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Properties of Kites- Non-vertex angles are congruent
- Diagonals are perpendicular
- The vertex diagonal bisects the other diagonal
- The vertex diagonal is an angle bisector of the vertex angles
Thursday, December 6, 2012
What Are The Properties of Kites And Trapeziods
Kite: two pairs of consecutive congruent sides
Properties of Kites
Properties of Kites
Thursday, November 29, 2012
Special Angles Created With Parallel Lines
There are 4 types of special angles that can be made with parallel lines that are cut by a transversal. A transversal is a line that intersects two or more other coplanar lines. Shown in the image below:
When the transversal cuts between the two parallel lines it forms three types of angle pairs: Corresponding angles, Alternate interior angles and Alternate exterior angles.
When the transversal cuts between the two parallel lines it forms three types of angle pairs: Corresponding angles, Alternate interior angles and Alternate exterior angles.
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| Once the Parallel lines are cut by the transversal , the corresponding angles are always congruent , unless the two angles don't equal up to 180 degrees. |
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| Since the corresponding angles angles are congruent, the alternate interior angles will be too. |
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| The alternate exterior angles will also be congruent because the interior angles are already congruent and because they're verticle angles |
Constructing Perpendicular bisectors
To find the perpendicular bisectors you need to have a compass. To find them you need to use your compass and set it to a specific length and draw an arc from two of the points, once they cross you connect the two points to form the perpendicular bisector for that line segment
Watch the video below for further explanation.
http://www.mathopenref.com/constbisectline.html
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Watch the video below for further explanation.
http://www.mathopenref.com/constbisectline.html
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The Congruence shortcuts
There are 4 different congruence shortcuts, and you use them to find out whether two triangles are congruent or not. The types are: Side-Side-Side (SSS), Side-Angle-Side (SAS), Angle-Side-Angle (ASA), and Angle-Angle-Side (AAS).
SSS: If three sides of a triangle is congruent to three sides of another triangle then they are both congruent.
SAS: If two sides of a triangle and the included angle are congruent to the two sides of another triangle and its included angle then the two triangles are congruent
ASA: Triangles are congruent if any two angles and their included side are equal in both sides.
AAS: Triangles are congruent if two pairs of corresponding angles and a pair of opposite sides are equal in both angles
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| All three sides are marked with congruent marks stating that they're both congruent |
SAS: If two sides of a triangle and the included angle are congruent to the two sides of another triangle and its included angle then the two triangles are congruent
ASA: Triangles are congruent if any two angles and their included side are equal in both sides.
AAS: Triangles are congruent if two pairs of corresponding angles and a pair of opposite sides are equal in both angles
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