University of Ontario Institute of Technology (UOIT)
Introduction to graphics communication and design
ENGINEERIN ENGR 1025U

Spring 2016
Engineering Design
ENGR1025U
By Yuelei Yang, PhD
Lecture 8: Section View
Understanding Sections
Purpose:
Documentation of single parts manufactured as one
piece.
Documentation of assembly of multiple parts.
Aid in visualizing internal workings of design.
University of Ontario Institute of Technology (UOIT)
Introduction to graphics communication and design
ENGINEERIN ENGR 1025U

Spring 2016
Engineering Design
ENGR1025U
By Yuelei Yang, PhD
UOIT, Winter 2017
Product Planning, Identify Customer & Product Specifications
Product Development Process Flows
Exhibit 25 Process flow diagrams for three product development processes.
Product Developmen
University of Ontario Institute of Technology (UOIT)
Introduction to programming
ENGINEERIN ENGR 1200

Winter 2016
UOIT: Electrical, Computer, and Software Eng.
Introduction to Programming: ENGR 1200U
Winter 2017
Quiz 3
Date: 03/02/2017
1. Given the following code segment in C+, what is the value of x1 after executing this segment:
int x1cfw_5, x2cfw_3;
x1 += x2;
8
5
University of Ontario Institute of Technology (UOIT)
Introduction to programming
ENGINEERIN ENGR 1200

Winter 2016
Syllabus and Teaching Philosophy
ENGR 1200U: Introduction to Programming for Engineers
Instructor : Dr. Khalid A. Hafeez,
Office
Email
Tel.
Office Hours
:ENG 1023,
:Department of Electrical, Computer, and
Software Engineering,
:Blackboard email,
:(905) 72
University of Ontario Institute of Technology (UOIT)
Introduction to graphics communication and design
ENGINEERIN ENGR 1025U

Spring 2016
Engineering Design
ENGR1025U
By Yuelei Yang, PhD
Lecture 2: Graphics Communication and Technical
Sketching
Engineering Design Process
Concept
(Conceptual solution for a problem)
Visualization
(See the problem and the possible solution)
This is how the eng
University of Ontario Institute of Technology (UOIT)
Introduction to programming
ENGINEERIN ENGR 1200

Winter 2016
UOIT: Electrical, Computer, and Software Eng.
Introduction to Programming: ENGR 1200U
Winter 2017
Quiz 4
Date: 10/02/2017
1. Given the following code segment in C+, what is the value of x1 after executing this
segment:
int x1cfw_4, x2cfw_3;
x2 += x1;
x1+;
University of Ontario Institute of Technology (UOIT)
Introduction to graphics communication and design
ENGINEERIN ENGR 1025U

Spring 2016
Engineering Design
ENGR1025U
Lecture 7: Pictorial Projection
Axonometric Projection
Axon
Metric
Axis To Measure
2
Axonometric Projection
Definition:
A parallel projection technique used to create a
pictorial of an object by rotating the object on an
axis
University of Ontario Institute of Technology (UOIT)
Structures and Properties of Materials
ENGINEERIN ENGR2220

Fall 2013
PRACTICE PROBLEM ANSWERS
Chapter  3
3.5 Show that the atomic packing factor for BCC is 0.68.
Ans: APF =
VS
8p R3 /3
=
= 0.68
VC 64 R3 /3 3
3.8 Strontium (Sr) has an FCC crystal structure, an atomic radius of 0.215 nm and an atomic
weight of 87.62 g/mol.
University of Ontario Institute of Technology (UOIT)
Structures and Properties of Materials
ENGINEERIN ENGR2220

Fall 2013
MANE/ENGR 2220: Structure & Properties of Materials
Midterm Fall 2014
Instructors: Dr. Sayyed Ali Hosseini
Dr. Ghaus Rizvi
1. (a) Sketch the unit cell of BCC crystal structure.
(b) Show the steps needed to find the atomic packing factor (APF) of BCC cryst
University of Ontario Institute of Technology (UOIT)
Introduction to programming
ENGINEERIN ENGR 1200

Spring 2016
Physics II Laboratory
Faculty of Science, UOIT
Report for Experiment PhyII01: Electric Field and Potential
Student name: Syed Muhammad Rizvi
CRN: 71916
Date: 09/02/2016
Conclusion:
The purpose of this experiment was to introduce us to the practical aspec
University of Ontario Institute of Technology (UOIT)
Introduction to programming
ENGINEERIN ENGR 1200

Spring 2016
Physics II Laboratory
Faculty of Science, UOIT
Report for Experiment PhyII03b: 1RLC Circuit
Student name: Syed Muhammad Rizvi CRN: 71906 Date: 01/03/2016
Experiment 1: Resistive, Capacitive, and Inductive Circuits
R =10 ohms;
C = 100E6 C ; L = 8.2 mH; R
University of Ontario Institute of Technology (UOIT)
Introduction to programming
ENGINEERIN ENGR 1200

Spring 2016
Physics II Laboratory
Faculty of Science, UOIT
Report for Experiment PhyII02: Basic Electricity
Students Name: Syed Muhammad Rizvi
CRN: 70196
Date: 26/0112016
Experiment 1: Ohms Law
Table 1.1
Voltage/Resistance, A
Resistance,
Current, A
Voltage, V
334
0
University of Ontario Institute of Technology (UOIT)
Calculus
ENGINEERIN 1010u

