Complex Numbers

Question 1

Define a rational number.

Answer 1

^p⁄_q where p and q are integers and q != 0

Question 2

Define an integer.

Answer 2

A whole number.

Question 3

Define a real number.

Answer 3

A rational or irrational numbers.

Question 4

If z = a + ib

Re(z) = ?

Answer 4

a

Question 5

If z = a + ib

Im(z) = ?

Answer 5

b

Question 6

What two conditions must be fulfilled for two complex numbers to be equal?

Answer 6

Their real parts are equal.

Their imaginary parts are equal.

Question 7

If you have (a + ib)(a - ib), what is it equal to and what type of number is it?

Answer 7

a^2 + b^2

A real number

Question 8

Define a natural number.

Answer 8

A positive, whole number.

Question 9

If z = a + ib,

what does z equal?

Answer 9

a - ib

Question 10

The conjugate of a sum of complex numbers…

Answer 10

is equal to the sum of the conjuagtes of the complex numbers.

___________ __ __ __

So z₁ + z₂ + … + z_n = z₁ + z₂ + … + z_n

Question 11

The conjugate of a product of complex numbers…

Answer 11

is equal to the product of the conjuagtes of the complex numbers.

___________ __ __ __

So z₁ x z₂ x … x z_n = z₁ x z₂ x … x z_n

Question 12

What equation gives you the square roots of a complex number?

Answer 12

___________ __________

_____ / _____ / _____

√ a + ib = √ √a² + b² + a ± √ √a² + b² - a

2 2

Where ± is the same sign as that of ib.

Question 13

What equation do you simultaneously solve to find the square root of a complex number?

Answer 13

Let (a + ib)² = z

∴ a² - b² + 2abi = z

(1) a² - b² = Re(z)
(2) 2ab = Im(z)

Question 14

How do you factorise the sum of two squares?

x² + y² = ?

Answer 14

Use i² to turn it into a difference of two squares, then factorise.

x² + y² = x² + i²y²

= (x + iy)(x - iy)

Question 15

What is √ i equal to?

Answer 15

√ i = ± ( ¹⁄_{^{√<span> 2 </span>}} - ¹⁄_{^{√<span> 2 </span>}} i )

Question 16

What are the two primary forms of coordinates on the complex number plane?

Answer 16

Rectangular Form - (x, iy)

Mod-Arg Form - r(cosΘ + isinΘ)

Question 17

What is the complex number product rule?

Answer 17

z₁z₂ = r₁r₂[cis(Θ₁ + Θ₂)]

Question 18

What is the complex number quotient rule?

Answer 18

^z₁ ⁄_z2 = ^r₁ ⁄_r2 [cis(Θ₁ - Θ₂)]

Question 19

What is an Argand Diagram?

Answer 19

The complex number plane.

Question 20

What is z on an Argand diagram?

Answer 20

A reflection of z in the x-axis.

Question 21

What geometric effect does multiplying complex number z by real number c have?

Answer 21

Multiplies the distance from the origin (modulus) by c.

Question 22

What geometric effect does multiplying complex number z by i have?

Answer 22

Rotates (the arguement of) z around the origin by 90º anticlockwise.

Question 23

What geometric effect does multiplying complex number z by cis^π⁄₂ have?

Answer 23

Rotates (the arguement of) z around the origin by 90º anticlockwise.

Question 24

What geometric effect does multiplying complex number z by cisΘ have?

Answer 24

Rotates (the arguement of) z around the origin by Θ anticlockwise.

Question 25

What geometric effect does multiplying complex number z by complex number w have?

Answer 25

Multiplies their modulii and adds their arguements.

Question 26

What geometric effect does dividing complex number z by complex number w have?

Answer 26

Divides their modulii and subtracts their arguements.

Question 27

z x z = ?

Answer 27

[z]²

Question 28

[z] = ?

Answer 28

[z]

Question 29

z + z = ?

Answer 29

2Re(z)

Question 30

z - z = ?

Answer 30

2Im(z)

Question 31

z + w = ?

Answer 31

z + w

Question 32

z x w = ?

Answer 32

z x w

Question 33

^z⁄_w = ?

Answer 33

__

(^z⁄_w)

Question 34

[z][w] = ?

Answer 34

[zw]

Question 35

^[z]⁄_[w] = ?

Answer 35

[^z⁄_w]

Question 36

arg(z) + arg(w) = ?

Answer 36

arg(zw)

Question 37

arg(z) - arg(w) = ?

Answer 37

arg(^z⁄_w)

Question 38

If z = rcisΘ,

What is the value of z²?

Answer 38

r²cis2Θ

Question 39

If z = rcisΘ,

What is the value of z^-1?

