Justify
ALL SQUARES ARE NOT PARALLELOGRAMS
Answers
Answered by
4
hey mate!
here's your answer:
Every square is a parallelogram, as by definition, a square is a rectangle with all sides equal. A rectangle is a special parallelogram satisfying the condition that all of its internal angles are equal to one another. From this argument, it is evident that every parallelogram is not a square - squares are but a small subset of the parallelograms.
i hope this will helps you
please mark my answer as brainlist
vamritaeunameun:
please mark my answer as brainlist
Similar questions