count from . to .
Equalities and Inequalities
We investigate the first of the three fundamental processes involving two
collections. We will introduce the procedure in the case of basic
Polynomials 2: Multiplication
Multiplication of polynomials is very close to multiplication of decimal numberphrases so, we begin by discussion of multiplication in arithmetic.
Multiplication in Arithmetic
In arithmetic, multiplication is
Polynomials 4: Division
(In Descending & Ascending Powers)
We now turn to the last one of the four operation with polynomials: division.
However, in order to understand the procedure, we must first take a look at
Basic Problems 1:
In the real world, we often select collections on the basis of requirements
that these collections must meet. After introducing some more
This chapter takes a brief look back at arithmetic to present it in a way
that will be a better basis for looking at algebra because we will then be
able to look at algebra as just a continuation of arit
Polynomials 3: Powers of x0 + h
While it is easy to compute with powers of a counting-numerator, it is a lot
more difficult to compute with powers of a decimal-numerator.
EXAMPLE 1. While it is easy to find that:
it is a lot