They are of equal length.
True because the diagonals of a rectangle are equal in lengths
False. ^^^ Wronnngg! Its True (Apex). ^ No you are wrong, It is false.
true
Not true because they are a special type of parallelogram.
False. Bisecting diagonals is sufficient to guarantee a parallelogram, but the diagonals will only be perpendicular if the sides of the parallelogram are equal.
true.
Diagonals are equal in a rectangle but not in a parallelogram.
True because the diagonals of a rectangle are equal in lengths
A parallelogram is identified as a rectangle if it has four right angles (90 degrees). Additionally, the diagonals of a rectangle are equal in length and bisect each other. If you can confirm that either of these conditions holds true in a parallelogram, you can conclude that it is a rectangle.
False. ^^^ Wronnngg! Its True (Apex). ^ No you are wrong, It is false.
That is true for some parallelograms but not all. For example, the diagonals of a rhombus, kite or square are perpendicular, but those of a rectangle or general parallelogram are not.
A rectangle is a special type of parallelogram characterized by having four right angles (90 degrees). Additionally, the diagonals of a rectangle are equal in length and bisect each other, which is not necessarily true for all parallelograms. This combination of right angles and equal diagonals distinguishes rectangles from other parallelograms.
It is true only when the parallelogram is in the form of a rhombus, and thus the two diagonals are perpendicular to each other.
true
Not true because they are a special type of parallelogram.
False. Bisecting diagonals is sufficient to guarantee a parallelogram, but the diagonals will only be perpendicular if the sides of the parallelogram are equal.
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.