Hamad Al Marri
Assignment Section 1.2 due 01/26/2015 at 11:59pm MST
1. (1 pt) The graph of y = f (x) is given below (in blue),
along with several related graphs (which are in red).
Evilsizor MAT 265 Spring 2015
2. (1 pt) The graph of y = x3 6x2 is given b

VirtualCapacitorExperiment
This experiment should improve your familiarity with capacitors and enable you to appreciate
what happens when you change the physical characteristics of a parallel plate capacitor.
Open the following webpage, and then click on

VirtualCapacitorExperiment
This experiment should improve your familiarity with capacitors and enable you to appreciate
what happens when you change the physical characteristics of a parallel plate capacitor.
Open the following webpage, and then click on

VirtualCapacitorExperiment
Name_
Handinatendofclassforfullcredit.
This experiment should improve your familiarity with capacitors and enable you to appreciate
what happens when you change the physical characteristics of a parallel plate capacitor.
Open th

1(ALU) 1IM1 ANGEL DAVID ORTIZ RESENDIZ
Assignment DEPARTAMENTAL2 due 10/19/2014 at 11:47pm CDT
D. the concentration of a 5 mg dose in the blood 3 hours
after injection.
E. the change in concentration of a 3 mg dose in the
blood 5 hours after injection.
F.

NAME & ID
DATE
Mechatronics Engineering
MTE 119 STATICS
HOMEWORK 6
SOLUTIONS
PAGE
1
22
PROBLEM 1-EXERCISE 6-73
The compound beam is pin-supported at C and supported by a roller A and B. There is a
hinge (pin) at D. Determine the reactions at the supports.

Math 241, Quiz 5. 9/30/12.
Name:
Read problems carefully. Show all work. No notes, calculator, or text.
There are 15 points total.
1. 14.3, #34 (5 points): Let u = xy/z . Find
u
.
z
Solution: We compute
y
y
1
xy/z =
e z ln x = e z ln x
(y ln x)z 1 = xy/

MATH 2400 Calculus III class 14.1 A. Spina, instructor
1
14.1 THE PARTIAL DERIVATIVE
Denitions.
f
f (a + h, b) f (a, b)
def
(a, b) = lim
h0
x
h
def
fx (a, b) =
f
f (a, b + h) f (a, b)
def
(a, b) = lim
h0
y
h
def
fy (a, b) =
z = f (x, y)
fx (x, y) =
z
x
a

MATH 3150
PDEs for Engineers
Homework 3
This homework is a little about vector spaces and linear algebra, but also few examples to taste
the Fourier Series.
1. Solve problems 1322 from section 4.6
2. Find the Fourier series representation of the function

Science
School of Science and Technology
SCIN234
Physics II
4 Credit Hours
16 Week Course
Prerequisite(s): None
Table of Contents
Instructor Information
Course Description
Course Scope
Course Objectives
Course Delivery Method
Course Materials
Evaluation P

Wright State University
Department of Mechanical and Materials Engineering
ME 315, Winter 2010
MIDTERM TEST 1: OPEN BOOK, CLOSED NOTES
Show All Work
1.
(20 points) Intravenous infusions are usually driven by gravity by hanging the
fluid bottle at sufficie

OUTLINE
CHAPTER 5:
Axially Loaded Members
-Elastic deformation of an axially loaded member
-Statically indeterminate axially loaded member
-Thermal stress problems
-Combined problems
1
2
Elastic deformation of an axially
loaded member
Saint-Venants princi

3.4Position,Velocity,andAcceleration
1.Aballoonistdropsasandbagfromaballoon160feetabovetheground.Aftertseconds,the
sandbagis16016t2feetabovetheground.
a) Findthevelocityofthesandbagatt=1.v(t)=32t v(1)=32(1)=32
b)
Withwhatvelocitydoesthesandbaghittheground

Account Name
Address
:Mr. NIKHIL MANHAS
: H NO 643 TYPE III NUHON COLONY
GGSSTP, ROPAR-140001
ROPAR
Date
:7 Feb 2015
Account Number
:00000065092909672
Account Description
:BR-T L (PER)GYAN JYOTI
Branch
:ROPAR THERMAL PLANT (S.COMPLEX
Balance as on 1 Jun 2

Given are three simple linear equations in the form of y = mx + b.
Equation 1:
y = 15,423 + 0.59x
Equation 2:
y = 4,135 + 1.13x
Equation 3:
y = 9,315+ 0.78x
1.Plot the Equation 1 on a graph paper by hand. Label each graph clearly
with all the necessary in

Account Name
Address
:Mr. NIKHIL MANHAS
: H NO 643 TYPE III NUHON COLONY
GGSSTP, ROPAR-140001
ROPAR
Date
:7 Feb 2015
Account Number
:00000065092909672
Account Description
:BR-T L (PER)GYAN JYOTI
Branch
:ROPAR THERMAL PLANT (S.COMPLEX
Balance as on 1 Sep 2

2.3. LINEAR APPROXIMATION, TANGENT PLANES, AND THE DIFFERENTIAL
2.3
59
Linear Approximation, Tangent Planes,
and the Dierential
In single-variable Calculus, you should have encountered linear approximation: if f =
f (x) is dierentiable at a, then f (x) is

DIFFERENTIAL
EQUATIONS
Dr. Ir. Harinaldi, M.Eng
Mechanical Engineering Department
Faculty of Engineering University of
Indonesia
Differential Equations
An equation which involves unknown function
and its derivatives
ordinary differential equation (ode)

Me 233: Calculus III
Solutions to Midterm Examination 2
Profs. Krishtal, Ravindra, and Wickerhauser
18 questions on 18 pages
Monday, March 14th, 2005
1. Find parametric equations for the tangent line at the point (1/2, \/E/ 2, -7r/ 3) on the
curve r(t) =

12.3 CONTOUR DIAGRAMS
659
Formula for a Production Function
Production functions are often approximated by formulas of the form
P = f (N, V) = cN"VP
where P is the quantity produced and c, a, and P are positive constants, 0
< a < 1 and 0 < ,l3 < 1.
Exampl

A20
APPENDIX C
C
C.1
Differential Equations
Differential Equations
Solutions of Differential Equations
Find general solutions of differential equations. Find particular solutions of differential equations.
General Solution of a Differential Equation
A dif

Problem 6-101
If a force of magnitude P is applied perpendicular to the handle of the mechanism, determine
the magnitude of force F for equilibrium. The members are pin-connected at A, B, C, and D.
Given:
P := 30N
a := 625mm
b := 100mm
c := 125mm
d := 100

15.5 The Chain Rule
Theorem (The Chain Rule - case 1) Suppose z = f (x, y) is a differentiable function and x = x(t), y = y(t) are both
differentiable functions of t. Then z is differentiable with respect to t and
dz
f dx f dy
=
+
dt
x dt
y dt
(Proof)
z
=

1
SOLUTION of TEST 3: Math 211 - Multivariate Calculus- Spring 2003
Problem 1. Find the limit if it exists, or show why it does not exist. 1. x4 + y 4 (x,y)(0,0) (x2 + y 2 )2 lim Along the x-axis, y = 0 so Along the line x = y, x4 x4 x4 + y 4 x4 + 04 = li