cos\frac{\pi}{4}+i\,3\sin\frac{\pi}{4}}$

$\frac{8\cos\left(-\frac{2\pi}{3}\right)+i\,8\sin\left(-\frac{2\pi}{3}\right)}{2\cos\left(-\frac{\pi}{6}\right)+i\,2\sin\left(-\frac{\pi}{6}\right)}$

$\frac{12\cos\left(-\frac{2019\pi}{3}\right)+i\,12\sin\left(-\frac{2019\pi}{3}\right)}{6\cos\left(-\frac{2019\pi}{3}\right)+i\,6\sin\left(-\frac{2019\pi}{3}\right)}$

$\frac{\frac{23}{8}\cos\frac{23\pi}{8}+i\,\frac{23}{8}\sin\frac{23\pi}{8}}{\frac{25}{8}\cos\frac{25\pi}{8}+i\,\frac{25}{8}\sin\frac{25\pi}{8}}$

Problem set

Evaluate the following.

$\frac{-3i}{i}$
$\frac{-1}{i}$
$\frac{-2}{i}$
$\frac{5}{i}$
$\frac{-2+3i}{i}$
$\frac{1}{i}\times (8+i)$

Exponentiation

Exercises

Problem set

Evaluate the following.

$\left(2\cos \frac{\pi}{4}+i\,2\sin \frac{\pi}{4}\right)^5$
$\left(3\cos \frac{7\pi}{3}+i\,3\sin \frac{7\pi}{3}\right)^4$
$\left(4\cos \left(-\frac{5\pi}{6}\right)+i\,4\sin \left(-\frac{5\pi}{6}\right)\right)^{18}$
$\left(5\cos \left(-\frac{\pi}{3}\right)+i\,5\sin \left(-\frac{\pi}{3}\right)\right)^{191}$
$\left(-\frac{\sqrt{3}}{2}-i\,\frac{1}{2}\right)^{105}$
$\left(\frac{1}{\sqrt{2}}-i\,\frac{1}{\sqrt{2}}\right)^{2014}$
$\left(1-i\,\sqrt{3}\right)^{3993}$
$\left(-i\right)^{535}$

Problem set

In the each of the following, the complex number $w$ is defined in terms of the complex number $z$ , and the number $z$ is shown on the complex plane. Plot the number $w$ on the plane.

$w = z^4$

$w = z^7$

$w = z^7$

$w = z^3$

$w = z^4$

$w = z^{1003}$

Problem set

Evaluate the following.

$i^4$
$(-i)^3$
${(-i)}^2$
$-i^2$
$i^{103}$
$i^{899}$
$(-2i)^6$
$i^{-899}$

Roots

Exercises

Problem set

In the each of the following, the complex number $w$ is defined in terms of the complex number $z$ , and the number $z$ is shown on the complex plane. Plot the complex numbers that $w$ could be equal to, on the plane.

$w = \sqrt[5]{z}$

$w = \sqrt[4]{z}$

$w = \sqrt[3]{z}$

$w = \sqrt[3]{z}$

$w = \sqrt[3]{z}$

$w = \sqrt[5]{z}$

$w = \sqrt[4]{z}$

Problem set

Find all the possible values of the following.

$\sqrt[3]{8\cos\frac{\pi}{2}+i\,8\sin\frac{\pi}{2}}$
$\sqrt[4]{16\cos\frac{2\pi}{3}+i\,16\sin\frac{2\pi}{3}}$
$\sqrt{9\cos\left(-\frac{\pi}{2}\right)+i\,9\sin\left(-\frac{\pi}{2}\right)}$
$\sqrt[3]{-27i}$
$\sqrt[4]{-\frac{1}{2}-i\,\frac{\sqrt{3}}{2}}$

Problem set

Find all the possible values of the following.

$\sqrt[3]{1}$
$\sqrt[4]{16}$
$\sqrt[3]{-27}$
$\sqrt[4]{-16}$
$\sqrt{-1}$
$\sqrt[3]{i}$
$\sqrt[3]{-i}$

Miscellaneous

Exercises

Problem set

Following are the notations used for this problem set:

$\mathbb{N}$ – Set of Natural numbers
$\mathbb{Q}$ – Set of Rational numbers
$\mathbb{Z}$ – Set of Integers
$\mathbb{W}$ – Set of Whole numbers
$\mathbb{R}$ – Set of Real numbers
$\mathbb{C}$ – Set of Complex numbers

If $\mathbb{G}$ denotes the set of purely imaginary numbers, which of the following is/are true: $\mathbb{G}\subseteq\mathbb{R}$ , $\mathbb{R}\subseteq\mathbb{G}$ , $\mathbb{G}\subseteq\mathbb{C}$ ?
If $\mathbb{I}$ denotes the set of irrational numbers, which of the following is/are true: $\mathbb{Q}\subseteq\mathbb{I}$ , $\mathbb{I}\subseteq\mathbb{R}$ , $\mathbb{I}\subseteq\mathbb{C}$ , $\mathbb{R}\subseteq \mathbb{Q}\bigcup \mathbb{I}$ ?
If $\mathbb{G}$ denotes the set of purely imaginary numbers, which of the following is true: $\mathbb{R}\bigcup\mathbb{G}\subseteq\mathbb{C}$ , $\mathbb{C}\subseteq\mathbb{R}\bigcup\mathbb{G}$ ?
Is this true or false: $\mathbb{Q}\subseteq(\mathbb{C}-\mathbb{R})$ ?
Fill in the missing sets in the set inclusion hierarchy: $\mathbb{N}\subseteq \mathbb{W} \subseteq ? \subseteq \mathbb{Q} \subseteq ? \subseteq \mathbb{C}$ .

Problem set

Plot the function $x^2 - 4$ . What are the zeroes of this function?
Plot the function $x^2 + 1$ . What are the zeroes of this function?
Plot the function $-x^2 - 1$ . What are the zeroes of this function?

Problem set

Express the following in the form of $a+bi$ , where $a$ and $b$ are real numbers.

For a complex number $z$ , $|z| = 5$ . What is the value of $|-2z|$ ?
In general for two complex numbers and , triangle inequality holds.
1. What happens when $z_2 = 2z_1$ ?
2. What happens when $z_2 = -2z_1$ ?
$z_1 = 3+4i$ and $z_2 = 9+bi$ . Evaluate $b$ such that $|z_1+z_2| = |z_1|+|z_2|$ .
$z_1 = a+bi$ . Determine $z_2$ such that $z_1z_2 = |z_1|^2$ .