Engineering Drawing Lab Manual

ENGINEERING GRAPHICS LAB MANUAL

NAME: ROLL NO: GROUP: BRANCH: GROUP TEACHER:

SHEET NO.: 1

INTRODUCTION : Technical drawing is the language of engineers. It is graphical language Introduction

which is universally accepted and used. Without the knowledge of engineering drawing, an engineer is unable to communicate his ideas and eventually would not have been able to construct the various magnificent structures or design intricate machinery. Therefore anyone connected with engineering construction, must understand this language of engineers. Technical drawing is therefore indispensable today and shall continue to be as long as engineering and technology continue to be part of human activities. The subject engineering graphics will help the students in many ways from drawing images, describing the shape, size, finish, colour and finally constructing any object. Student will learn the basic concept of orthographic projection, projection , projection of points, lines, planes, solids, section of solids, and development of surfaces of solids and Isometric projections. This understanding will also help them in interpreting the expressions of others. Engineering Drawing is a universal graphic language of the engineers. It is used by them to develop and record their ideas and transmit them to others for execution. Every language has its own rules of grammar. Engineering Drawing also has its grammar in the theory of projection, its punctuation in the types of lines, its abbreviation’s, symbols & descriptions in the constructions. NEED & SCOPE OF ENGINEERING GRAPHICS: offers students an insight into the methods to tackle  Engineering drawing offers engineering problems.  It teaches us the principle of accuracy, exactness & positiveness with regards to the information necessary for the production of the engineering components.  It develops the engineering imagination i.e. so essential for creation of successful design. Drawing Sheet: There are different qualities of papers available in the market. Quality of paper to be used depends upon the nature of drawing. The drawing sheet should be uniform in thickness, of such a quality that the erasing marks are not visible and the ink should not spread out. One side of the drawing sheet is rough and other side is smooth. Smooth side is used for drawing work. Sizes

of

Drawing

: Standard sizes of trimmed and untrimmed sheets Sheet

according to BIS are given in the table no.1.1:

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L a y o u t o f d r a w i n g S h e et et : Given specification are to be followed before commencing

the sheet work.

dimen sions are in mm Note: all dimensions

L i s t s o f d r a w i n g i n s t r u m e n t s ::-

The following set of drawing instruments and materials are required in the preparation of engineering drawing sheet. 1. Drawing board (provided) 2. Drawing sheet(A-2 Size) 3. Mini Drafter 4. Instrument box containing compass and dividers 5. Set squares 6. Drawing pin or clips or cello tape (30°-60°, 45°-45°) 7. Protractor 8. Drawing pencils (HB, H, 2H, 3H) 9. Eraser, Sharpener, Scale, 10. Plastic Pla stic Sheet Holder. Circle Master, Dusting Cloth. WWW.RCSAINI.COM , WWW.RCSAINI.BLOGSPOT.COM

Convention of lines:


A r r o w H e ad ad :

It is used as terminator on dimension lines. The points of the arrow heads on leader lines and dimension lines must make the contact with with the feature object line or extension line which represents the feature being dimensioned. The standard size ratio for all arrow heads on mechanical drawings is 3:1 (Length to Width).

Figure1.2: Dimensioning



ENGINEERING GRAPHICS Dimensioning: 1. Dimensions should be placed outside the views, except when they are cleaner more easily readable inside. 2. Dimension lines should not cross each other 3. As far as possible, dimension should not be shown shown between the dotted lines. 4. Dimension lines should be placed at about 6mm from the outlines. 5. Head should be pointed and filled in. they are made in ratio 3 to1 (Len gth) Lettering: - Writing titles, dimension, notes and other important particulars on a drawing is called lettering should therefore be done properly in clear, legible and uniform style preferably freehand and speedily. Types of letters:1. Single stoke letters:- in these letters, the thickness o line of the letter should be such as is obtained in one stoke of the pencil Single stoke letters of two types:(1) Vertical (2) Inclined Inclined letters lean to the right at angle of with the horizontal. The ratio of height to width various but in case of most of the letters it is 7:4. These are shown in following figure Gothic letters: - if stems of single stroke letters, are given more thickness, the letters are known as gothic letters.

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ENGINEERING GRAPHICS

QUESTION OF SHEET NO.1 1. Write alphabets in capital and numerals numerals in single stroke with 7:4 ratio only (Without Using Scale). 2. Draw the Conventional of lines with their description. description. 3. Draw the Figure No.1.2 with proper dimensioning dimensioning as per rules.

