Sunday, November 26, 2017
Wednesday, November 22, 2017
Saturday, November 18, 2017
WEEKLY REFLECTION 13/11/17 - 17/11/17
WEEKLY REFLECTION
13/11/17 - 17/11/17
''Education is the not the learning of facts, but the training of the mind to think"
- Albert Einstein.
Our first day of teaching practice started on 13th of November at St. John's High School, Eravipuram. I was assigned to teach the students of standard VIII C and they were very co-operative. I completed five lesson plans with the first class as ICT giving them a better understanding of the concept of the topic . I started the unit 'ratio' and was able to complete till 'changing relations'.
We also celebrated Children's Day on 14th of November and there was distribution of cakes and sweets to the students. Our chief guest was Mother General Rexia Mary and she delivered a wonderful speech on the importance of the day. On Wednesday our school conducted a book exhibition in association with the Nanma club for three days. It was an enriching experience for the students as well as for us.
Monday, October 9, 2017
Digital textbook - Polygons
digital textbook
Submitted by,
Sandra Faria,
B.Ed Mathematics.
POLYGONS
Contents
TOPICS
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PAGE
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Polygons
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4
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Types of Polygons
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7
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Naming polygons
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9
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Sum of angles of a Polygon
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10
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Polygons
A polygon is
any 2-dimensional shape formed with straight lines. Triangles, quadrilaterals,
pentagons, and hexagons are all examples of polygons. The word ‘polygon’ is
derived from the greek words ‘poly’ which means ‘many’ and ‘gon’ means
‘angles’.
The name tells you how
many sides the shape has. For example, a triangle has three sides, and a
quadrilateral has four sides. So any shape that can be drawn by connecting
three straight lines is called a triangle, and any shape that can be drawn by
connecting four straight lines is called a quadrilateral.
There are some that wish to name every
possible polygon, but there seems a little point in doing so. For example, a
42-sided polygon is called a ‘tetracontakaidigon’.
Beyond about 10 sides, most
people call them an ‘n-gon’. For example, a 15-gon has 15 sides. This seems
easier to remember and understand.
All of the shapes below
are polygons. Notice how all the shapes are drawn with only straight lines?
This is what makes a polygon.
If the shape had curves or
didn’t fully connect, then it can’t be called a polygon. The orange shape is
still a polygon even if it looks like it has an arrow. All the sides are
straight, and they are all connected. The orange shape has 11 sides.
Thus, polygons are two
dimensional closed shapes and they are made of straight lines.
Now can you answer the
following table keeping in mind the properties of a polygon???
Types
of Polygons
Now let’s go through some
of the common types of polygons. Are you ready for it???
1) Regular or
Irregular Polygons
A regular polygon has all
angles equal and all sides equal, otherwise it is irregular.
2) Concave or Convex Polygons
A convex polygon
has no angles pointing inwards. More precisely, no internal angle can be more
than 180°.If any internal angle is greater than 180° then the polygon is concave. (Think: concave has a "cave" in it)
3) Simple or
Complex Polygons
A simple polygon has only
one boundary, and it doesn't cross over itself. A complex polygon
intersects itself. Many rules about polygons don't work when it is complex.
Naming
of Polygons
Sum
of angles of a polygon
We know that the sum of
angles of a triangle is ________ .
Do we get the same sum for
the angles of a quadrilateral?
How about a pentagon?
Thus,
the formula for calculating the sum of the
interior angles of a regular polygon is (n - 2) ×
180° where n is the number of sides of the polygon.
This formula comes
from dividing the polygon up into triangles using full
diagonals.
Now can
you complete the following table…???
-------------------------------------------------------------
Monday, August 28, 2017
Friday, August 25, 2017
Innovative lesson plan
INNOVATIVE
LESSON TEMPLATE
Name
of the teacher trainee: Sandra Faria
Standard: VIII C
Name
of the school: St. John’s H.S, Eravipuram
Strength:
Subject:
Mathematics
Duration: 45’
Unit:
Polygons Date:
17/8/17
Curricular
Statement: The students will be able to
understand the concept of polygons and its exterior angles
through group activities, discussion and analysis.
Content
Analysis
Term: Polygons
Facts: 1) A two dimensional closed
figure with atleast three sides.
2) The sum of exterior
angles of any polygon is 360º.
Concept: Concept of polygons and its
exterior angles.
Process: Activities to understand the
concept of polygons and its exterior angles.
Learning outcomes: The students will
be able to
·
recall related
knowledge about polygons.
·
describe the
peculiarities of polygons.
·
interpret the
concept about polygons and its exterior angles.
·
apply the above
concept in a new or unfamiliar situation.
·
judge the
appropriateness of the above concept in a given problem.
·
plan new ideas
based on the concept.
·
explain the
concept of polygons and its exterior angles.
·
develop positive
attitude towards Mathematics.
·
accept the beauty
of Mathematics and its concepts.
Pre-requisites:
Knowledge about polygons, angles around a point and sum of interior angles of a
polygon.
Learning
aids: Innovative work model, match sticks, string, protractor and blackboard.
CLASSROOM
INTERACTION PROCEDURE
|
PUPIL’S
RESPONSE
|
INTRODUCTION
The teacher starts the class with the following riddle:
Iam a two dimensional shape.
Iam a closed figure.
I have more than two sides
I have equal number of edges and
vertices.
I have no adjacent sides as
collinear.
Can you tell who I am?
Yes. Can you give me examples of
polygons?
PRESENTATION
ACTIVITY
The teacher shows the following
innovative work model and explains how it was made and its purpose.
The teacher now asks each student from a
bench to demonstrate any polygon using a string.
So you know all about the shapes of a
polygon, isn’t it?
Now let us learn about exterior angles of a
polygon.
APPLICATION
The teacher distributes matchsticks and ask
the students to make a triangle with it.
Now can you extend all its sides using the
given matchsticks.
Can you measure all its outer or exterior
angles slowly without shaking the arranged matchsticks?
What is the sum of exterior angles of a
triangle?
The teacher now asks the students to find
the sum of exterior angle of a quadrilateral.
What is the sum of exterior angles of a
quadrilateral?
Yes. In the same way find out for pentagon
also.
What is the sum of exterior angles of a
pentagon?
REVIEW
What did we learn today?
So what is a polygon?
What is the sum of exterior angles of any
polygon?
|
Polygons
Triangle,
Quadrilaterals,
Pentagon,
Hexagon,
Heptagon,
Octagon,
Nonagon,
Decagon, etc.
Triangle
Quadrilateral
Pentagon
Hexagon
Yes
Yes
360 º
It is also 360 º
It is also 360 º
Polygons and its exterior angles.
A polygon is a closed 2- dimensional figure
with atleast three sides.
360 º
|
FOLLOW UP ACTIVITY
·
Draw a picture of
your choice using only geometrical shapes.
______________________________________________
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digital textbook Submitted by, Sandra Faria, B.Ed Mathematics. POLYGONS Contents ...
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WEEKLY REFLECTION 13/11/17 - 17/11/17 ''Education is the not the learning...
