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Title: Dimensioning%20

1
Dimensioning Scaling

CIVIL ENGINEERING DRAWING

2
General Rules for Dimensioning

Dimensioning should be done so completely that
further calculation or assumption of any
dimension or direct measurement from drawing is
not necessary.
Every dimension must be given but none should be
given more than once.
The dimension should be placed on the view where
its use is shown more clearly.
Dimensions should be placed outside the views.
Mutual crossing of dimension lines and
dimensioning between hidden lines should be
avoided.
Dimension line should not cross any other drawing
of the line.
An outline or a centre line should never be used
as a dimension line. A centre line may be
extended to serve as an extension line.
Aligned system of dimensioning is recommended.

3
Representation of Scales

Scale can be expressed in the following two ways.
Engineering Scale
Engineering scale is represented by writing the
relation between the dimension on the drawing and
the corresponding actual dimension of the object
itself. It is expressed as
1mm1mm
1mm5 m, 1mm8km
1mm0.2mm, 1mm5µm
The engineering scale is usually written on the
drawings in numerical forms.
Graphical Scale
Graphical scale is represented by its
representative fraction and is captioned on the
drawing itself. As the drawing becomes old, the
drawing sheet may shrink and the engineering
scale would provide inaccurate results.
However, the scale made on the drawing sheet
along with drawing of object will shrink in the
same relative proportion. This will always
provide an accurate result. It is a basic
advantage gained by graphical representation of a
scale.

4
Representative Fraction (R.F.)

Representative fraction is defined as the ratio
of the length of an element of the object in the
drawing to the corresponding actual length of the
corresponding element of the object itself.

5
Representative Fraction (R.F.)

Example 1
If 1 cm length of drawing represents 5m length
of the object than in engineering scale it is
written as 1cmcm5m and in graphical scale it is
denoted by

6
Representative Fraction (R.F.)

Example 2
If a 5cm long line in the drawing represents 3
km length of a road then in engineering scale it
is written as 1cm600m and in graphical scale it
is denoted as

7
Representative Fraction (R.F.)

Example 3
If a gear with a 15cm diameter in the drawing
represents an actual gear of 6mm diameter in
graphical scale, it is expressed by
Scale 11 represents full size scale
Scale 1x represents reducing scale
Scale x1 represents enlarging scale.

8
Construction of scales

R.F. of the scale
The maximum length of scale to be drawn on the
drawing sheet
The least count of the scale, i.e. minimum length
which the scale should show and measure
The maximum length of the scale to be drawn on
the drawing sheet is determined by the following
expression

9
Types of Scale

Scales are classified as
Plain scale
Diagonal Scale
Comparative Scale (plain and Diagonal Type)
Vernier Scale

10
Plain Scale

The plain scale is used to represent two
consecutive units i.e., a unit and its
sub-division. Example
Meter and decimeter
Kilometer and hectometer
Feet and inches
In every scale the zero should be placed at the
end of first main division.
From zero mark the units should be numbered to
the right and its subdivision to the left.
The names of the units and the subdivision should
be stated clearly below or at the respective
ends.
The name of the scale or its R.F. should be
mentioned below the scale.
Steps
Determine R.F. of the scale
Determine length of the scale using the formula
mentioned earliar
Draw the line of the length of scale.
Mark zero at the end of first division and
1,2,3,4 and onward etc. at the end of each
subsequent division to its right.
Divide the first division into 10-15 equal
subdivisions, each division represents the least
count of the scale.
Mark the units

11
Plain Scale

Exercise
Problem 1 Construct a scale of 14 to show
centimeters and long enough to measure upto 5
decimeters
Problem 2 Draw scale of 160 to show meters and
decimeters and long enough to measure 6 meters.
Problem 3 Construct a scale of 1.5 inches 1
foot to show inches and long enough to measure 4
feet
Problem 4 Construct a scale of R.F. 1/60 to
read yards and feet and long enough to measure
upto 5 yards.

12
Diagonal Scale

A diagonal scale is used when very minute
distances such as 0.1 mm etc. are to be
accurately measured or when measurements are
required in 3 units e.g. decimeter, centimeter
and millimeter or yard, foot and inch.
Small divisions of short lines are obtained by
the principal of diagonal division
Principle of Diagonal Scale
To obtain the divisions of given short line A B
in multiples of 1/10 its length e.g. 0.1AB,
0.2AB, 0.3AB etc.
Draw line AB
Draw perpendicular from B to C
Divide BC in 10 equal parts
Number the division points 9,8,7,,1 as shown.
Join A to C
Through the points 1,2 etc. draw lines parallel
to AB and cutting AC at 1,2 etc.
Through the rules of similar triangles 11
0.1AB, 22 0.2AB, 33 0.3AB and so on.