ENGINEERING GRAPHICS (2015-2016)

Sheet No.: 2 PROJECTION OF POINTS Projection: If straight lines are drawn from various points on the contour of an object, to meet a plane of projection, the object is said to be projected on that plane. The figure figure is formed formed by joining, in correct correc t sequence. sequence . The points at which these lines meet the plane of projection, is called projection of the object. The line from the object to the plane of projection is called projectors as shown in the figure

Figure 2.1: 2.1: Projection Orthographic Projection: Projection : When projectors are parallel to each other and also perpendicular to the plane of projection the projection is called Orthographic projection. The necessary condition for orthographic projections is that the observer should be at infinite distance w.r.t. object.


Planes of Projection: Projection : Two planes used for the orthographic projection are called reference planes or principal plane of projection. They intersect each other at right angles. They are known as:(i) Vertical Plane (VP) (ii) Horizontal Plane (HP) The vertical plane is often called the frontal plane and deno ted by the letters F.P. Projection Project ion on vertical plane (VP) is called front view or elevation. Projection on the HP is called the top view or the plan. The line of intersection of vertical plane and Horizontal Plane is called reference line and is denoted by letter XY. Profile Plane: Plane : A plane perpendicular to HP and VP is called profile plane. Projection on profile profile plane is called side view or end view. Four Quadrants: Quadrants : When the planes of projection are extended beyond the line of intersection, they form four quadrants or dihedral angles. They are numbered numbered as first, second, second, third and and fourth quadrant. quadrant. The object may be situated on any one of the quadrants. The position of the object relative to planes is described as above or below HP in front of or behind the VP. The planes of projections projections are assumed to be transparent. The projections are obtained obtained by drawing projectors projectors from the object to the planes (VP and HP) by looking from the front or from the above. The quadrants are shown in figure 2.2.


Figure 2.2: 2.2: The four Quadrants When the object lies in the first quadrant; it means means it may lie: Above HP and in in front of VP Or on HP and in front of VP Or on VP and above HP   

When the object lies in the second quadrant, it means it may be: Above HP and behind behind VP Or on HP and behind VP Or above HP and on VP   

When the object lies in the third quadrant, it means it may be: Below HP and behind VP On HP and behind VP Below HP and on VP   

When object lies in the fourth quadrant, it means it may be: Below HP and front of VP On HP and in front of VP Below HP and on VP   


Figure 2.3: 2.3 : Front View (Elevation) & Top View (Plan) First Angle Projection: Projection: (i) The object lies between observer and plane of projection. (ii) In this method, when views are drawn in their relative position, the top view comes below the the front view. In other words, the view seen from above is placed placed on on other side (i.e. (i.e. below) below) the front view. (iii) Similarly left hand and view is drawn drawn on the right side of front view and right hand side view is drawn on the left of front view. Convention of first angle projection: projection:

Third Angle Projection: (i) Plane of Projection is lies between object and observer. (ii) In this method, when views are drawn in their relative relative position, position, the top comes above the front view. In other words, words, the view


(iii)

seen from above is placed on the same side (i.e. above) of front view. Left hand end view is drawn drawn at left hand of front view view and right hand end view is drawn at the right side of front view. view.

Convention of third angle projection

Note: Students are required to draw on drawing Projection.

she ets in 1st Angle

As per Indian code of practice for general engineering Drawing, published in 1973, the committee responsible for preparation has left the option of selecting first or third angle projection method to users. Projection of points in different quadrants 1. Point A is h mm above above HP and g mm in front of VP. Point A is in first quadrant.

2. Point B is in the the h mm above HP and and g mm behind VP. VP. Hence B in the second quadrant.


To draw a projection i.e. front view b’ and top view b on the paper, once the third quadrant is open, HP coincide with VP and both HP & VP are above the XY line. 3. Point C is h mm below HP and g mm behind VP. Hence point point C in the third quadrant.

To draw the projections (c’ and c) on the paper, once the third quadrant is open, HP lies above XY line and VP below the XY line and draw top view above the XY line and front view below the XY line. 4. Point Po int D is h mm below HP and g mm in front of VP. Hence point D is in the fourth quadrant. To draw projections (Front view d’ and top view d), once the 1 st quadrant is opened, HP concedes with VP and both will be below the XY line. Hence front view and top view will be below the XY line.


Note: (i) (ii)

Distance of the the point above the HP or below below the HP is indicated by the position of front view. Distance of the point in front of VP or behind VP is indicated by the position of top view.


QUESTION OF SHEET NO . 2 1.

Draw the projections of the following points taking taking common reference line, keeping the distance distance between any two two consecutive points as 20mm. (i) Point A 35 mm in front of VP and 35 mm above HP. HP. (ii) Point B is in HP and 30 mm in front of VP (iii) Point C is 30 30 mm above HP and 45 mm behind behind VP. VP. (iv) Point D is in VP and 45 mm above HP. (v) Point E is 35 mm below HP and 55 mm behind VP (vi) Point F is in VP and 45 mm below HP. (vii) Point G is both both HP and the VP.

