Tuesday 1 March 2016

Mathematics for SSC CGL 2016



1. Line segment: 
Types of Symmetry: Line Segment
103
(i) Linear symmetry possesses 1 line of symmetry i.e. perpendicular bisector of PQ
(ii) Point symmetry possesses point symmetry mid-point O of line segment PQ
(iii) Rotational symmetry possesses rotational symmetry of order 2 about O.

2. Rectangle:
Types of Symmetry: Rectangle
103
(i) Linear symmetry possesses 2 lines of symmetry. Line joins the mid-point of 2 parallel sides. 
(ii) Point symmetry possesses point symmetry with point of intersection of diagonals as the centre of symmetry.
(iii) Rotational symmetry possesses rotational symmetry of order 2.

3. Rhombus:
Types of Symmetry: Rhombus
103
(i) Linear symmetry possesses 2 lines of symmetry i.e. 2 diagonals of the rhombus
(ii) Point symmetry possesses point symmetry with point of intersection of diagonals as the center of symmetry.
(iii) Rotational symmetry possesses rotational symmetry of order 2.

4. Square:
Types of Symmetry: Square
103
(i) Linear symmetry possesses 4 lines of symmetry, 2 diagonals and 2 lines joining the mid-point of opposite sides.
(ii) Point symmetry possesses point symmetry with point of intersection of diagonal.
(iii) Rotational symmetry possesses rotational symmetry of order 4.

5. Circle:
Types of Symmetry: Circle
103
(i) Linear symmetry possesses infinite lines of symmetry of order 4
(ii) Point symmetry possesses point symmetry about the center O
(iii) Rotational symmetry possesses rotational symmetry of an infinite order


2. Name and draw the shape which possesses linear symmetry but no point symmetry and rotational symmetry?
1. An angle:
Types of Symmetry: An angle
103
(i) Linear symmetry possesses 1 line of symmetry i.e. angle bisector
(ii) No point symmetry
(iii) No rotational symmetry

2. An isosceles triangle:
Types of Symmetry: An Isosceles Triangle
103
(i) Linear symmetry possesses 1 line of symmetry i.e. perpendicular bisector l.
(ii) No point symmetry
(iii) No rotational symmetry

3. Semi-circle:
Types of Symmetry: Semi-circle
103
(i) Linear symmetry possesses 1 line of symmetry i.e. perpendicular bisector of the diameter XY
(ii) No point symmetry
(iii) No rotational symmetry

4. Kite:
Types of Symmetry: Kite
103
(i) Linear symmetry possesses 1 line of symmetry i.e. diagonal QS
(ii) No point symmetry
(iii) No rotational symmetry

5. Isosceles trapezium:
http://www.math-only-math.com/images/types-of-symmetry-isosceles-trapezium.png
(i) Linear symmetry possesses 1 line of symmetry. Line XY joins the mid-point of 2 parallel sides.
(ii) No point symmetry
(iii) No rotational symmetry

3. Name and draw the shape which possesses linear symmetry and rotational symmetry but no point symmetry?
Equilateral triangle:
Types of Symmetry: Equilateral Triangle
103
(i) Linear symmetry possesses 3 lines of symmetry i.e. the 3 medians of the triangle.
(ii) No point symmetry
(iii) Rotational symmetry possesses rotational symmetry of order 3.

4. Name and draw the shape which does not possess linear symmetry, point symmetry and rotational symmetry?
Scalene triangle:
Types of Symmetry: Scalene Triangle
103
(i) No linear symmetry
(ii) No point symmetry
(iii) No rotational symmetry

5. Name and draw the shape which does not possess linear symmetry but possesses point symmetry and rotational symmetry?
Parallelogram:
Types of Symmetry: Parallelogram
103
(i) Linear symmetryNo linear symmetry
(ii) Point symmetry possesses point symmetry with point of intersection of diagonals
(iii) Rotational symmetry possesses rotational symmetry of order 2.

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