See
Arithmetic and Geometric Sequences and Series and Sequences & Series for more information.
Definitions for sequences and series can also be found here.
Rules for Exponents is given here.
See Arithmetic Properties of Binomial Coeffiecients.
Also see Expanding Binomials, from Exercises in Math Readiness (EMR).
Forming conjectures to be proved by mathematical induction.
A proof of the principle of mathematical induction may be found at
Countable Infinity.
Explanations are given at Mathematical Induction and
Mathematical Induction, two different sites with the same name.
Some additional notes on Mathematical Induction can also be found here.
.
The terms complex number, real part and imaginary part, conjugate, modulus
and argument. The complex plane (Argand diagram).
See
The Polar Form of a Complex Number : The unit circle,
from S.O.S. MATHematics.
De Moivre's theorem is mentioned.
The same site has an explanation of eiq = cos q + i sin q. See Euler's Formula.
See
The Complex Plane, from S.O.S. MATHematics.
See also Complex and Complex Numbers for further details.
The diagram was created using downloadable packages developed by METRIC :
Mathematics Education Technology Research at Imperial College.
Their learning modules, based on Mathematica, have resulted in a text :
Experiments in Undergraduate Mathematics.
For background material, see
The Polar Form of a Complex Number : The unit circle.
Proof of the theorem
(cosq + i sinq
)n = cos n q + i sin n
q is left as an exercise.
Points representing the roots are symmetrically arrayed about the origin.
Graphed using Mathematica and METRIC packages.
Polynomial equations are discussed at Polynomials and Roots, from the University of Saskatchewan's Exercises in Math Readiness (EMR). The Advanced Exercises require the solution of equations having radicals as coefficients.