2.

A point P is 15 mm above HP and 20 mm infront of VP. Another part Q is 25 mm behind behind the VP and 40 mm below below HP. Draw the projections of P and Q, keeping the distance between their projectors 75 mm, draw straight lines joining their (i) top views (ii) Front views.

3.

Two point A and B are in HP. Point A is 30 mm infro infront nt of VP, while B is behind the VP. The distance between their projectors 75 mm and line joining their top views makes an angle of 45° with XY. Find the distance of the point B from the VP.

4.

A point P is 25 mm below HP and its shortest distance distance form XY(reference line) is 50mm. the point P lies in the third quadrant. Draw its projection.


SHEET NO.:3 PROJECTION OF STRAIGHT LINES-I A straight line is the shortest distance between the two points. Hence projection of straight straight line may be drawn by joining the respective respective position of its ends, which are points. The position of straight line is described with reference two reference planes. It may be 1. Parallel to HP and VP. 2. Perpendicular to HP and parallel to VP or perpendicular to VP and parallel to HP. 3. Inclined to HP and parallel to VP or Inclined to VP and parallel to HP. 4. Inclined to HP and VP.

A line AB is parallel to HP and VP Since line AB is parallel to HP and VP. Its front view view a`b` and top view ab will show true length of line AB and will be parallel to XY line I.

A line AB is perpendicular HP and parallel to VP Since a line is perpendicular to HP. It will be automatically parallel to VP since it is parallel to VP, front front view will show true length length of line AB and top view will be a point, where points a & b will meet. II.


A line AB is perpendicular to VP and parallel to HP. Since the line AB is parallel to HP. Top view will show true length of line AB and will be perpendicular to any line. Front view will be point, where both points a and b will meet.

III.

A line AB is Inclined to HP and parallel to VP. Since the line AB is parallel to VP. VP. From view will show true length of line and true inclination with HP so knowing the position of point A (as given in question) projection of end A are drawn. From the point A, line a`b` is drawn equal to length of line AB at an angle Ɵ with HP since the line AB is parallel to VP, top view ab will be parallel to XY.

IV.

A line AB included to VP and parallel to HP. Since the line AB is parallel to HP. Top view ab will show true length of line AB and true inclination with VP ( ɸ). Projection of points points A as per given given in the question drawn as a’ and a. Draw line ab as top view at angle ɸ with VP. Front view a`b` will be parallel to xy line. V.

ENGINEERING GRAPHICS (2015-2016) VI Line AB inclined to both HP and VP A given line may be inclined to both the reference planes i.e. HP and VP. In such cases, length of line and its inclination with HP and VP may be given; it may be required to draw its projections. In another case, projections of line may be given, and it may be required to determine its true length and its inclinations with HP an VP. I Case: Length of line AB and its inclination and with HP and with VP are given. Position of point point A is also given. Projections are to be drawn.

a’b’1 = Front view of Line AB ab1 = Top view of Line AB Procedure: Procedure: - Draw the front view a’ and top view a of the point A as per given question:- From a’ draw line a’b’ equal to true length of line AB and at angle angle Ɵ with the HP. - From the point a, draw a line ab equal true length of line AB and at angle ɸ with VP.

ENGINEERING GRAPHICS (2015-2016) - Draw locus ef, rs, pq and cd from the b’,a’, a and b respectively, parallel to XY line. For example ef is locus of point b’. - If a’b’ is true length of line AB a’b’ 2 projected length of a’b’ and is equal to length of top view of line AB. - Further project the point b’2 on locuslinepq such that a’b2 = ab2 = length of top view. - Now bring the point point b2 on the locus of point b i.e. i.e. line cd. Take a as centre and radius equal to ab2, draw arc b2b1. Join a to b1. ab1 is the length of top view. - Similarly of ab ab is true true length of line AB, ab3 = a`b`3 = length of front view. - Take a’ as centre and radius equal to a`b`3, and draw arc b3’b1’ to bring point b3’ on locus of point b’ i.e. ef Join a’ to b’1

Hence ab3 = a’b3’ = a’b’ 1 = length of front view. view. Note: Point b1 and b1’ projections of point b should lie on the same vertical line. II Case: Determination true length of a line and its inclination with HP and VP when projections are given. Front view a’b’ and top view ab of line AB are given. Determine true length of line AB and inclination inclination Ɵ with HP and ɸ with VP. Problem can be solved by two methods. (i) Method of rotation. (ii) Trapezoid Method.

METHOD OF ROTATION Principle: Now if front view a’b’ is made parallel to XY, the line AB becomes parallel to HP and its projection ab 1 on HP shows its true length and true inclination with VP.

