2. RECAP
• Construction of Graphs ( Less than Ogive or
Cumulative Frequency) Problems---------------02
3. LEARNING OBJECTIVES
• After Studying this unit, the students able to know
how to present data Graphically using Histogram,
Frequency Polygon and Curve, and Pie charts and
working out cumulative frequency
4. LEARNING OUTCOMES
• Students will be able to analyze and interpret with
in the Contexts they are written in Diagrams and to
present data Graphically using Histogram,
Frequency Polygon and Curve, and Pie charts
5. SESSION - 27
• Construction of Graphs ( More than Ogive or
Cumulative Frequency) Problems--------------02
6. Cumulative Frequencies Curve or Ogives
MEANING
• Cumulative frequency curve (Ogive) is drawn to
represent the cumulative frequency distribution. There
are two types of Ogives such as ‘less than Ogive curve’
and ‘more than Ogive curve’. To draw these curves, we
have to calculate the ‘less than’ cumulative
frequencies and ‘more than’ cumulative frequencies.
The following procedure can be followed to draw the
ogive curves:
• Less than Ogive: Less than cumulative frequency of
each class is marked against the corresponding upper
limit of the respective class. All the points are joined by
a free-hand curve to draw the less than ogive curve.
7. CONTD
• More than Ogive: More than cumulative frequency of
each class is marked against the corresponding lower
limit of the respective class. All the points are joined
by a free-hand curve to draw the more than
ogive curve.
• Both the curves can be drawn separately or in the
same graph. If both the curves are drawn in the same
graph, then the value of abscissa (x-coordinate) in the
point of intersection is the median.
8. More than Ogive curve
PROBLEM 01
The following table shows the marks obtained by 120
students of class IX in a cycle test-I .
Draw the More than Ogive curve for the following data:
Solution; The more than cumulative frequency of
number of students are plotted as points against the
marks (lower-limit). These points are joined to form
more than ogive curve.
14. SUMMARY
As we already discussed and learnt today on
Diagrammatic and Graphical Representation as below
• Construction of Graphs ( More than Ogive or
Cumulative Frequency) Problems--------------02
15. MCQs
1 . Ogive curve can be occurred for the distribution of:
(a) Less than type
(b) More than type
(c) Both (a) and (b)
(d) Neither (a) and (b)
2 . The word ogive is also used for:
(a) Frequency polygon
(b) Cumulative frequency polygon
(c) Frequency curve
(d) Histogram
16. MCQs
3 . Cumulative frequency polygon can be used for the
calculation of:
(a) Mean
(b) Median
(c) Mode
(d) Geometric mean
4. The graph of the cumulative frequency distribution is
called:
(a) Histogram
(b) Frequency polygon
(c) Pictogram
(d) Ogive
17. MCQs
5 . In a cumulative frequency polygon, the cumulative
frequency of each class is plotted against:
(a) Mid-point
(b) Lower class boundary
(c) Upper class boundary
(d) Upper class limit
19. REFERENCES
• S.P. Gupta, Sultan Chand and Sons Publications, 2017
• S. C. Gupta, Himalaya Publishing House,
Fundamentals of Statistics, 2018
• R.S.N Pillai and Bagavathi, S.Chand publications, 2010
