MEI online resources for mathematics
Mathematics in Education and Industry

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Introduction to Complex Numbers

Before you start...

• You need to be able to use the quadratic formula to solve quadratic equations.

When you have finished you should...

• Be able to solve any quadratic equation with real coefficients.
• Understand what is meant by the real part and the imaginary part of a complex number.
• Understand what is meant by the complex conjugate of a complex number.
• Be able to add, subtract, multiply and divide complex numbers given in the form x + yj.
• Know that a complex number is zero if and only if both the real and imaginary parts are zero.

Argand Diagrams

Before you start...

• You need to have completed section 1.

When you have finished you should...

• Know what is meant by the modulus of a complex number.
• Know how to represent complex numbers and their conjugates on an Argand diagram.
• Know what is meant by the real axis and the imaginary axis in an Argand diagram.
• Be able to represent the sum and difference of two complex numbers on an Argand diagram.
• Be able to represent simple sets of complex numbers as loci in the Argand diagram, such as circles in the form | z - a | = r.

Modulus-Argument Form

Before you start...

• You need to have completed sections 1 and 2.
• You need to be able to work with angles in radians, and know about angles in all four quadrants. This is covered in Core 2, but if you haven't yet done this work, you will find additional help in the 'Notes and examples2, or in chapter 10 of the AS Pure Mathematics textbook.

When you have finished you should...

• Know what is meant by the argument of a complex number.
• Be able to represent a complex number in modulus-argument form and be able to convert between the forms z = x + yj and z = r(cos θ + j sin θ).
• Be able to represent simple sets of complex numbers as loci in the Argand diagram such as half lines of the form arg(z - a - bj) = θ.

Equations

Before you start...

• You need to have completed sections 1, 2 and 3.
• You need to be able to use factor theorem, and to factorise polynomials such as cubics and quartics if you know one factor. This is covered in Core 1, but if you haven't yet done this work you will find additional help in the 'Notes and examples' or in chapter 3 of the AS Pure Mathematics textbook.

When you have finished you should...

• Know that the complex roots of real polynomial equations with real coefficients occur in conjugate pairs.
• Be able to solve equations of higher degree with real coefficients in simple cases.