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Drishti Innovations

Geometry

Geometry

What you'll learn

  • Find angle sums in polygons and quadrilaterals
  • State and use properties of parallelograms, rectangles, rhombuses, squares, and trapeziums
  • Construct quadrilaterals given sufficient measurements
  • Identify faces, edges, and vertices of 3-D shapes and use Euler's formula

Key concepts

Understanding Quadrilaterals

Angle Sum Properties

Polygon angle sum formula: Sum of interior angles of an n-sided polygon = (n − 2) × 180°

PolygonSides (n)Angle sum
Triangle3180°
Quadrilateral4360°
Pentagon5540°
Hexagon6720°
Octagon81080°

Sum of exterior angles of any convex polygon = 360° (one exterior angle per vertex)

Worked Example: Three angles of a quadrilateral are 75°, 110°, and 95°. Find the fourth. Sum = 360° → Fourth angle = 360° − (75 + 110 + 95) = 360° − 280° = 80°

Properties of Quadrilaterals

Hierarchy: Square ⊂ Rectangle ⊂ Parallelogram and Square ⊂ Rhombus ⊂ Parallelogram

Parallelogram:

PropertyDetail
Opposite sidesEqual and parallel
Opposite anglesEqual
Consecutive anglesSupplementary (add to 180°)
DiagonalsBisect each other

If one angle of a parallelogram = 70°, the adjacent angle = 110°, opposite angle = 70°.

Rectangle:

PropertyDetail
All parallelogram propertiesApply
All angles90° each
DiagonalsEqual in length AND bisect each other

Rhombus:

PropertyDetail
All parallelogram propertiesApply
All sidesEqual
DiagonalsPerpendicular bisectors of each other
DiagonalsBisect the vertex angles

Area of rhombus = (d₁ × d₂) / 2, where d₁ and d₂ are the diagonals.

Square:

PropertyDetail
All rectangle AND rhombus propertiesApply
All sidesEqual
All angles90°
DiagonalsEqual, perpendicular, bisect each other at 90°, bisect vertex angles at 45°

Trapezium:

PropertyDetail
One pair of opposite sidesParallel (called bases)
Sum of co-interior angles180° (between the parallel sides)
DiagonalsGenerally unequal and do NOT bisect each other

Isosceles trapezium: Non-parallel sides are equal; base angles are equal; diagonals are equal.

Comparison table:

ShapeAll sides equalAll angles 90°Diagonals equalDiagonals ⊥Diagonals bisect
ParallelogramNoNoNoNoYes
RectangleNoYesYesNoYes
RhombusYesNoNoYesYes
SquareYesYesYesYesYes
TrapeziumNoNoNoNoNo

Construction of Quadrilaterals

A quadrilateral has 5 independent measurements (from its 4 sides and 2 diagonals or angles). You need at least 5 to construct it uniquely.

Cases:

GivenElements
Case 1Four sides + one diagonal
Case 2Four sides + one angle
Case 3Three sides + two diagonals
Case 4Three sides + two included angles
Case 5Special quadrilateral (e.g. rhombus: 1 side + 1 diagonal)

Worked Example — Case 1: Construct quadrilateral PQRS with PQ = 5 cm, QR = 4 cm, RS = 6 cm, SP = 3.5 cm, and diagonal PR = 6.5 cm. Steps:

  1. Draw PQ = 5 cm.
  2. With P as centre and radius 6.5 cm, and Q as centre and radius 4 cm, intersect to find R.
  3. With P as centre and radius 3.5 cm, and R as centre and radius 6 cm, intersect to find S.
  4. Join all vertices.

Constructing a parallelogram: Opposite sides are equal, so only 3 measurements needed (2 adjacent sides + 1 angle, or 2 sides + diagonal).

Worked Example — Rhombus: Side = 5 cm, diagonal = 8 cm. Draw diagonal AC = 8 cm. With A and C as centres and radius 5 cm each, draw arcs intersecting at B (above) and D (below). Join ABCD.

Visualising Solid Shapes

Faces, Edges, Vertices

SolidFaces (F)Edges (E)Vertices (V)
Cube6128
Cuboid6128
Triangular prism596
Square pyramid585
Triangular pyramid (tetrahedron)464
Cone21 (curved)1
Cylinder32 (circular)0
Sphere100

Euler's Formula

For any convex polyhedron:

F + V − E = 2

ShapeFVEF + V − E
Cube68126+8−12 = 2
Triangular prism5695+6−9 = 2
Square pyramid5585+5−8 = 2

Worked Example: A solid has 7 faces and 10 vertices. How many edges does it have? F + V − E = 2 → 7 + 10 − E = 2 → E = 15

Nets of Solids

A net is a 2-D shape that folds to make a 3-D solid.

SolidNet description
Cube6 equal squares in a cross or T-shape
Cuboid6 rectangles (3 pairs of equal rectangles)
Square pyramid1 square + 4 triangles around it
Triangular prism2 triangles + 3 rectangles

Views of 3-D Shapes

  • Front view (elevation): seen from the front
  • Side view: seen from the left or right
  • Top view (plan): seen from above

A cube seen from any direction looks like a square. A cylinder from the front looks like a rectangle; from the top, a circle.

Quick check

  1. Find the value of x: angles of a quadrilateral are 3x, 2x, 4x, and (x+20)°.
  2. The diagonals of a rhombus are 10 cm and 24 cm. Find the side of the rhombus.
  3. A solid has 12 edges and 6 faces. Use Euler's formula to find the vertices.
  4. State TWO properties that a square has but a rectangle does not.
  5. Draw the net of a triangular prism and label all faces.

Open the Practice tab for graded questions on Geometry.

4 topics • Notes • Practice • AI explanations available

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