Number System

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= Concept Map =

= Textbook = To add textbook links, please follow these instructions to: ([ Click to create the subpage])

=Additional Information=

Useful websites
Watch the following video on the story of how numbers evolved. The video called Story of One tells how numbers evolved and the initial questions around number theory.

This video is related to number system, helps to know the basic information about number system

Reference Books
= Teaching Outlines =
 * Number based activity

Learning objectives

 * 1) What is the story of numbers?
 * 2) How did counting begin and learning distinguish between the quantity 2 and the number 2.
 * 3) The number "2" is an abstraction of the quantity

Notes for teachers
These are short notes that the teacher wants to share about the concept, any locally relevant information, specific instructions on what kind of methodology used and common misconceptions/mistakes.

Activities

 * 1) Activity Template
 * 2) Activity 1

Objectives
1. Understand that there is an aspect of quantity that we can develop with disparate objects 2. Comparison and mapping of quantities (more or less or equal) 3. Representation of quantity by numbers and learning the abstraction that “2 represents quantity 2 of a given thing” 4. Numbers also have an ordinal value – that of ordering and that is different from the representation aspect of numbers 5. Expression of quantities and manipulation of quantities (operations) symbolically 6. Recognizing the quantity represented by numerals and discovering how one number is related to another number 7. This number representation is continuous.

Notes for teachers
This is not one period – but a lesson topic. There could be a few more lessons in this section. For example, for representing collections and making a distinction between 1 apple and a dozen apples. This idea could be explained later to develop fractions. Another activity that can also be used to talk of units of measure. Addition and subtraction have been discussed here – extend this to include multiplication and division).

Activities

 * 1) Activity 1 - Quantity and Numbers
 * 2) Activity 2 - The Eighth Donkey Story
 * 3) Activity 3 - Cardinal and Ordinal Numbers

Objectives

 * 1) Numbers can be represented on a continuum called a number line
 * 2) Number line is a representation; geometric model of all numbers
 * 3) Mathematical operations can b explained by moving along the number line

Notes for teachers
Introduce the number line as a concept by itself as well as a method to count, measure and perform arithmetic operations by moving along the number line through different activities.

Activities

 * 1) Activity 1 - To introduce Number line
 * 2) Activity 2 - Sum of numbers
 * 3) Activity 3 - Classroom number line

Notes for teachers
These are short notes that the teacher wants to share about the concept, any locally relevant information, specific instructions on what kind of methodology used and common misconceptions/mistakes.

Activities

 * 1) Activity 1 - Activity-1
 * 2) Activity 2 - Activity-2

Notes for teachers
These are short notes that the teacher wants to share about the concept, any locally relevant information, specific instructions on what kind of methodology used and common misconceptions/mistakes.

Activities
'''III. Fill number line (1 period)''' Draw these one below the other 1,2,....... 10,20,....... 100, 200,.....
 * 1) Activity 1 Activity-1
 * 2) Activity 2 Activity-2

IV Tell stories and Play With Number Systems (1 period - optional) http://www.math.wichita.edu/history/topics/num-sys.html#sense (This page is downloaded and given as reading materials – page is called Number Systems)

V Questions/ activities for class
 * 1) Arrange in order – shortest, tallest, increasing and decreasing order

Notes for teachers
These are short notes that the teacher wants to share about the concept, any locally relevant information, specific instructions on what kind of methodology used and common misconceptions/mistakes.

Objectives

 * 1) To extend the understanding and skill of representing symbolically numbers and manipulating them.
 * 2) To understand that negative numbers are numbers that are created to explain situations in such a way that mathematical operations hold
 * 3) Negative numbers are opposite of positive numbers; the rules of working with negative numbers are opposite to that of working with positive numbers
 * 4) Together, the negative numbers and positive numbers form one contiuous number line
 * 5) Perform manipulations with negative numbers and express symbolically situations involving negative numbers

Notes for teachers
Negative numbers are to be introduced as a type of number; they do the opposite of what positive numbers do. Read the activity for more detailed description.

Activities

 * 1) Activity 1 -What are negative numbers

Sub Theme:Fractions Introduction: Fractions are defined in relation to a whole—or unit amount—by dividing the whole into equal parts. The notion of dividing into equal parts may seem simple, but it can be problematic. Although we use pairs of numbers to represent fractions, a fraction stands for a single number, and as such, has a location on the number line. Number lines provide an excellent way to represent improper fractions, which represent an amount that is more than the related whole. Instruction in fractions that focuses only on the mechanics of procedures and not on reasoning misses valuable opportunities to guide students in developing this core mathematical skill. This section explains the meaning of fractions, reviews some of the common difficulties in understanding the meaning of fractions, and describes how to use simple pictures to represent fractions.Fractions arise naturally whenever we want to consider one or more parts of an object or quantity that is divided into pieces. Consider how fractions are used in the following ordinary situations: In this section, we define what we mean by a fraction is part of of an object, collection or quantity. The five meanings listed below serve as conceptual models or tools for thinking about and working with fractions and serve as a framework for designing teaching activities that engage students in sense making as they construct knowledge about fractions.

1.Part of a whole 2.Part of a group/set 3.Measure (name for point on number line) 4.Ratio 5.Indicated divisionInterpreting fractions

Given their different representations, and the way they sometimes refer to a number and sometimes an operation, it is important to be able to discuss fractions in the many ways they appear. A multiple representation activity, including different numerical and visual representations, is one way of doing this. Sharing food is a good way to introduce various concepts aboput fractions. For example, using a chocolate bar and dividing it into pieces. This can be highly motivating if learners can eat it afterwards. A clock face shows clearly what halves and quarters look like, and can be extended to other fractions with discussion about why some are easier to show than others. We can find a third of an hour, but what about a fifth?

A paper tape measure is a valuable illustration of different fractions. For example, learners can write on 1/2m, 0.50m and 50cm for their own portable equivalence chart.

Folding of paper also can illustrate fractions

I have ten bars of chocolate, and I share them equally between four people. How much will they each get?

We recommend that teachers explicitly use thelanguage of fractions in other parts of the curriculum for reinforcement. For example, when looking at shapes, talk about ‘half a square’ and ‘third of a circle’.

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