Presentation is loading. Please wait.

Presentation is loading. Please wait.

Lecture 2: The straight line By Dr. Samah Mohamed Mabrouk www.smmabrouk.faculty.zu.edu.eg By Dr. Samah Mohamed Mabrouk www.smmabrouk.faculty.zu.edu.eg.

Published byLester Howard Modified over 8 years ago

Similar presentations

Presentation on theme: "Lecture 2: The straight line By Dr. Samah Mohamed Mabrouk www.smmabrouk.faculty.zu.edu.eg By Dr. Samah Mohamed Mabrouk www.smmabrouk.faculty.zu.edu.eg."— Presentation transcript:

1 Lecture 2: The straight line By Dr. Samah Mohamed Mabrouk www.smmabrouk.faculty.zu.edu.eg By Dr. Samah Mohamed Mabrouk www.smmabrouk.faculty.zu.edu.eg

2 The straight line 1- Representation of a straight line. 2- Special positions of a straight line. 3- True length of a straight line. 6- Examples 4-The mutual position of two straight lines in the space 5-Traces of a str. Line

3 The straight line 1- Representation of a straight line. 1- Two points. 2- A point and direction C B d A m m

4 Represent the three projections of a straight line m{A(2,2,5)and B(6,5,1)} Z +, y - Z -, y + x +, y - x-, y + B1B1 A1A1 B2B2 A2A2 m3m3 B3B3 A3A3 m2m2 m1m1 m 1 is the horizontal projction m 2 is the vertical projction m 3 is the profile(side) projction

5 Find the missing projections Z +, y - Z -, y + x +, y - x-, y + B1B1 A1A1 B2B2 A2A2 m3m3 B3B3 A3A3 m2m2 m1m1 L : A 1 L : A 3 L : B 2 L : B 1 مساقط النقطه تقع على مساقط الخط

6 X +,y -- X --,y+ z +,y -- Z --,y + Special positions of a str. line  1- m //  1 (Horizontal line) m2m2 m3m3 m 1 = T.L الخط الموازى للمستوى مسقطه على هذا المستوى = طوله الحقيقى (True length)

7 X +,y -- X --,y+ z +,y -- Z --,y + 2- m //  2 frontal line m1m1 m3m3 m 2 = T.L    ( m,  1 )   ( m,  2 )   ( m,  3 )

8 X +,y -- X --,y+ z +,y -- Z --,y + 3- m //  3 profile line m2m2 m1m1 m 3 = T.L  

9 X +,y -- X --,y+ z +,y -- Z --,y + 4- m   1 m1m1 m 3 = T.L m 2 = T.L الخط العمودى على مستوى مسقطه على هذا المستوى = نقطة وعلى باقى المستويات = طول حقيقى

10 X +,y -- X --,y+ z +,y -- Z --,y + 5- m   2 m2m2 m 3 = T.L m 1 = T.L

11 X +,y -- X --,y+ z +,y -- Z --,y + 6- m   3 m3m3 m 2 = T.L m 1 = T.L

12 True length of a straight line Z +, y - Z -, y + x +, y - x-, y + B1B1 A1A1 B2B2 A2A2 m3m3 B3B3 A3A3 m2m2 m1m1 zBzB  z AB zAzA T.L. of m  B1B1  A1A1  z AB

13 True length of a straight line Z +, y - Z -, y + x +, y - x-, y + B1B1 A1A1 B2B2 A2A2 m3m3 B3B3 A3A3 m2m2 m1m1  y AB T.L. of m yAyA yByB B2B2  A2A2  y AB 

14 True length of a straight line Z +, y - Z -, y + x +, y - x-, y + B1B1 A1A1 B2B2 A2A2 m3m3 B3B3 A3A3 m2m2 m1m1  x AB T.L. of m xAxA xBxB B3B3  A3A3  x AB 

15 B1B1  T.L. of m A1A1  z AB B2B2  T.L. of m A2A2  y AB B3B3  T.L. of m A3A3  x AB Triangles of solution

16 Example(1): Find the true length of a straight line AB where A(2, 2, 5) and B(6, 3, 1) and then get the point C which at distance 2 from A Z +, y - Z -, y + x +, y - x-, y + B1B1 A1A1 B2B2 A2A2  y AB T.L. of AB 2 C2C2 [C] C1C1  y AB [B]

