Difference between revisions of "Formation of a triangle"

From Karnataka Open Educational Resources
Jump to navigation Jump to search
Line 28: Line 28:
 
*How many angles are formed when three lines intersect with each other?
 
*How many angles are formed when three lines intersect with each other?
 
*How many angles are enclosed by the triangle?
 
*How many angles are enclosed by the triangle?
 
+
'''Evaluation at the end of the activity'''
==== '''Evaluation at the end of the activity''' ====
 
 
* Can there be a closed figure with less than three sides?
 
* Can there be a closed figure with less than three sides?
 
* Can the vertices of the triangle be anywhere on a plane?
 
* Can the vertices of the triangle be anywhere on a plane?

Revision as of 09:26, 12 April 2019

Objectives

  • Understand formation of triangles
  • Recognize elements of triangle
  • Introduce concepts of exterior angle.

Estimated Time

30 minutes

Prerequisites/Instructions, prior preparations, if any

Prior knowledge of point, lines, angles, parallel lines

Materials/ Resources needed

Process (How to do the activity)

  • Use the geogebra file to illustrate.
  • How many lines are there? Are the lines meeting?
  • Are the two lines parallel? How can you say they are parallel or not?
  • How many angles are formed at the point of intersection?
  • What is the measure of the total angle at the point of intersection of two lines?
  • Of the four angles formed which of the angles are equal? What are they called?
  • Do the three intersecting lines enclose a space? How does it look? It is called a triangle.
  • What are the points of intersection of these three lines called?
  • The line segments forming the triangle are called sides.
  • How many angles are formed when three lines intersect with each other?
  • How many angles are enclosed by the triangle?

Evaluation at the end of the activity

  • Can there be a closed figure with less than three sides?
  • Can the vertices of the triangle be anywhere on a plane?
  • What will happen if the three vertices are collinear?