Difference between revisions of "Interior and exterior angles in triangle"

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*Digital : Computer, geogebra application, projector.
 
*Digital : Computer, geogebra application, projector.
 
*Non digital : Worksheet and pencil.
 
*Non digital : Worksheet and pencil.
*Geogebra files :  '''“[https://www.geogebra.org/m/bwsvgqqg#material/q6fnttmn Angles of  triangle.ggb]”'''
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*Geogebra files :  '''“[https://ggbm.at/xt5tcf6t Angles of  triangle.ggb]”'''
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{{Geogebra|xt5tcf6t}}
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===Process (How to do the activity)===
 
===Process (How to do the activity)===
 
*Ask students how many lines are there? They should be able to identify the points of intersection of the lines. How many points of  intersection are formed?
 
*Ask students how many lines are there? They should be able to identify the points of intersection of the lines. How many points of  intersection are formed?
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|Angle 2
 
|Angle 2
 
|Angle 3
 
|Angle 3
|In Angle 1  
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|In Angle 1 +
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Ex Angle1
 
Ex Angle1
|In Angle 2  
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|In Angle 2 +
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Ex Angle2
 
Ex Angle2
|In Angle 3  
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|In Angle 3 +
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Ex Angle3
 
Ex Angle3
 
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*Are  students able to recognize interior and exterior angles in a  triangle
 
*Are  students able to recognize interior and exterior angles in a  triangle
 
*Have  the students able to find a relation between the interior angle and  exterior angle that are formed at each vertex?
 
*Have  the students able to find a relation between the interior angle and  exterior angle that are formed at each vertex?
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[[Category:Triangles]]
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[[Category:Class 8]]

Latest revision as of 12:15, 4 November 2019

Angles are formed when three lines intersect with each other. There are angles that are enclosed by the three lines and there are angles that are formed outside the closed figure.

Objectives

  • Identify all angles when a triangle is formed
  • Understand the relation between various angles that are formed in a triangle.

Estimated Time

Prerequisites/Instructions, prior preparations, if any

Prior knowledge of point, lines, angles

Materials/ Resources needed

  • Digital : Computer, geogebra application, projector.
  • Non digital : Worksheet and pencil.
  • Geogebra files : Angles of triangle.ggb


Download this geogebra file from this link.


Process (How to do the activity)

  • Ask students how many lines are there? They should be able to identify the points of intersection of the lines. How many points of intersection are formed?
  • How many angles are formed at an intersecting point? How many angles in total at the three points of intersection?What is the total angle measure at each intersecting point?
  • How many angles are inside the triangle and how many are outside the triangle
  • Can you find an exterior angle that is equal to the interior angle of a triangle at each vertex?Why are they equal?
  • Identify the exterior angles that are equal? Justify why they are equal.
  • Establish that there are 2 angles which are exterior of the triangle that are equal and are formed when the sides of the triangle is extended at the vertex.
  • Students to analyze the interior and exterior angle at each point to find a relation between the interior angle and one of the exterior angles at the vertex. Students should be able to recognize the linear pair formed by interior angle and exterior angle.
  • Vary the position of the lines to check if interior and exterior angles form a linear pair.
  • Note the measure of angles
Angles of the triangle Exterior angle Interior angle + Exterior angle
Angle 1 Angle 2 Angle 3 Angle 1 Angle 2 Angle 3 In Angle 1 +

Ex Angle1

In Angle 2 +

Ex Angle2

In Angle 3 +

Ex Angle3

.
.

Evaluation at the end of the activity

  • Are students able to recognize interior and exterior angles in a triangle
  • Have the students able to find a relation between the interior angle and exterior angle that are formed at each vertex?