17 The mutual position of two straight lines in the space x 12 m1m1 n1n1 m2m2 n2n2 m  n  m 1  n 1, m 2  n 2, m 3  n 3 n2n2 m2m2 m1m1 n1n1 Q1Q1 Q2Q2 2- الخطان متقاطعان 1- الخطان متوازيان

18 The mutual position of two straight lines in the space x 12 n2n2 m2m2 m1m1 n1n1 Q1Q1 P2P2 2- الخطان متخالفان

19 Z +, y - Z -, y + x +, y - x-, y + H1H1 H2H2 m3m3 H3H3 m2m2 m1m1 Traces of a str. Line 1- Horizontal trace H are the points of intersection with principal plane H 2 and H 3  x-axis H   1 and H  m  z H =0, m   1 = H

20 Z +, y - Z -, y + x +, y - x-, y + V1V1 V2V2 m3m3 V3V3 m2m2 m1m1 Traces of a str. line L:V 2 L:V 3 2- Vertical trace V V 1  x, V 3  z V   2 and V  m  y V =0, m   2 = V

21 Z +, y - Z -, y + x +, y - x-, y + m3m3 L:S 3 m1m1 Traces of a str. line S1S1 S2S2 S3S3 3- Side trace S S 1 and S 2  z-axis  x S =0, m   3 = S S   3 and S  m m2m2

22 Z +, y - Z -, y + x +, y - x-, y + H1H1 V1V1 V2V2 H2H2 m3m3 H3H3 V3V3 m2m2 m1m1 Traces of a str. line S1S1 S2S2 S3S3

23 Example(2): Given A 2 B 2 the vertical projection of a segment AB and the horizontal projection A 1 of the point A and <(AB,  3 )=45 ,find the remaining projections of AB Z +, y - Z -, y + x +, y - x-, y + B1B1 A1A1 B2B2 A2A2  x AB yAyA A3A3 B3B3 T.L. of AB A3A3 B\3B\3 B3B3 yAyA L :B 3 L :A 3 L :B 1 45 

24 Example(3): Given the straight line m in general position and a point A lying on m required, find a point M on m at a distance 4cm from A x +, y - x-, y + B1B1 A1A1 B2B2 A2A2  z AB m2m2 [M] m1m1 4  z AB M1M1 T.L. m M2M2

25 Example(4): Represent the two projections of an equilateral triangle ABC if its side AB is given and C(?, 1, ?) x +, y - B1B1 A1A1 B2B2 A2A2  y AB C1C1  y BC L :C 1 1  z AB  y AC  z AB T.L. of AB = AC T.L. of AB = AC = BC C2C2  T.L. of AB =AC A2A2  y AC C2C2 T.L. of AB =AC B2B2  y BC L :C 2 C2C2

26 X 12 Example (5): A cube ABCDA \ B \ C \ D \ is given by it’s vertex A \, it’s base ABCD   1 and it’s vertex C =(?, 5, ?), represent the cube by it’s two projections A2\A2\ A 1 \ =A 1 L: A 2, B 2, C 2, D 2 A2A2 T.L of square T.L of AC L: C 1 B2B2 D2D2 C2C2 B2\B2\ D2\D2\ C2\C2\ C 1 \ =C 1 D 1 \ =D 1 B 1 \ =B 1 B\B\ C\C\ C A\A\ A D\D\ D B 11 A 1 B 1 C 1 D 1 T.S A 2 B 2 C 2 D 2  x- axis

27 X +,y -- X --,y+  h2h2 h 1 = T.L f1f1 f 2 = T.L  h //  1 f //  2

28

Download ppt "Lecture 2: The straight line By Dr. Samah Mohamed Mabrouk www.smmabrouk.faculty.zu.edu.eg By Dr. Samah Mohamed Mabrouk www.smmabrouk.faculty.zu.edu.eg."

Similar presentations

Properties of Special Triangles

Properties of Special Triangles
Geometry (Lines) SOL 4.14, 4.15, 4.16 lines, segments, rays, points, angles, intersecting, parallel, & perpendicular 4.14 The student will investigate.

Geometry (Lines) SOL 4.14, 4.15, 4.16 lines, segments, rays, points, angles, intersecting, parallel, & perpendicular 4.14 The student will investigate.
Lecture 7: The Metric problems. The Main Menu اPrevious اPrevious Next The metric problems 1- Introduction 2- The first problem 3- The second problem.

