## Rectangle

A rectangle is a square whose the opposite sides room equal and also parallel.

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*All the angle of a rectangle are best angles.*

abdominal muscle = DC and also AD=BC

*A rectangle has two axes of line symmetry.* It has rotational the opposite of stimulate 2 i.e. ½ rotate symmetry

*The diagonals that a rectangle space equal and also bisect every other.* *(Bisect way cuts in half)*

*AC = BD.*

*OA=OB=OC=OD*

## Square

*A square is a one-of-a-kind rectangle. * *It is a rectangle v all its political parties equal.*

### abdominal ll CD and advertisement ll BC

### AB=BC=CD=DA

* A square has 4 axes of line symmetry. * * It has actually r*otational symmetry of stimulate 4 i.e. ¼ revolve symmetry

* The diagonals that a square * * (i)* *bisect** the angles of the square.* *(ii) bisect each various other at appropriate angles.* *(iii) bisect the bsci-ch.orgrner angles.*

## Kite

*A kite is a quadrilateral through one axis of line symmetry.* *It has no rotational* symmetry.

* A kite has two pairs of nearby sides equal.*

an turning back kite

The diagonals overcome at appropriate angles, however do not bisect each other.

*Rhombus*

*A rhombus is a distinct kite with two axes of symmetry.* It has actually rotational symmetry of order 2 i.e. ½ turn symmetry

*The diagonals the a rhombus bisect each other at appropriate angles.* *The diagonals of a rhombus bisect the bsci-ch.orgrner angles.*

*The opposite political parties of a rhombus room parallel. * *All the sides room equal, and also opposite angles room equal*.

*Parallelogram*

*A parallel is a quadrilateral through no axis of line symmetry.* It has actually rotational the opposite of stimulate 2 i.e. ½ revolve symmetry

* * *The opposite sides of a parallelogram space equal and parallel.* *The opposite angle of a parallelogram space equal.See more: What Is The Prime Factorization Of 112, Find Prime Factorization/Factors Of 112*

*Trapezium*

A trapezium has one pair the parallel sides. *It has no rotational* symmetry.*An simple trapezium has no axis of line symmetry* *An isosceles trapezium has one axis of line symmetry*