ENGINEERING GRAPHICS (2015-2016) Similarly if top view ab of line AB is made parallel to VP, the line AB becomes parallel to VP and its projection on VP show its true length and true inclination with HP

Procedure: Procedure: Draw locus of point b’,a’, a and b i.e. lines ef, rs, pq and cd respectively parallel to XY. Take a’ as centre and radius equal to a’b’ and draw arc b’b2’ to make front view a’b’ parallel to XY and line AB becomes parallel to HP. Project point b2’ on the locus of point b. Join a to b1. ab1 is true length of line AB and show true inclination ɸ with VP. Similarly take a as centre and radius equal to ab, draw an arc bb2, to make top view ab parallel to XY. Now line AB becomes parallel to VP and its projection on VP shows its true length and true angle of inclination inclination with HP.


QUESTION OFSHEET NO .3 1. Straight line AB 40 mm long makes an angle of 30 to the HP. The end A is 10 mm above above the HP and 15 mm in front of of the VP. Draw the top view and front view of the line AB. 2. Straight line AB 60 mm long makes an angle of 55 to the VP and 25 to the HP. The end A is 10 mm above the HP and 10 mm infront of the VP. Draw the projections of the line AB. 3. Straight line AB 60 mm long makes an angle of of 55 to the VP and 25 to the HP. The one end of the straight line AB lies in the HP and is 20 mm infront of the VP. Draw the projections of the line AB. 4. A straight line AB is 50 mm long. Its one end A is 40 mm from the H.P. and 10 mm from V.P. and other end B is 30 mm from the V.P. and 20 mm from the H.P. Draw the projections. projections.


Sheet No.:4 PROJECTION OF STRAIGHT LINES-II TRAPEZOID METHOD Procedure: Draw the projections i.e. front view and top view of line AB as per perpendicular a’A’ equal to distance of question. A the point a’ draw perpendicular point A from XY. Further draw perpendicular perpendicular b’B1 equal to distance of b from XY line. Join A1 to B1. A1B1 shows true length of line AB. Line A1B1 and a’b’ will make angle ɸ, inclination with VP if extended back.

Similarly draw perpendicular perpendicular aA2 at a equal equal to distance distance to distance of a’ from XY. Further draw perpendicular bB2 at b equal distance of b’ from XY join A2 to B2. A2B2 shows the true length of line Ab. Ab. Line ab and A2B2 will make angle Ɵ, inclination with HP if extended back.

ENGINEERING GRAPHICS (2015-2016) Traces of a Line: When a line is inclined to a plane, it will meet that plane produced if necessary. The point of intersection of line and plane is called trace. Horizontal Trace (HT): If a line is inclined to HP, it will meet Horizontal plane then the point of intersection of line and HP is called horizontal trace (HT). Vertical Trace (VT): (VT) : If a line inclined to VP; it will meet the vertical plane. The point of intersection of line (produced back if necessary) with the VP plane is called vertical trace. Note 1: 1: If a line is inclined to HP and VP. A will have both HT and VT. Note 2: If a line is parallel to any reference plane it will have not trace with that plane.

Determining Traces of A Line : (1) A line AB is inclined to HP and parallel to VP Draw the front view a’b’ and top view ab of line. Angle of inclination Ɵ with HP is shown by front view. Produced back front front view view a’b’ till it intersect XY line at point C. From C draw perpendicular on top view ab (produced back) at a point called HT.

ENGINEERING GRAPHICS (2015-2016) (2) A line AB is inclined to VP and parallel to HP Draw the projections (Front view a’b’ and top view ab) of line AB… Angle of inclination ɸ with VP is shown by its top view. Produce back top view ab till it cuts the XY line at D. From D draw perpendicular on the extended front view a’b’. Point of intersection of front view and perpendicular from D is the vertical trace.

(3)

A line AB is inclined to HP to HP and VP: VP:

Draw the projections (front view a’b’ and top view ab) of line AB. Produce back front view a’b’ till it cut the XY line at C. From C draw perpendicular on extended top view to get HT. Produce back top view ab. It cuts the XY line at D. From D draw perpendicular on the extended front view to get VT.


QUESTION OF SHEET NO. 4

PROJECTIONS OF LINES – II 1. A line AB, 65mm long, has its end A 20mm above HP and 25 in front of VP. The end B is 50mm above HP and 65 mm in front of VP. Draw the projections of line AB and show its inclination with HP & VP (Rotational ( Rotational Method).