Fall 2012
MATH1010: Assignment Worksheet #6
What were working on today: Applications of Derivatives (Linear Approximations and MVT)
Activity 1: Instead of being satisfied with a linear approximation to a function, it is possible to
find a quadratic or higherorder
University of Ontario Institute of Technology (UOIT)
Calculus
ENGINEERIN 1010u

Fall 2012
MATH1010: Assignment Worksheet #8
What were working on today: Optimization, Antiderivatives, and Numerical Integration
Activity 1 (~15 min): There is a traditional problem that goes like this We want to make an
open topped box from an
8.5 11
inch sheet of
University of Ontario Institute of Technology (UOIT)
Calculus
ENGINEERIN 1010u

Fall 2012
MATH1010: Assignment Worksheet #3
What were working on today: IVT, Infinite Limits, Derivatives, and Differentiation Rules
Activity 1 (max 10 min): Get warmed up by playing a quick game to practice your basic skills
regarding limits at infinity and the de
University of Ontario Institute of Technology (UOIT)
Calculus
ENGINEERIN 1010u

Fall 2012
MATH1010: Assignment Worksheet #4
What were working on today: Derivatives (and getting lots of practice!)
Activity 1 (max 10 min): Come up with a question asking for the derivative of a function (the
function has to be complicated enough so that the deriv
University of Ontario Institute of Technology (UOIT)
Calculus
ENGINEERIN 1010u

Fall 2012
MATH1010: Assignment Worksheet #5
What were working on today: Applications of Derivatives (incl. Related Rates)
Activity 1: A plane is cruising at an altitude of 2 miles at a distance of 10 miles from an airport.
Choosing the airport to be at the point (0
University of Ontario Institute of Technology (UOIT)
Calculus
ENGINEERIN 1010u

Fall 2012
MATH1010: Chapter 5 cont; 6
INTEGRATION cont
The Substitution Rule (Section 5.5) cont
Last day, we further explored the very important substitution rulelets try some more
challenging questions involving usub.
x3
Example:
Example:
1 e
1 x
dx
x
2
dx
1
MAT
University of Ontario Institute of Technology (UOIT)
Calculus
ENGINEERIN 1010u

Fall 2012
MATH1010: Chapter 5 cont
1
INTEGRATION cont
Indefinite Integrals and the Net Change Theorem (Section 5.4)
cont
Applications
Recall: Last day, we stated the following relationship between velocity and position of
an object:
b
v(t )dt s(b) s(a)
a
The Net C
University of Ontario Institute of Technology (UOIT)
Calculus
ENGINEERIN 1010u

Fall 2012
MATH1010: Chapter 5 cont
1
INTEGRATION cont
The Fundamental Theorem of Calculus (Section 5.3)
Recall: So far, we have been interested in finding derivatives (slope) and integrals
(area)how are these two things related?
x
Consider the function
g ( x ) f (t
University of Ontario Institute of Technology (UOIT)
Calculus
ENGINEERIN 1010u

Fall 2012
MATH1010: Chapter 5 cont
1
INTEGRATION cont
The Substitution Rule (Section 5.5) cont
Last day, we introduced the concept of substitution for tougher integralslets continue.
Example:
2 x3
x4 1
dx
Often, the hard part is figuring out what substitution to ma
University of Ontario Institute of Technology (UOIT)
Calculus
ENGINEERIN 1010u

Fall 2012
MATH1010: Chapter 5 cont
1
INTEGRALS cont
The Definite Integral (Section 5.2)
Recall: Last class, we were interested in computing the limit of an infinite sum. Just like
f ( x h) f ( x )
earlier in the course when lim
came up frequently and was given the
University of Ontario Institute of Technology (UOIT)
Calculus
ENGINEERIN 1010u

Fall 2012
MATH1010: Chapter 5 cont
1
INTEGRATION cont
The Fundamental Theorem of Calculus (Section 5.3)
Recall: So far, we have been interested in finding derivatives (slope) and integrals (area)
how are these two things related?
x
f (t )dt with a x b
Consider the
University of Ontario Institute of Technology (UOIT)
Calculus
ENGINEERIN 1010u

Fall 2012
MATH1010: Chapter 5 cont; 6
INTEGRATION cont
The Substitution Rule (Section 5.5) cont
Last day, we further explored the very important substitution rulelets try some more
challenging questions involving usub.
Example:
y g (x)
Example:
1 e
dx
x
And finall
University of Ontario Institute of Technology (UOIT)
Calculus
ENGINEERIN 1010u

Fall 2012
MATH1010: Chapter 5 cont
1
INTEGRATION cont
Indefinite Integrals and the Net Change Theorem (Section 5.4)
cont
Applications
Recall: Last day, we stated the following relationship between velocity and position of
an object:
b
v(t )dt s(b)
s (a)
a
The Net
University of Ontario Institute of Technology (UOIT)
Calculus
ENGINEERIN 1010u

Fall 2012
MATH1010: Chapter 5 cont
1
INTEGRATION cont
The Substitution Rule (Section 5.5) cont
Last day, we introduced the concept of substitution for tougher integralslets continue.
Example:
2x3
x 4 1
dx
Often, the hard part is figuring out what substitution to ma