CIE A Level Maths: Pure 3

Revision Notes

8.1.1 Intro to Complex Numbers

Test Yourself

Complex Numbers – Basics

Complex numbers are a set of numbers which contain both a real part and an imaginary part. The set of complex numbers is denoted as straight complex numbers.

What is an imaginary number?

  • Up until now, when we have encountered an equation such as x to the power of 2 space end exponent equals space minus 1 we would have stated that there are “no real solutions” as the solutions are x equals plus-or-minus square root of negative 1 end root which are not real numbers
  • To solve this issue, mathematicians have defined one of the square roots of negative one as straight i; an imaginary number
    • square root of negative 1 end root equals straight i
    • straight i squared equals negative 1
  • We can use the rules for manipulating surds to manipulate imaginary numbers.
  • We can do this by rewriting surds to be a multiple of square root of negative 1 end root using the fact that square root of a b end root equals square root of a cross times square root of b

What is a complex number?

  • Complex numbers have both a real part and an imaginary part
    • For example: 3 plus 4 straight i
    • The real part is 3 and the imaginary part is 4
      • Note that the imaginary part does not include the 'straight i'
  • Complex numbers are often denoted by z and we can refer to the real and imaginary parts respectively using Re left parenthesis z right parenthesisand Im left parenthesis z right parenthesis
  •  In general:
    • z equals a plus b straight i This is the Cartesian form of z
    • Re open parentheses z close parentheses equals a
    • Im open parentheses z close parentheses equals b
  • It is important to note that two complex numbers are equal if, and only if, both the real and imaginary parts are identical.
    • For example, 3 plus 2 straight i and 3 plus 3 straight i are not equal

Worked example

8-1-1-complex-numbers-basic-we-solution

Exam Tip

  • Be careful in your notation of complex and imaginary numbers.
  • For example:
    open parentheses 3 square root of 5 close parentheses i could also be written as 3 i square root of 5, but if you wrote 3 square root of 5 i this could easily be confused with  3 square root of 5 i end root.

Complex Numbers – Basic Operations

How do I add and subtract complex numbers?

  • When adding and subtracting complex numbers, simplify the real and imaginary parts separately
    • Just like you would when collecting like terms in algebra and surds, or dealing with different components in vectors
    • open parentheses a plus b straight i close parentheses plus open parentheses c plus d straight i close parentheses equals open parentheses a plus c close parentheses plus open parentheses b plus d close parentheses straight i
  • Complex numbers can also be multiplied by a constant in the same way as algebraic expressions:
    • k open parentheses a plus b straight i close parentheses equals k a plus k b straight i

How do I multiply complex numbers?

  • The most important thing to bear in mind when multiplying complex numbers is that straight i squared equals negative 1
  • We can still apply our usual rules for multiplying algebraic terms:
    • a left parenthesis b plus c right parenthesis equals a b plus a c
    • open parentheses a plus b close parentheses open parentheses c plus d close parentheses equals a c plus a d plus b c plus b d
  • Sometimes when a question describes multiple complex numbers, the notation z subscript 1 comma blank z subscript 2 comma blank horizontal ellipsis is used to represent each complex number

How do I deal with higher powers of i?

  • Because straight i squared equals negative 1 this can lead to some interesting results for higher powers of i
    • bold i cubed equals bold i squared cross times bold i equals blank minus bold i
    • bold i to the power of 4 equals left parenthesis bold i squared right parenthesis squared equals open parentheses negative 1 close parentheses squared equals 1
    • bold i to the power of 5 equals left parenthesis bold i squared right parenthesis squared blank cross times bold i equals bold i
    • bold i to the power of 6 equals open parentheses bold i squared close parentheses cubed equals open parentheses negative 1 close parentheses cubed equals blank minus 1
  • We can use this same approach of using i2 to deal with much higher powers
    • bold i to the power of 23 equals open parentheses bold i squared close parentheses to the power of 11 cross times bold i equals open parentheses negative 1 close parentheses to the power of 11 cross times bold i equals blank minus bold i
    • Just remember that -1 raised to an even power is 1 and raised to an odd power is -1

Worked example

8-1-1-complex-numbers-basic-ops-we-solution

Exam Tip

  • Most calculators used at A-Level can work with complex numbers and you can use these to check your working.
  • You should still show your full working though to ensure you get all marks though.

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Jamie W

Author: Jamie W

Jamie graduated in 2014 from the University of Bristol with a degree in Electronic and Communications Engineering. He has worked as a teacher for 8 years, in secondary schools and in further education; teaching GCSE and A Level. He is passionate about helping students fulfil their potential through easy-to-use resources and high-quality questions and solutions.