This applet models how to count the number of squares in the chessboard.

## Thursday, April 17, 2014

## Monday, February 10, 2014

### Midsegmens and Congruent Triangles

A

Irina Boyadzhiev, 9 February 2014, Created with GeoGebra

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Irina Boyadzhiev's GeoGebra Applets

*midsegment*of a triangle is a segment that connects the midpoints of any two sides of the triangle. This applet demonstrates that the three midsegments of any triangle divide the original triangle in four congruent triangles. The demonstration is based on the following properties:- The midsegment is parallel to the third side of the triangle.
- Any parallelogram has a rotational symmetry with center the intersection point of the diagonals and angle of rotation 180∘

Irina Boyadzhiev, 9 February 2014, Created with GeoGebra

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Irina Boyadzhiev's GeoGebra Applets

## Wednesday, January 29, 2014

### The Area of the Median Triangle - Dynamic Proof

Let ABC be a given triangle. The triangle with sides equal to the medians of ABC is called the

We will show that the area of the median triangle is 3/4 of the area of the original triangle ABC.

Irina Boyadzhiev, 29 January 2014, Created with GeoGebra

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Irina Boyadzhiev's GeoGebra Applets

*Median Triangle.*We will show that the area of the median triangle is 3/4 of the area of the original triangle ABC.

- Drag the two sliders to the end to construct the median triangle by translating the medians.

- Click the Rearrange checkbox. This will show a green point at the vertex of the median triangle.
- Drag the green point to C.
- Drag the green point at B to M
_{c}. - Drag the green point at M
_{a}to M_{c}.

Irina Boyadzhiev, 29 January 2014, Created with GeoGebra

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Irina Boyadzhiev's GeoGebra Applets

Labels:
area median triangle

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