Answer 39

¹⁄_rcis-Θ

Question 40

If z = rcis(Θ),

What is the value of zⁿ?

Answer 40

rⁿcis(nΘ)

Question 41

When are two vectors equal?

Answer 41

When they have the same length and direction.

Question 42

What is a prime vector?

Answer 42

A vector that originates from the origin.

Question 43

Why must [z₁ + z₂] ≤ [z₁] + [z₂]?

Answer 43

As vectors, they form the three sides of a triangle.

The longest side of a triangle is always smaller than the other two sides added together.

Question 44

What is the complex locus equation for x = 3?

What shape is it?

Answer 44

Re(z) = 3

Vertical Line

Question 45

What is the complex locus equation for y = -2?

What shape is it?

Answer 45

Im(z) = -2

Horizontal Line

Question 46

What is the complex locus equation for:

x² + y² = 16

What shape is it?

Answer 46

[z] = 4

Circle, radius 4, centre (0,0)

Question 47

What is the complex locus equation for:

(x - 2)² + (y - 3)² = 4

What shape is it?

Answer 47

[z - (2 + 3i)] = 2

Circle, radius 2, centre (2,3)

Question 48

What is the locus of argz = ^π⁄₆?

Answer 48

A line from the origin 30º above the x-axis.

Does not include the origin.

Question 49

What is the equation of a line from the origin 60º above the x-axis, that doesn’t include the origin?

Answer 49

What is the locus of argz = ^π⁄₃?

Question 50

What is the locus of arg{z - (1 + 3i)} = ^π/₂?

Answer 50

A line from (1, 3), 45º above the x-axis.

Does not include (1, 3).

Question 51

What is the locus of arg{z + 2 + i)} = ^-2π/₃?

Answer 51

A line from (-2, -1), 120º below the x-axis.

Does not include (-2, -1).

Question 52

What is the locus of [z - z₁] = [z - z₂]?

Answer 52

A straight line equidistant from z₁ and z₂.

Question 53

What shape does this equation form if Θ = 0?

arg(^{z - z₁} ⁄_{z - z2}) = Θ

Answer 53

A straight line passing through z₁ and z₂, with a gap between z₁ and z₂, and not including z₁ and z₂.

Question 54

What shape does this equation form if 0 < Θ < ^π⁄₂?

arg(^{z - z₁} ⁄_{z - z2}) = Θ

Answer 54

The major arc of a circle, going anticlockwise from z₁ to z₂, not including z₁ and z₂.

Question 55

What shape does this equation form if Θ = ^π⁄₂?

arg(^{z - z₁} ⁄_{z - z2}) = Θ

Answer 55

A semicircle, going anticlockwise from z₁ to z₂, not including z₁ and z₂.

Question 56

What shape does this equation form if ^π⁄₂ < Θ < π?

arg(^{z - z₁} ⁄_{z - z2}) = Θ

Answer 56

The minor arc of a circle, going anticlockwise from z₁ to z₂, not including z₁ and z₂.

Question 57

What shape does this equation form if Θ = π?

arg(^{z - z₁} ⁄_{z - z2}) = Θ

Answer 57

A staright line from z₁ to z₂, not including z₁ and z₂.

Question 58

Which direction should you always sketch when drawing a locus with the form:

arg(^{z - z₁} ⁄_{z - z2}) = Θ

Answer 58

Anticlockwise from z₁ to z₂.

Question 59

State De Moivre’s theorem.

Answer 59

(cisΘ)ⁿ = cis(nΘ)

Question 60

sin(-Θ) = ?

Answer 60

-sin(Θ)

Question 61

cos(-Θ) = ?

Answer 61

cos(Θ)

Question 62

cos³Θ = ?

Answer 62

¹⁄₄cos3Θ + ³⁄₄cosΘ

Question 63

sin³Θ = ?

Answer 63

³⁄₄sinΘ - ¹⁄₄sin3Θ

Question 64

Describe a method for finding z if:

zⁿ = 1

Answer 64

zⁿ = 1

zⁿ = cis0

z = (cis0)^1⁄_n

z = (cis(0, ±2π, ±4π…))^1⁄_n number of terms equal to ^{(n - 1)}⁄₂

z = cis(0), cis(±^2π⁄_n), cis(±^4π⁄_n)…

Simplify

Question 65

Describe a method for z if:

zⁿ = -1

Answer 65

zⁿ = -1

zⁿ = cisπ

z = (cisπ)^1⁄_n

z = (cis(π, ±3π, ±5π…))^1⁄_n number of terms equal to ^{(n - 1)}⁄₂

z = cis(0), cis(±^3π⁄_n), cis(±^5π⁄_n)…

Simplify