Lecture 7: The Metric problems. The Main Menu اPrevious اPrevious Next The metric problems 1- Introduction 2- The first problem 3- The second problem.
Example of auxiliary view

Example of auxiliary view
Lecture 5: The Auxiliary projection Dr. Samah Mohamed Mabrouk

Lecture 5: The Auxiliary projection Dr. Samah Mohamed Mabrouk
Standardized Test Practice EXAMPLE 2 SOLUTION Plot points P, Q, R, and S on a coordinate plane. Point P is located in Quadrant IV. Point Q is located in.

Standardized Test Practice EXAMPLE 2 SOLUTION Plot points P, Q, R, and S on a coordinate plane. Point P is located in Quadrant IV. Point Q is located in.
Lecture 8 ENGR-1100 Introduction to Engineering Analysis.

Lecture 8 ENGR-1100 Introduction to Engineering Analysis.
Lesson 7-2 Lesson 7-2: The Pythagorean Theorem1 The Pythagorean Theorem.

Lesson 7-2 Lesson 7-2: The Pythagorean Theorem1 The Pythagorean Theorem.
Lecture 8: The circle & the sphere. The Sphere 1- The orthogonal projection of the sphere 2- Representation of the sphere in Monge’s projection 3- Examples.

Lecture 8: The circle & the sphere. The Sphere 1- The orthogonal projection of the sphere 2- Representation of the sphere in Monge’s projection 3- Examples.
Distance between 2 points Mid-point of 2 points

Distance between 2 points Mid-point of 2 points
Learning Letter Sounds Jack Hartman Shake, Rattle, and Read

Learning Letter Sounds Jack Hartman Shake, Rattle, and Read
Curve—continuous set of points (includes lines). simple curves—do not intersect themselves.

Curve—continuous set of points (includes lines). simple curves—do not intersect themselves.
PROJECTIONS OF PLANES In this topic various plane figures are the objects. What will be given in the problem? 1.Description of the plane figure. 2.It’s.

PROJECTIONS OF PLANES In this topic various plane figures are the objects. What will be given in the problem? 1.Description of the plane figure. 2.It’s.
Find the missing side of the triangle. 1) 2) 3) D.N.A.

Find the missing side of the triangle. 1) 2) 3) D.N.A.
Perimeter The perimeter of a polygon is the sum of the lengths of the sides Example 1: Find the perimeter of  ABC O A(-1,-2) B(5,-2) C(5,6) AB = 5 – (-1)

Perimeter The perimeter of a polygon is the sum of the lengths of the sides Example 1: Find the perimeter of  ABC O A(-1,-2) B(5,-2) C(5,6) AB = 5 – (-1)
1 Reminder-Instructions for equipment  Tutorial 4 onwards you will bring the following  Approximately 21.5 x 15 in. drawing sheets  Cello tape for fixing.

1 Reminder-Instructions for equipment  Tutorial 4 onwards you will bring the following  Approximately 21.5 x 15 in. drawing sheets  Cello tape for fixing.
The Main Menu اPrevious اPrevious Next Using the successive auxiliary projection, construct the development of the given regular oblique tetragonal prism.

The Main Menu اPrevious اPrevious Next Using the successive auxiliary projection, construct the development of the given regular oblique tetragonal prism.
Circle Properties Part I. A circle is a set of all points in a plane that are the same distance from a fixed point in a plane The set of points form the.

Circle Properties Part I. A circle is a set of all points in a plane that are the same distance from a fixed point in a plane The set of points form the.
© T Madas. The Cosine Rule © T Madas A B C a b c a2a2 = b2b2 + c2c2 – 2 b ccosA b2b2 = a2a2 + c2c2 – 2 a ccosB c2c2 = a2a2 + b2b2 – 2 a bcosC The cosine.

© T Madas. The Cosine Rule © T Madas A B C a b c a2a2 = b2b2 + c2c2 – 2 b ccosA b2b2 = a2a2 + c2c2 – 2 a ccosB c2c2 = a2a2 + b2b2 – 2 a bcosC The cosine.
8-1, 1-8 Pythagorean Theorem, Distance Formula, Midpoint Formula

8-1, 1-8 Pythagorean Theorem, Distance Formula, Midpoint Formula

Similar presentations

Ads by Google