2. A line AB has its end A 7 mm behind VP and 18mm below HP. The end B 38mm behind VP and 49mm below HP. The distance between the end projectors is is 37mm. Draw the projection of line

and find out 8, ∅, HT, VT & TL (Rotational Method). 3. The distance between the projectors of a line is 40 mm. The end A is 20 mm away from HP HP and 30 mm away from VP & the end B is 50 mm away from HP and 10 mm away from VP. Draw the projection of line AB and determine its 8, ∅, HT, VT & TL (Trapezoid Method).

4. The end A of line AB is in the HP and 25mm behind VP. The end B is in the VP and 50mm above the HP. The distance between the projectors is 75mm. Draw the projections of line AB, and determine its true length, traces, inclination with HP & VP (Trapezoid Method).


SHEET NO.: 5 PROJECTION OF PLANES Plane Surfaces: Plane surfaces have only two dimensions i.e. length and breadth. They do not have thickness. A plane surface may have triangular, rectangular, square, pentagonal or hexagonal shape. Types of Planes: Planes : Plain may be divided in two main types:(i) Perpendicular planes (ii) Oblique planes P er e r p e n d i c u l a r p l a n e s can be sub divided into following sub types:

(a) (b) (c)

Perpendicular to both the reference planes Perpendicular to one reference plane and parallel to other Perpendicular Perpendic ular to one reference plane and inclined to other

Oblique Planes: Planes which are inclined to both the reference planes are called oblique planes. Traces of Planes: Planes : If a plane is perpendicular or inclined to a reference plane, the line in which plane surface meet with reference plane is the trace of plane. The line in which, the plane meet the HP, is called Horizontal Trace (HT). The line in which it meets with with VP is called vertical vertical trace (VT). (VT). Perpendicular Planes: Planes : (i) A square plane is perpendicular to HP and VP: Projection are shown in fig. 5.1


Figure 5.1 (iii)

A square plane perpendicular to HP and parallel to VP. Since the plane is parallel to VP front view a’b’c’d’ will show its true shape and top view will be a straight line parallel to XY as shown in fig. 5.2 5.2

Figure 5.2 Since the plane is perpendicular perpendicular to HP, it has HT and and no VT, since it is parallel to VP. (iii) A square plane perpendicular to VP and parallel to HP. Since the plane is parallel to HP, top view abcd will show its shape but no HT. Front view will be straight line parallel to XY and it also represent VT as in fig. 5.3


Figure 5.3 (iv) Square plane perpendicular perpendicular to HP and inclined inclined to VP. First assume, the plane is parallel to VO. Draw front view a’b’c’d’ first and and project top view from the front view. In the the second stage, rotate top view ad-bc at angle ɸ, inclination with VP. New top view will be ad – b1c1 Project points b 1c1 to get point b’ 1 and c’1 in the front view to get final front view a’b’1c’1d’.

Figure 5.4

ENGINEERING GRAPHICS (2015-2016) (v)A square plane perpendicular to VP and inclined to HP First assume parallel to HP and perpendicular to VP top view abcd will show the true shape of square plane. Project front view a’d’-b’c’ from top view.

Figure 5.5

In the second stage rotate front view a’d’ –b’c’ by an angle Ɵ, inclination with HP to get new front view a’d’ -b’1c’1. Project the point b’1c’1 on top view to get point b1 and c1 and to get new top view ab1c1d. (vi) Oblique Planes: The projection projection of planes, inclined inclined to both the reference planes is drawn in three stages as per the conditions given in the question.


QUESTION OF SHEET NO.5 1.

A regular pentagon of 25 mm side has one of its side in the HP. Its plane is inclined at 45 0 to HP and perpendicular to VP. Draw its projections.

2.

To project the front view and top view of a hexagon ABCDEF of 25 mm side with its base on or above H.P. and inclined to V.P. at 600.

3.

A circular plate (ABCDEFGH) of diameter 80 mm is 15 mm above HP such that it makes an angle 30 0 to the HP. The top view of diameter DH makes an angle of 60 0 with VP. Draw the projections.

4.

A square ABCD of 50 mm side has its corner A on the HP. Its diagonal AC is inclined at 30 0 to HP and its diagonal BD is inclined at 45 0 to VP and parallel to HP. Draw its projections.


SHEET NO.: 6 PROJECTION OF SOLIDS A solid has three dimensions, viz. length, breadth and thickness. To represent a solid on flat flat surface having only only length and breadth, breadth, at least two orthographic views are necessary. Sometimes, additional views are projected on Auxiliary planes, if necessary to make the description of a solid complete. Solids may be divided into two main groups:(i) Polyhedral (ii) Solids of revolutions