13
Diagonal Scale

Problem Construct a diagonal scale of R.F.
1/4000 to show meters and long enough to measure
upto 500 meters.
Find the length of scale
Draw line of length of scale and divide into 5
equal parts. Each part will show 100 meters.
Divide the first part into 10 equal divisions.
Each division will show 10 meters.
Add the left hand end, erect a perpendicular and
on it mark equal 10 divisions of any length.
Draw the rectangle and complete the scale as
shown.

14
Comparative Scale

Scales having same representative fraction but
graduated to read different units are called
comparative scales.
Comparative scales may be plain scales or
diagonal scales and may be constructed separately
or one above the other.

15
Comparative Scale

Problem on a railway map, an actual distance of
36miles between two stations is represented by a
10cm long line. Draw a plain scale to show a
mile, and which is long enough to read up to 60
miles. Also draw comparative scale attached to it
to show a kilometer and read up to 90 km. take
1mile1609meters
Steps
Calculate R.F.
Calculate length of scale for miles and
kilometers
Draw plain scale for both km and miles and attach
each other.

16
Vernier Scale

Vernier scale like diagonal scale are used to
read to a very small unit with great accuracy. A
vernier scale consist of two parts i) primary
scale and ii) Vernier Scale.
Primary scale is a plain scale fully divided
into minor divisions.
The graduations on the vernier are derived from
those on the primary scale.

17
GEOMETRICAL CONSTRUCTION

18
GEOMETRICAL CONSTRUCTION

BISECTING A LINE
To bisect a given straight line
To bisect a given arc
TO DRAW PERPENDICULARS
To draw a perpendicular to a given line from a
point within it
When the point is near the middle of the line
When the point is near the end of the line
To draw a perpendicular to a given line from a
point outside it
When the point is nearer the
centre than the end of the line

19
GEOMETRICAL CONSTRUCTION

TO DRAW PARALLEL LINES
To draw a line through a given point parallel to
a given straight line
To draw a line parallel to and at a given
distance from a given straight line

20
GEOMETRICAL CONSTRUCTION

TO DIVIDE A LINE
To divide a given straight line to any number of
equal parts
To divide straight line into unequal parts ( let
AB be the given line to be divided into unequal
parts say 1/6, 1/5, ¼, 1/3 and ½.)

21
GEOMETRICAL CONSTRUCTION

TO BISECT AN ANGLE
To bisect a given angle
To draw a line inclined to a given line at an
angle equal to a given angle

22
GEOMETRICAL CONSTRUCTION

TO TRISECT AN ANGLE
To trisect given right angle

23
GEOMETRICAL CONSTRUCTION

TO FIND THE CENTRE OF AN ARC
To find the centre of given arc
To draw an arc of a given radius, touching a
given straight line and passing through a given
point

24
GEOMETRICAL CONSTRUCTION

TO FIND THE CENTRE OF AN ARC (contd.)
To draw an arc of a given radius touching two
given straight lines at right angles to each
other
To draw an arc of a given radius touching two
given straight lines which make any angle between
them.

25
GEOMETRICAL CONSTRUCTION

TO FIND THE CENTRE OF AN ARC (contd.)
To draw an arc of a given radius touching a given
arc and a given straight line.
a) Case 1
b) Case 2

26
GEOMETRICAL CONSTRUCTION

TO FIND THE CENTRE OF AN ARC (contd.)
To draw an arc of a given radius touching two
given arcs
Case 1 b) Case 2
c) Case 3

27
GEOMETRICAL CONSTRUCTION

TO FIND THE CENTRE OF AN ARC (contd.)
To draw an arc passing through three given points
not in a straight line
To draw continuous curve of circular arcs passing
through any number of given points not in a
straight line

28
GEOMETRICAL CONSTRUCTION

Steps
Let A, B, C, D, and E be the given points.
Draw lines joining A with B, B with C, C with D
etc.
Draw perpendicular bisectors of AB and BC
intersecting at O.
With O as centre and radius equal to OA, draw an
arc ABC.
Draw a line joining O and C.
Draw the perpendicular bisector of CD
intersecting OC or OC produced, at P.
With P as centre and radius equal to PC, draw an
arc CD.
Repeat the same construction. Note that the
centre of the arc is at the intersection of the
perpendicular bisector and the line, or the
line-produced, joining the previous centre with
the last point of the previous arc.

29
GEOMETRICAL CONSTRUCTION

TO CONSTRUCT REGULAR POLYGON
To construct a regular polygon, given the length
of its side, let the number of sides of the
polygon be seven.
Method 1
Inscribe Circle Method
b) Arc Method

30
GEOMETRICAL CONSTRUCTION
Method 2
31
GEOMETRICAL CONSTRUCTION