Area and Perimeter Formulas of All 2 D Shapes

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The meaning of 2-D shapes is 2 dimensional shapes. In Geometry, a two dimensional shape is defined as a plane figure having two dimensions- length, and breadth (or width). 2 dimensional shapes are also known as rectilinear figures or plane figures. Students can also download the HD printout of Area and Perimeter Formulas of all 2 D Shapes and can stick on their pinboard. This will help them to revise and learn all the formulas for doing sums on 2-D shapes.

Area and Perimeter of Plane figures

Before getting into the formulas of area and perimeter of plane figures, let us understand the meaning of Perimeter and Area.

Perimeter: The perimeter of a plane figure is the length of its boundary.

Area: The area of a plane figure is the amount of surface enclosed by its sides.

In simple language, Perimeter is the distance around the outside of a shape and Area is the space inside the shape.


Area and Perimeter Formulas of All 2 D Shapes


Download HD quality printout of Formulas of all 2-D shapes


Formulas for Perimeter and Area of Triangle


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A Triangle is a three sided closed and plane figure.

If a, b, and c be the three sides of a triangle , then
  •  Perimeter of triangle = (a + b + c) units
  • Area of triangle (Heron’s formula) = √[s(s – a) (s – b) (s – c)] where s (semi-perimeter) = 1/2 (a + b + c)   sq. units
  •  Area of triangle = 1/2 × base × height   sq. units
  •  Area of an equilateral triangle = (√3a2)/4  sq. units
  • Area of an isosceles triangle = b/4 (4a2– b2)  sq. units
  • Area of a right-angled triangle = 1/2 × base × height  sq. units




Formulas for Perimeter and Area of Parallelogram

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A Parallelgram is a four sided closed figure with opposite sides equal and parallel.

  • Perimeter of parallelogram = 2 (sum of adjacent sides) units

  • Area of parallelogram = (base × correspoding height)   sq. units


Formulas for Perimeter and Area of Rhombus

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A Rhombus is a four sided closed figure with all sides equal and opposite sides parallel.

  • Area of rhombus = (base × corresponding height)  sq. units

  • Area of rhombus = (1/2 × length of one diagonal × length of other diagonal)  sq. units

  • Perimeter of rhombus = (4 × side)  units

Formulas for Perimeter and Area of Rectangle

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A Rectangle is a four sided closed figure with opposite sides equal and each angle 90°.
If l be the length of the rectangle and b its breadth, then

  • Perimeter of rectangle = 2(l + b)  units

  • Area of rectangle = (l × b)  sq. units 

  • Diagonal of rectangle = √(l² + b²)  units

    Formulas for Perimeter and Area of Square

    formulas-for-perimeter-and-area-of-square:


    A Square is a four sided closed figure with all sides equal and each angle 90°. 
    If a be the length of an edge of a square then,

    • Perimeter of square = 4 a  units

    • Area of square = a × a =  a sq. units

    • Diagonal of square = (√2)a  units


    Perimeter and Area of the Trapezium

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    A Trapezium is a four sided closed figure with any one pair of sides parallel to each other.

    •  Area of trapezium = 1/2 (sum of parallel sides) × (perpendicular distance between them)

                                    = 1/2 (a + b) × h   sq. units

    (if  a and b are the parallel sides of the trapezium and h be the perpendicular distance between them)

    • Perimeter = sum of 4 sides


    Circumference and Area of Circle

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    The path traced by a moving point, which always remains at a fixed distance from a fixed point, is called a Circle.

    If r be the radius and d be the diameter of the circle, then

    • Diameter (d) = 2r  units
    • Circumference of circle = 2πr = πd (where π = 3.14 or 22/7) units
    • Area of circle = πr² sq. units
    • Area of ring = Area of outer circle – Area of inner circle

                                = π (R² – r²)  sq. units

    • 1 revolution by a circular wheel = circumference of that circular wheel


    Circumference and Area of Semi-circle

    formulas-for-circumference-and-area-of-semi-circle



    Every diameter divides a circle into two equal parts, each of which is called a Semi-circle.

    If r be the radius, then

    • Circumference of semi-circle = πr + 2r  (where π = 3.14 or 22/7)  units
    • Area of semi-circle = 1/2 πr²   sq. units




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