Interesting fact is that many people of the word have a dream to move to California. But if
compare two cities of this state San Diego and Los Angeles as a choices to move, it is hard to
decide. But even though there the three major similarities and diffe
Tanner Rich, Stanley Archer, Donald French
University Physics II
Section 001
Thursday @ 2pm
9/24/15
Resistance and Multimeters
Introduction:
This lab was conducted at Arkansas State University Lab science east room 307.
The objective of this lab was to in
Tanner Rich, Stanley Archer, Donald French
University Physics 2 sec1
Thursday @ 2pm
9-10-15
Exploring the Behavior of Charges and Fields
Intro:
The purpose of this simulated lab was to the relationship between charge and the electric field.
The simulation
Tanner Rich, Stanley Archer, Donald French
University Physics 2 sec1
Thursday @ 2pm
Lab Began:9-24-15
Lab Due:10-1-15
Ohms Law and Circuit Resistance
Intro:
This experiments purpose is for the students to get acquainted with Ohms Law and apply it to
some
1. The electrical potential is its greatest closest to the test charge.
2. The electric potential magnitude is the same weather or not it is positive or negative, the only
difference is that the sign will change according to whether it is + or charged.
3.
Tanner Rich, Stanley Archer, Donald French
University Physics 2 sec1
Thursday @ 2pm
9-3-15
Electrostatic Phenomena
Intro:
This labs purpose was to get us familiar with electricity and how it works. Electricity is basically
the flow of different charged el
University Physics II
Time
(seconds)
0
0.1
0.2
0.3
0.4
0.5
0.6
0.7
0.8
0.9
1
average time
(s)
0.5
Distance (meters)
1.355
2.937
4.643
6.788
8.277
8.68
9.852
10.938
11.613
11.622
11.25
average distance
(m)
7.995909091
Time (s) vs distance of a tossed ball
Linear Fit for: Latestl Potential
Pot = mx+b
g , m (Slope): 8.828 VIA
a 0 0 ‘ b (Y-Intercept): 0.01632 V
E ‘ Correlation: 09999
9 — RMSE. 0.003732 v
8 -o.27
-o.4 r r r r r
0.1 0.3
(-00047, 41090) Current 2 (A)
E
E
E
‘5
o
E
N
E
E
5
0 0,0 0.1 0.
Tanner Rich, Stanley Archer, Donald French
University Physics 2 sec1
Thursday @ 2pm
9-10-15
Exploring the Behavior of Charges and Fields
Intro:
The purpose of this simulated lab was to the relationship between charge and the electric field.
The simulation
Tanner Rich, Stanley Archer, Donald French
University Physics 2 sec1
Thursday @ 2pm
Lab Began:9-24-15
Lab Due:10-1-15
Ohms Law and Circuit Resistance
Intro:
This experiments purpose is for the students to get acquainted with Ohms Law and apply it to
some
Names: Zak Rush, Tanner Rich, Austin May
Class: University Physics 1 Sec.1
Time: Monday 11am 2-23-15
Free Falling Lab
Intro: The purpose of this lab was to investigate how gravity affects falling items. There is a
mathematical relationship between the fal
Title: Forces
Names: Tanner Rich, Austin May, Zak Rush
Date: 3-9-15
Time: Monday, 11 am
Class: University Physics1 sec1
The data and graphs of the position vs time and velocity vs
time are shown below:
time
0.05
0.1
0.15
0.2
0.25
0.3
0.35
0.4
0.45
0.5
0.5
Lab #3: 1-Dimensional Motion
Class: University Physics 1, Sec1, 11am Monday
Date: 2-2-15
Group Members: Tanner Rich and Austin May
Introduction:
This labs purpose is to investigate motion in 1 dimension and to familiarize ourselves
with the lab equipment
Lab #3: 1-Dimensional Motion
Class: University Physics 1, Sec1, 11am Monday
Date: 2-2-15
Group Members: Tanner Rich and Austin May
Introduction:
This labs purpose is to investigate motion in 1 dimension and to familiarize ourselves
with the lab equipment
Tanner Rich, Stanley Archer, Donald French
University Physics 2 sec1
Thursday @ 2pm
9-3-15
Electrostatic Phenomena
Intro:
The purpose of this simulated lab was to the relationship between charge and the electric field.
The simulation was set up so that we
Tanner Rich, Stanley Archer, Donald French
University Physics II
Section 001
Thursday @ 2pm
10/29/15
Faradays Law
Introduction:
The purpose of this lab was for the students to get firsthand experience with how
Faradays Law applies in the real world. Given
Section 3.9 Related Rates
th
Notes are in reference to Calculus: Early Transcendentals (7 Edition), James Stewart
If we are pumping air into a balloon, both the volume and the radius of the balloon are increasing and
their rates of increase are related to
Section 3.6 Derivatives of Logarithmic Functions
th
Notes are in reference to Calculus: Early Transcendentals (7 Edition), James Stewart
In this section we use implicit differentiation to find the derivatives of the logarithmic functions
and the natural l
Section 3.5 Implicit Differentiation
th
Notes are in reference to Calculus: Early Transcendentals (7 Edition), James Stewart
The functions that we have met so far can be described by expressing one variable explicitly in terms
of another variable for exam
Section 3.4 The Chain Rule
th
Notes are in reference to Calculus: Early Transcendentals (7 Edition), James Stewart
Suppose you are asked to differentiate the function
( )
The differentiation formulas you learned in the previous sections of this chapter do
Section 3.7 Rates of Change in the Natural and Social Sciences
th
Notes are in reference to Calculus: Early Transcendentals (7 Edition), James Stewart
( ), then the derivative
We know that if
can be interpreted as the rate of change of
with
respect to . I
Section 3.10 Linear Approximations and Differentials
Notes are in reference to Calculus: Early Transcendentals (7th Edition), James Stewart
We have seen that a curve lies very close to its tangent line near the point
of tangency. In fact, by zooming in to
Section 3.10 Linear Approximations and Differentials
th
Notes are in reference to Calculus: Early Transcendentals (7 Edition), James Stewart
We have seen that a curve lies very close to its tangent line near
the point of tangency. In fact, by zooming in t
Section 4.7 Optimization Problems
th
Notes are in reference to Calculus: Early Transcendentals (7 Edition), James Stewart
The methods we have learned in this chapter for finding extreme values have practical applications in
many areas of life. In solving
Section 4.9 Antiderivatives
th
Notes are in reference to Calculus: Early Transcendentals (7 Edition), James Stewart
Suppose a physicist who knows the velocity of a particle might wish to know its position at a given
time or an engineer who can measure the
Section 4.9 Antiderivatives
Notes are in reference to Calculus: Early Transcendentals (7th Edition), James Stewart
Suppose a physicist who knows the velocity of a particle might wish to know
its position at a given time or an engineer who can measure the
Section 4.8 Newtons Method
th
Notes are in reference to Calculus: Early Transcendentals (7 Edition), James Stewart
The Newtons method can be used to approximate the solutions of ( )
intercepts) of a function).
. (i.e. find the roots ( -
The geometry behin