# Difference between revisions of "Geogebra Applets"

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|+National Repository of Open Educational Resources - Geogebra Applets | |+National Repository of Open Educational Resources - Geogebra Applets | ||

!Sl NO | !Sl NO | ||

+ | !Geogebra Applets | ||

!Description | !Description | ||

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|1 | |1 | ||

+ | |[http://nroer.gov.in/gstudio/resources/documents/show/46034/ Catesian System] | ||

|Using this applet, you can find coordinates of different points lying in different quadrants | |Using this applet, you can find coordinates of different points lying in different quadrants | ||

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|- | |- | ||

|2 | |2 | ||

+ | |[http://nroer.gov.in/gstudio/resources/documents/show/50134/ Distance between two points] | ||

|This applet can be used to find distance between two points. | |This applet can be used to find distance between two points. | ||

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|- | |- | ||

|3 | |3 | ||

+ | |[http://nroer.gov.in/gstudio/resources/documents/show/46076/ Section Formula] | ||

|Using this applet, you can find the coordinates of a point lying between two points. You can also find midpoint of a line segment using this applet | |Using this applet, you can find the coordinates of a point lying between two points. You can also find midpoint of a line segment using this applet | ||

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|- | |- | ||

|4 | |4 | ||

+ | |[http://nroer.gov.in/gstudio/resources/documents/show/45272/ Graphing Lines] | ||

|Using this simulation, one can explore the world of lines. Investigate the relationships between linear equations, slope and graphs of lines. | |Using this simulation, one can explore the world of lines. Investigate the relationships between linear equations, slope and graphs of lines. | ||

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|- | |- | ||

|5 | |5 | ||

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|[http://nroer.gov.in/gstudio/resources/documents/show/46104/ Angle Sum property of a Quadrilateral] | |[http://nroer.gov.in/gstudio/resources/documents/show/46104/ Angle Sum property of a Quadrilateral] | ||

+ | |Using this applet, one can understand angle sum property of a quadrilateral along with testing the same for different types of quadrilaterals | ||

|- | |- | ||

|6 | |6 | ||

+ | |[http://nroer.gov.in/gstudio/resources/documents/show/46100/ Area of a Rectangle] | ||

|This applet can be used to find area of a rectangle by counting number of squares inside it. One can also observe how multiplication of two numbers can be used in finding area of a rectangle or square | |This applet can be used to find area of a rectangle by counting number of squares inside it. One can also observe how multiplication of two numbers can be used in finding area of a rectangle or square | ||

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|- | |- | ||

|7 | |7 | ||

+ | |[http://nroer.gov.in/gstudio/resources/documents/show/46016/ Area of a Square] | ||

|Using this applet, a person can generalize properties of a square. | |Using this applet, a person can generalize properties of a square. | ||

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|- | |- | ||

|8 | |8 | ||

+ | |[http://nroer.gov.in/gstudio/resources/documents/show/45974/ Quadrilateral Formation] | ||

|Using this geogebra applet you can form different quadrilaterals like square, rectangle, parallelogram, trapezium, rhombus etc | |Using this geogebra applet you can form different quadrilaterals like square, rectangle, parallelogram, trapezium, rhombus etc | ||

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|- | |- | ||

|9 | |9 | ||

+ | ||[http://nroer.gov.in/gstudio/resources/documents/show/50132/ Linear Equation] | ||

|In this applet, by changing the value of coefficients and constants of the linear equation ax + by + c = 0, one can obtain desired equation and examine its representation | |In this applet, by changing the value of coefficients and constants of the linear equation ax + by + c = 0, one can obtain desired equation and examine its representation | ||

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|- | |- | ||

|10 | |10 | ||

+ | ||[http://nroer.gov.in/gstudio/resources/documents/show/45978/ Solution of a pair of linear equation] | ||

|This applet increases your visualisation about two linear equations, how they behave with each other when two lines can intersect, becomes parallel to each other or are overlapping to one another. Using this applet, one can understand how a line vary when its coefficients and constants change | |This applet increases your visualisation about two linear equations, how they behave with each other when two lines can intersect, becomes parallel to each other or are overlapping to one another. Using this applet, one can understand how a line vary when its coefficients and constants change | ||

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|} | |} |

## Revision as of 09:28, 30 May 2014

### National Repository of Open Educational Resources - Geogebra Applets

Sl NO | Geogebra Applets | Description |
---|---|---|

1 | Catesian System | Using this applet, you can find coordinates of different points lying in different quadrants |

2 | Distance between two points | This applet can be used to find distance between two points. |

3 | Section Formula | Using this applet, you can find the coordinates of a point lying between two points. You can also find midpoint of a line segment using this applet |

4 | Graphing Lines | Using this simulation, one can explore the world of lines. Investigate the relationships between linear equations, slope and graphs of lines. |

5 | Angle Sum property of a Quadrilateral | Using this applet, one can understand angle sum property of a quadrilateral along with testing the same for different types of quadrilaterals |

6 | Area of a Rectangle | This applet can be used to find area of a rectangle by counting number of squares inside it. One can also observe how multiplication of two numbers can be used in finding area of a rectangle or square |

7 | Area of a Square | Using this applet, a person can generalize properties of a square. |

8 | Quadrilateral Formation | Using this geogebra applet you can form different quadrilaterals like square, rectangle, parallelogram, trapezium, rhombus etc |

9 | Linear Equation | In this applet, by changing the value of coefficients and constants of the linear equation ax + by + c = 0, one can obtain desired equation and examine its representation |

10 | Solution of a pair of linear equation | This applet increases your visualisation about two linear equations, how they behave with each other when two lines can intersect, becomes parallel to each other or are overlapping to one another. Using this applet, one can understand how a line vary when its coefficients and constants change |