Difference between revisions of "Parallel lines and Perpendicular lines"
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| + | === Objectives === | ||
| + | To enable students to- | ||
| + | # understand the concept of parallel lines and perpendicular lines; | ||
| + | # identify differences between parallel lines and non parallel lines; | ||
| + | # understand about when two lines can be parallel (constant perpendicular distance) | ||
| + | # to measure the perpendicular distance between two lines. | ||
| + | # to provide hands-on experience through Geogebra application. | ||
| + | === Estimated Time === | ||
| + | 90 minutes | ||
| + | |||
| + | === Prerequisites/Instructions, prior preparations, if any === | ||
| + | Prior understanding of lines and angles, right angle as 90 degree, use of protractor to measure/draw an angle. | ||
| + | |||
| + | === Materials/ Resources needed === | ||
| + | * Digital : Computer, Geogebra application, projector. | ||
| + | * Non-digital : Geometrical tools, pencil and worksheet. | ||
| + | |||
| + | === Process (How to do the activity) === | ||
| + | '''Teachers work:''' | ||
| + | * Show examples of pictures with parallel and non-parallel lines. | ||
| + | * Help students to identify their differences. | ||
| + | * Ask students on how they can conclude two line/segments are parallel and record the same. | ||
| + | * Introduce about the concept of perpendicular lines | ||
| + | * Help students understand that perpendicular line is the shortest distance between a pair of lines. | ||
| + | * Demonstrate using Geogebra how to plot parallel lines and check if perpendicular distance remains fixed between them. | ||
| + | * Ask students to give more examples of parallel lines in real life situations and their importance. | ||
| + | '''Students work:''' | ||
| + | * Identify the difference between parallel and non-parallel lines. | ||
| + | * Identify the parallel lines in their surroundings and measure the distance between them at various regions. | ||
| + | * Plot parallel lines using Geogebra and try to measure perpendicular distance between them. | ||
| + | * Plot perpendicular line using Geogebra and understand it as the shortest distance between two lines. | ||
| + | * Analyse the importance of parallel lines in real life situations. | ||
| + | |||
| + | === Developmental questions of the activity === | ||
| + | # When can we say two lines to be parallel and non-parallel? | ||
| + | # Why are the rods of a window parallel? | ||
| + | # Why are the electric cables laid parallel to each? | ||
| + | # What is the shortest distance between a pair of lines? | ||
| + | # What is the angle measurement of a perpendicular line? | ||
| + | # Where do you see perpendicular line in your surroundings? | ||
| + | # Can buildings have slant on perpendicular pillars? Why? | ||
| + | # Where do you see parallel lines in real life situations? What is the importance of lines been parallel in them? | ||
| + | |||
| + | === Evaluation at the end of the activity === | ||
Revision as of 02:10, 26 February 2021
Objectives
To enable students to-
- understand the concept of parallel lines and perpendicular lines;
- identify differences between parallel lines and non parallel lines;
- understand about when two lines can be parallel (constant perpendicular distance)
- to measure the perpendicular distance between two lines.
- to provide hands-on experience through Geogebra application.
Estimated Time
90 minutes
Prerequisites/Instructions, prior preparations, if any
Prior understanding of lines and angles, right angle as 90 degree, use of protractor to measure/draw an angle.
Materials/ Resources needed
- Digital : Computer, Geogebra application, projector.
- Non-digital : Geometrical tools, pencil and worksheet.
Process (How to do the activity)
Teachers work:
- Show examples of pictures with parallel and non-parallel lines.
- Help students to identify their differences.
- Ask students on how they can conclude two line/segments are parallel and record the same.
- Introduce about the concept of perpendicular lines
- Help students understand that perpendicular line is the shortest distance between a pair of lines.
- Demonstrate using Geogebra how to plot parallel lines and check if perpendicular distance remains fixed between them.
- Ask students to give more examples of parallel lines in real life situations and their importance.
Students work:
- Identify the difference between parallel and non-parallel lines.
- Identify the parallel lines in their surroundings and measure the distance between them at various regions.
- Plot parallel lines using Geogebra and try to measure perpendicular distance between them.
- Plot perpendicular line using Geogebra and understand it as the shortest distance between two lines.
- Analyse the importance of parallel lines in real life situations.
Developmental questions of the activity
- When can we say two lines to be parallel and non-parallel?
- Why are the rods of a window parallel?
- Why are the electric cables laid parallel to each?
- What is the shortest distance between a pair of lines?
- What is the angle measurement of a perpendicular line?
- Where do you see perpendicular line in your surroundings?
- Can buildings have slant on perpendicular pillars? Why?
- Where do you see parallel lines in real life situations? What is the importance of lines been parallel in them?