Polyhedral: Polyhedral are defined as solid bounded by planes called faces. When all the faces are equal and and regular, the polyhedron is said to be regular. There are five regular regular polyhedral which which may be defined defined as as stated below:(i) Tetrahedron: Tetrahedron : It has four equal faces, each one is equilateral triangle. (ii) Cube or hexahedron: hexahedron : It has six faces, each face is square. (iii) Octahedron: Each face is an Octahedron : It has eight faces. equilateral triangle. (iv) Dodecahedron: Dodecahedron: It has twelve equal equal faces and each each face is regular pentagon. (v) Icosahedrons: Icosahedrons: It has twenty faces. Each face is an equilateral triangle. Prism: Prism:

Prism is a polyhedron having two equal and similar faces called its ends or bases, parallel to each other other and joined by other faces, which are parallelograms. parallelograms. The imaginary imaginary line joining joining the centre centre of the bases is called axis. A right regular prism has its axis perpendicular to the bases. The bases may be triangular, square, pentagonal or hexagonal in shape.

ENGINEERING GRAPHICS (2015-2016) Accordingly they called as triangular, square, pentagonal hexagonal prism.

Pyramid: Pyramid is a polyhedron po lyhedron having a plane figure as base and number of triangular faces meeting at at a point called the vertex vertex or apex. The imaginary line joining the apex with the centre of base is its axis. A right and regular pyramid pyramid has its axis perpendicular perpendicular to base which is a regular plane figure. Its faces are equal isosceles triangle. As per shape of the base, they are called as Triangular, square, pentagonal and hexagonal pyramid. TRIANGULAR PYRAMID

SQUARE PYRAMID

PENTAGONALPYRAMID


SOLID OF REVOLUTIONS: REVOLUTIONS: A right circular cylinder is a solid generated by the the revolution of a rectangle about one of its sides which remain remain fixed. It has has two circular bases. The joining joining the center of of the bases is the axis. It is perpendicular to the bases. A right circular cone is a solid generated by the revolution of a right angled triangle about one of its perpendicular perpendicular sides which which is fixed. It has one circular base. Its axis joins the apex with the centre of the base to which which it is perpendicular. perpendicular. Straight lines lines drawn from the apex apex to the circumference of the base circle are all equal and are called generators of the cone. cone. The length of generator is the slant height of the cone.

CYLINDER

CONE SPHERE Figure 6.1: SOLIDS

A sphere is a solid generated by the revolution of a semicircle about its diameter as the axis. The midpoint of diameter is the centre of sphere.

Frustum of a solid: solid: When a pyramid or a cone is cut by a plane parallel to its base, thus removing the top portion, the remaining portion is called its frustum.

Truncated Solid: When a solid is cut by a plane inclined to the base, it said to be truncated. A solid may be inclined to one or both the reference planes. Accordingly projections are drawn in two and three stages respectively.


QUESTION OF SHEET NO . 6 1.

Draw the projections of a pentagonal prism, base 25 mm side and 50 mm long, resting on one of its rectangular faces on HP

with its axis inclined at 45˚ to VP. 2.

Draw the projections of a cylinder 75 mm diameter diameter 100 mm long,

lying on the HP with its axis inclined 30˚ to VP and parallel to HP. 3.

A hexagonal pyramid, base 25 mm side and axis 50 mm long, has an edge of its base on the HP. Its axis is inclined at 30˚ to HP and parallel to VP. Draw the projections.

4.

Draw the projections of a cone, base 75 mm diameter diameter and axis 100 mm long, lying on the HP on one of its generator, with the axis parallel to VP.

5.

Draw the projection of cone, base 50 mm diameter and axis 55 long, when it is resting on the HP on its base circle with the axis

making an angle of 30˚ with HP and its top view making 45˚ with the VP.


SHEET NO.: 7 SECTION OF SOLIDS In the projected views of an object, invisible features are shown by dotted lines. But when such features are too many, these lines make the view more complicated and difficult to interpret. In such cases, it is customary to imagine the object as being cut through or sectioned by planes. This imaginary plane is called the sectioned plane or the cutting plane. The part of the object between cutting plane and observer is assumed to be remove and the view is than shown in sections The projection of the section along with remaining portion of the object is called sectional view. The surface produced produced by cutting cutting the object by the section plane is called the section. It is indicated by thin section line uniformly spaced and inclined at 45 o. Section planes:- section planes or cutting planes are generally perpendicular planes. They may be perpendicular to one of the reference planes and either perpendicular parallel or inclined to other reference plane. They are usually described by their their traces. It is important to note that that projection of the section plane, plane, on the plane to which it is perpendicular, is a straight line, this line will be parallel, perpendicular or inclined to XY, depending upon the section plane being parallel, perpendicular, or inclined respectively to other reference plane. This straight line coincides with the trace of section plane. True shape of the section:The projection of the section on a reference plane, parallel to the section plane, will show the true shape of the section. Thus when, section plane is parallel to HP, the true shape of the section will be seen in sectional top view. When it is parallel to VP, the true shape will be visible in the sectional s ectional front view. But when the section plane is inclined the section has to be projected on an auxiliary plane, parallel to the section plane, to get the true

ENGINEERING GRAPHICS (2015-2016) shape. When the section plane is perpendicular to both both the reference planes, the sectional side view will show sh ow the true shape of the section. section.

