If you compose the two congruent triangles shown below into a single figure, which term(s) best describes the new polygon?
Well since I don't see the two triangles I can only use my imagination and take a guess. I would say square or rectangle
Hey erin we go to the same school ! im doing that postwar and postmodern unit exam could you help me out !
To determine the best term to describe the new polygon formed by composing the two congruent triangles, we need to consider the properties of the new shape.
When two congruent triangles are composed, they are typically placed side by side, with their corresponding sides and angles overlapping. The new polygon formed by combining these triangles is known as a parallelogram.
A parallelogram is a quadrilateral with opposite sides that are parallel and equal in length. It also has opposite angles that are equal. Therefore, the best term to describe the new polygon would be a parallelogram.
To determine the term(s) that best describe the new polygon formed by composing two congruent triangles, we first need to examine the properties of the triangles.
If the two triangles are congruent, it means they have the same size and shape. Congruent triangles have corresponding sides and angles that are equal.
When you compose the congruent triangles into a single figure, the new polygon formed will depend on how the triangles are arranged.
1. If the triangles are arranged side by side with one side of each triangle forming a common side, and the other two sides extend away from each other, the new polygon will be a parallelogram. A parallelogram has two pairs of parallel sides.
2. If the two triangles are arranged with their corresponding angles and sides aligned, forming a continuous shape, the new polygon will be a quadrilateral. A quadrilateral is a polygon with four sides.
However, without specific information on the arrangement of the triangles, it is difficult to provide a precise term for the new polygon. The best description would be either a parallelogram or a quadrilateral, depending on the arrangement of the congruent triangles.