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Axes of Symmetries of Shapes Simplified Revision Notes for Leaving Cert Mathematics
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Axes of Symmetries of Shapes
Overview
Symmetry is a fundamental concept in geometry that describes a shape's ability to remain unchanged under certain transformations, such as reflection. Axial symmetry refers to symmetry around a line, called the axis of symmetry. The axes of symmetry depend on the shape's geometry.
Common Shapes and Their Axes of Symmetry
Circle
- Axes of Symmetry: Infinite axes of symmetry, as every diameter acts as an axis of symmetry.
Equilateral Triangle
- Axes of Symmetry: 3.
- Each axis passes through a vertex and the midpoint of the opposite side.
Square
- Axes of Symmetry: 4.
- Two axes pass through the midpoints of opposite sides, and two pass through opposite vertices (diagonals).
Rectangle
- Axes of Symmetry: 2.
- Both axes pass through the midpoints of opposite sides.
Rhombus
- Axes of Symmetry: 2.
- Both axes are the diagonals of the rhombus.
Regular Pentagon
- Axes of Symmetry: 5.
- Each axis passes through a vertex and the midpoint of the opposite side.
Regular Hexagon
- Axes of Symmetry: 6.
- Three axes pass through opposite vertices, and three pass through the midpoints of opposite sides.
Parallelogram (Non-Rectangle)
- Axes of Symmetry: None, as opposite sides are parallel but not symmetrical about any axis.
Isosceles Triangle
- Axes of Symmetry: 1. The axis passes through the vertex and the midpoint of the base.
Kite
- Axes of Symmetry: 1. The axis passes through the two distinct vertices.
Applications of Axial Symmetry
- Reflection Symmetry: Used in geometry to determine congruency and balance in shapes.
- Design and Art: Symmetry contributes to aesthetics in designs and patterns.
- Mathematics and Physics: Helps in simplifying problems involving geometric shapes.
Summary
- Axial Symmetry: Describes symmetry around a line, known as the axis of symmetry.
- Key Shapes and Symmetries:
- Circle: Infinite axes.
- Equilateral Triangle: 3 axes.
- Square: 4 axes.
- Rectangle: 2 axes.
- Regular Hexagon: 6 axes.
- Parallelogram: No axes.
- Axial symmetry is crucial in understanding the geometric properties of shapes.
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