hello can u please tell me the properties of quadilateral
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Types of quadrilaterals
There are five types of quadrilaterals.
Parallelogram
Rectangle
Square
Rhombus
Trapezium
One common property of all quadrilaterals is that the sum of all their angles equals 360°.
Let us look into the properties of different quadrilaterals.
Parallelogram

Properties of a parallelogram
Opposite sides are parallel and congruent.
Opposite angles are congruent.
Adjacent angles are supplementary.
Diagonals bisect each other and each diagonal divides the parallelogram into two congruent triangles.
If one of the angles of a parallelogram is a right angle then all other angles are right and it becomes a rectangle.
Important formulas of parallelograms
Area = L * H
Perimeter = 2(L+B)
Rectangles

Properties of a Rectangle
Opposite sides are parallel and congruent.
All angles are right.
The diagonals are congruent and bisect each other (divide each other equally).
Opposite angles formed at the point where diagonals meet are congruent.
A rectangle is a special type of parallelogram whose angles are right.
Important formulas for rectangles
If the length is L and breadth is B, then
Length of the diagonal of a rectangle = √(L2 + B2)
Area = L * B
Perimeter = 2(L+B)
Squares

Properties of a square
All sides and angles are congruent.
Opposite sides are parallel to each other.
The diagonals are congruent.
The diagonals are perpendicular to and bisect each other.
A square is a special type of parallelogram whose all angles and sides are equal.
Also, a parallelogram becomes a square when the diagonals are equal and right bisectors of each other.
Important formulas for Squares
If ‘L’ is the length of the side of a square then length of the diagonal = L √2.
Area = L2.
Perimeter = 4L
Rhombus

Properties of a Rhombus
All sides are congruent.
Opposite angles are congruent.
The diagonals are perpendicular to and bisect each other.
Adjacent angles are supplementary (For eg., ∠A + ∠B = 180°).
A rhombus is a parallelogram whose diagonals are perpendicular to each other.
Important formulas for a Rhombus
If a and b are the lengths of the diagonals of a rhombus,
Area = (a* b) / 2
Perimeter = 4L
Trapezium

Properties of a Trapezium
The bases of the trapezium are parallel to each other (MN ⫽ OP).
No sides, angles and diagonals are congruent.
Important Formulas for a Trapezium
Area = (1/2) h (L+L2)
Perimeter = L + L1 + L2 + L3
There are five types of quadrilaterals.
Parallelogram
Rectangle
Square
Rhombus
Trapezium
One common property of all quadrilaterals is that the sum of all their angles equals 360°.
Let us look into the properties of different quadrilaterals.
Parallelogram

Properties of a parallelogram
Opposite sides are parallel and congruent.
Opposite angles are congruent.
Adjacent angles are supplementary.
Diagonals bisect each other and each diagonal divides the parallelogram into two congruent triangles.
If one of the angles of a parallelogram is a right angle then all other angles are right and it becomes a rectangle.
Important formulas of parallelograms
Area = L * H
Perimeter = 2(L+B)
Rectangles

Properties of a Rectangle
Opposite sides are parallel and congruent.
All angles are right.
The diagonals are congruent and bisect each other (divide each other equally).
Opposite angles formed at the point where diagonals meet are congruent.
A rectangle is a special type of parallelogram whose angles are right.
Important formulas for rectangles
If the length is L and breadth is B, then
Length of the diagonal of a rectangle = √(L2 + B2)
Area = L * B
Perimeter = 2(L+B)
Squares

Properties of a square
All sides and angles are congruent.
Opposite sides are parallel to each other.
The diagonals are congruent.
The diagonals are perpendicular to and bisect each other.
A square is a special type of parallelogram whose all angles and sides are equal.
Also, a parallelogram becomes a square when the diagonals are equal and right bisectors of each other.
Important formulas for Squares
If ‘L’ is the length of the side of a square then length of the diagonal = L √2.
Area = L2.
Perimeter = 4L
Rhombus

Properties of a Rhombus
All sides are congruent.
Opposite angles are congruent.
The diagonals are perpendicular to and bisect each other.
Adjacent angles are supplementary (For eg., ∠A + ∠B = 180°).
A rhombus is a parallelogram whose diagonals are perpendicular to each other.
Important formulas for a Rhombus
If a and b are the lengths of the diagonals of a rhombus,
Area = (a* b) / 2
Perimeter = 4L
Trapezium

Properties of a Trapezium
The bases of the trapezium are parallel to each other (MN ⫽ OP).
No sides, angles and diagonals are congruent.
Important Formulas for a Trapezium
Area = (1/2) h (L+L2)
Perimeter = L + L1 + L2 + L3
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