Table 7.1: 7.1 : Conventions of Materials


QUESTION OF SHEET NO . 7 1) A right regular pentagonal pyramid side of base 40 mm and ht. 60 mm rest on its base in HP with one of its base edge edge perpendicular to VP. A section plane parallel to the HP cuts the axis of the pyramid at a distance distance of 25 mm from its base draw draw its front view and sectional top view. 2) A right regular pentagonal penta gonal prism, base ba se edge 40 mm and ht. 70mm is held on HP one of its base edge such that its axis is parallel to the VP and inclined to HP at 30 o. An auxiliary horizontal plane cuts the prism, intersecting its axis at a distance of 17 mm from its its top end. Draw Draw its front view view and sectional sectional top view. 3) A right regular pentagonal pyramid, side of base 40mm and ht. 70mm, rest on its base on HP, such that one its base base edges perpendicular to the VP. A section plane parallel to VP cuts the pyramid and is is at a distance distance of 8mm from the axis. Draw its top view and sectional front view. 4) A right circular circular cone diameter diameter of base 60mm and ht. 70mm, rest on its base on HP. A section planes perpendicular to VP and inclined to HP at 45 o, cuts the cone meeting its its axis at the distance 36mm from its base. Draw its front view, sectional top view and true shape of section.


SHEET NO.: 8 ORTHOGRAPHIC PROJECTION - 1 PROJECTIONS AND PROJECTION LINES (PROJECTORS): When different straight lines are drawn from various points on the contour of the object on to the plane of drawing sheet, the figure obtained on the sheet by joining different points in the correct order is known as P r o j e c t i o n of that object (Refer the Following Figure 8.1). And the lines drawn from various points on the contour of the object on to the plane of drawing sheet are called P r o j e c t o r s o r . P r o j e c t i o n L i n e s

Figure 8.1: Projection and projection lines ORTHOGRAPHIC PROJECTION: The image of the object obtained obtained on the plane plane of projection when when the projectors are from the various points on the object, parallel to each other and perpendicular to the plane of projection, then the image obtained on the plane of projection is called O r t h o g r a p h i c . Projection

ENGINEERING GRAPHICS (2015-2016) In case of simple object, only two orthographic views are required to show the length, breadth breadth and height height of the object. object. But in some cases, it becomes essential to show three orthographic projections of the object to give complete complete information information needed for the the construction of an object.


QUESTION OF SHEET NO.8 1. Following figure shows the pictorial view of a block. Draw to a full size scale, the following views in first angle projection: a. Front View (Elevation) seen from ‘A’ b. Side View seen from ‘B’ c. Top View (Plan) seen from ‘C’

2. Following figure shows the pictorial view of a block. Draw to a full size scale, the following views in first angle projection:

a. Elevation from ‘F’; b. Side View & c. Plan.

ENGINEERING GRAPHICS (2015-2016) 3. Following figure shows the pictorial view of a block. Draw to a full size scale, the following views in first angle projection:

a. Elevation from ‘F’; b. Side View & c. Plan. 4. Following figure shows the pictorial view of a block. Draw to a full size scale, the following views in first angle projection:

a. Elevation from ‘F’; b. Side View & c. Plan.


SHEET NO.: 9 QUESTION ON ORTHOGRAPHIC PROJECTION – 2 1. Draw orthographic orthographic projection (free hand) of all the wooden blocks (No. of blocks 10).


SHEET NO.: 10 ISOMETRIC PROJECTION ISOMETRIC VIEW The three dimensional view or projection of an object obtained on a plane of projection in which all the projectors are parallel but inclined at an angle of 30° to the plane of projection is known as Isometric View. In this type of projection, projection, the object is placed placed in such a way that all the three axes make equal angle with the plane of projection. It is easier to draw all the edges edges as compared with oblique oblique or perspective projections. projections.

THEORY OF ISOMETRIC VIEW It is important to know how an isometric view view is obtained on the plane of projection. Consider a cube. Let the three corners of the cube meeting at the forward corner is equally inclined to the plane of projection so that the projection to be obtained should give equal length. Therefore, any line so inclined is known as isometric line and the projection thus obtained, represent isometric projection or view. As three edges meeting at a point are equally inclined to each other, hence, the angle between two adjacent edges is equal to 360/3 = 120 o. The following figure 14.1 shows the isometric view of a cube in which the edges are parallel to the three main axes. All the edges of the cube are shortened equally. The square faces look as rhombuses. The rhombus AOBD as shown in fig. 14.1.The i sometric projection of the top square fall of the cube in which which AB is the true length of the diagonal. A square ANBM is constructed is the true length of BD. It is seen from the figure 14.1 that that when a line is inclined inclined to the plane of projection, it does not give the exact size. It is very essential to know the proportion by which various edges of the cube are shortened. This can be found found by means of a scale known known as isometric scale.


