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Is is true if two parallelograms have corresponding sides that are equal they must be congruent?
yes it is ture
The statement two parallelograms are similar is always never or sometimes true?
It is sometimes true that two parallelograms are similar. The could be congruent, or dissimilar in that one is not an enlargement of the other.
What must be true if two like segments are congruent?
They must be the same length.
What is the ways to prove that a quadrilateral is a parallelogram?
If it is a parallelogram, then it has two sets of parallelogram sides. Parallelograms' opposite angles are congruent A parallelogram's bisectors are congruent. * * * * * A parallelogram's bisectors are NOT congruent.
Assume that two chords in a given circle are the same distance from the center of the circle Which of the following must also be true?
They must be congruent.
Is is true if two parallelograms have corresponding sides that are equal they must be congruent?
yes it is ture
What are two parallegrams that are congruent?
They are simply two congruent parallelograms.
The statement two parallelograms are similar is always never or sometimes true?
It is sometimes true that two parallelograms are similar. The could be congruent, or dissimilar in that one is not an enlargement of the other.
What is are the relationships between parallelograms?
A parallelogram has two sets of parallel sides. Opposite sides of a parallelogram are congruent. This means that opposite angles are congruent as well. All parallelograms must fit this description or else it's not a parallelogram.
How many congruent angles does a parallelograms?
Two pairs.
Can the diagonals of two different parallelograms be congruent?
They could be congruent, but not necessarily. It cannot be assumed that they are.
If two angles of a triangle are congruent then the sides opposite those angles may not be congruent?
False. They must be congruent.
What must be true if two like segments are congruent?
They must be the same length.
Two segments that have the same measure must be congruent?
True
Two angles that have the same measure must be congruent?
true
If two line segments have the same length must be true?
They are congruent.
Does obtuse triangle have any angles congruent?
An obtuse triangle must have two acute angles and these can be congruent.
The opposite sides of a rectangle are?
The opposite sides of a rectangle are congruent or equal. This is true because a rectangle, which is a parallelogram, must adhere to properties belonging to parallelograms. Some of these properties include that a parallelogram has two pairs of opposite sides that are congruent, and that it has diagonals that bisect one another.
Why does a parallelogram have two pairs of parallel sides?
That is how it is defined: parallelograms have two sides that have congruent adjacent angles, so that the remaining two sides must be parallel and equal in length. Parallelograms include rectangles (all right angles), squares (all right angles), rhomboids, and rhombi (the latter two have congruent but non-right angles, and a rhombus has 4 equal sides).
What quadrilaterals have two pairs of congruent sides?
Parallelograms Rhombuses Rectangles Squares
What is a solid with two parallel bases that are congruent polygons and the lateral faces are parallelograms?
A prism.
A polyhedron with two parallel congruent bases and all other faces being parallelograms is what?
It is a skew prism. If the parallelograms are rectangles then it is a right prism.
What Two line segments are congruent must be true?
If two line segments are congruent, it must be true that they have the same length. This means that if you measure both segments, they will be equal in distance from one endpoint to the other. Additionally, congruent segments can be superimposed on each other, matching perfectly in length and endpoints.
What figure has two congruent parallel bases and its other six faces are parallelograms?
None!! ha
Can all parallelograms be split into to congruent triangles why?
Yes, all parallelograms can be split into two congruent triangles. This is achieved by drawing a diagonal line connecting two opposite vertices. This diagonal divides the parallelogram into two triangles that are congruent by the Side-Angle-Side (SAS) postulate, as they share a side (the diagonal), and the angles formed at the vertices are equal.