DIFFERENT POSITIONS OF ISOMETRIC AXES To show the different sides sides of the object, the object object is revolved about its three isometric axes as shown in the following figure:

DIFFERENCE BETWEEN ISOMETRIC PROJECTION AND ISOMETRIC VIEW: The Isometric Projection means to draw always the Isometric sketch by using Isometric scale and the

ENGINEERING GRAPHICS (2013-2014) Isometric scale must also be drawn along with the Isometric Projection. Isometric View means to draw Isometric sketch s ketch not necessarily taking measurements from the Isometric scale and the the Isometric scale may or may not be drawn along with the Isometric view. In this case, measurements can be taken taken directly from the the true orthographic orthographic projections because there is little difference between the isometric lengths and true length. Notes: (i) Always draw the Isometric Scale when it is mentioned in the question paper that draws the isometric projections. (ii) In case of Isometric View, Isometric Scale may or may not be drawn. Solution by both the methods is correct .


QUESTION OFSHEET NO.10 1. Draw an isometric projection of of an equilateral triangular prism having base edges of length = 35 mm and height = 50 mm; its end parallel to H.P. and one of rectangular face parallel to V.P. 2. Draw an isometric projection of a triangular pyramid of 30 mm base edges and 50 mm height standing on its base vertically. 3. Draw an isometric view of a frustum of a triangular pyramid pyramid having axis vertical, base edges = 30 mm, top edge = 15 mm and height = 40 mm. 4. The following figure shows the side view and front view of a machine block. Draw the isometric view of the block.

5. The following figure shows the side view and front view of a machine block. Draw isometric view of the block.

the


SHEET NO.:11 SCALES INTRODUCTION Sometimes it is not possible to represent the actual size of the object on the drawing sheet e.g. building, bridge, etc. So the actual size of the object is reduced to some proportion in order to accommodate on the drawing sheet. At times, actual size of the object is so small that it becomes essential to increase the actual size to some proportion to give the clear view e.g. parts of small machine, watches, measuring instruments, etc. The proportion by which the actual size is increased or decreased on the drawing is known as scale. SCALE The proportion by which the actual size of the object is increased or decreased on the drawing is known as scale. Scales are flat or triangular made of wood, celluloid, metal, etc. In drawing, standard recommended scales should be used as far as possible. On scales, different divisions represent the corresponding actual distances to some proportion, which give rapidity in marking off distances on the drawing. SIZES OF SCALE The following sizes of the scales are used in Engineering Drawing: (i) Full Size Scale: The scale, in which the actual measurements of the objects are drawn to some size on the drawing, is called full size scale. It is written on scale strip as under. 1: 1 – Drawing made to actual size. (ii) Reduced Scale: The scale, in which the actual measurements of the objects are reduced to some proportion, is called reduced scale. The standard reducing proportions are:

1: 2 – Drawing made to one half of the actual size. 1: 5 – Drawing made to one fifth of the actual size. 1 : 10 – Drawing made to one tenth of the actual size. (iii) Enlarged Scale: The scale, in which the actual measurements of the objects are increased to some proportion, is called enlarged scale. The standard reducing proportions are: 1: 50 – Drawing made to one fiftieth of the actual size.

2 : 1 – Drawing made to twice the actual size. 5 : 1 – Drawing made to five times the actual size. REPRESENTATIVE FRACTION The ratio of distance on the drawing sheet of an object to the corresponding actual distance of the object is known as Representative Fraction (R.F.).



QUESTION OF SHEET NO.11 1. To construct a plain scale to show meters and decimeters if one meter is represented by 2.5 cm and scale is long enough to measure up to 6 meters. 2. To construct a plain scale to show meters and decimeters if one 0.4 meter is represented by 1 cm and scale is long enough to measure up to 5 meters. Find R.F. and show a distance of 4 meters and 5 decimeters on the scale. 3. To construct a diagonal scale to show meters, decimeters and centimeters and long enough to measure 6 meters. If 1 meter is represented by 2.5 centimeters, find the R.F. and show on the scale, a distance of 4 meters, 5 decimeters decimeters and 6 centimeters 4. To construct a diagonal scale of of R.F. = 1/5000 to to show single meters and long enough to measure up to 600 meters. On the scale, show a distance of 457 meters

Engineering Drawing Lab Manual

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