Shivang Marvaniya
Chemistry II
Renn Lindsay
February 23, 2017
Abstract of Iodization of Acetone
The objective of this lab was to determine the time that solution requires to mix thoroughly and
find th
Shivang Marvaniya
Renn Lindsay
Chemistry II
February 02, 2017
Abstract of Accurately Preparing Solutions of Known Concentration
The purpose of this lab experiment was to prepare different concentratio
Type of Intelligencea
Examples of Relevant Behaviors
Making persuasive arguments
Linguistic Intelligence
Ability to use language effectively
Writing poetry
Identifying subtle nuances in word
meanings
alc I: Hi her Order Derivative ~ .
FUNCTION DERIVATIVE SECOND DERIVATIVE THIRD DERIVATIVE THIRD DERIVATIVE
f (x) ' EVALUATED AT x = 9
y or
3. f(x)=x2-1 .' VOA 5 2X
089 6x
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II
Limits, Rates of Change, and Tangent Lines Limits Basic Limit Laws Limits and Continuity Evaluating Limits Algebraically Trigonometric Limits Limits at Infinity Intermediate Value Theorem The Formal D
Real Numbers, Function, and Graphs Linear and Quadratic Functions The Basic Classes of Functions Trigonometric Functions Inverse Functions Exponential and Logarithmic Functions
Notes
Chapter 1: Precal
Definition of the Derivative The Derivative as a Function Product and Quotient Rules Rates of Change Higher Derivatives Trigonometric Functions The Chain Rule Implicit Differentiation Derivatives of G
Approximating and Computing Area The Definite Integral The Indefinite Integral The Fundamental Theorem of Calculus, Part I The Fundamental Theorem of Calculus, Part II Substitution Method
Notes
Chapte
Definition of the Derivative The Derivative as a Function Product and Quotient Rules Rates of Change Higher Derivatives Trigonometric Functions The Chain Rule Implicit Differentiation Derivatives of G
Linear Approximation and Applications Extreme Values The Mean Value Theorem and Monotonicity The Shape of a Graph Graph Sketching and Asymptotes Applied Optimization
Notes
Chapter 4: Applications of t
Area Between Two Curves
Notes
Chapter 6: Applications of the Integral
Rowan University
Calculus I Class
Tuan A. Le
Spring 2017
Chapter 6: Applications of the Integral
Area Between Two Curves
Notes
1
A
CALCULUS I-CHAP 3
1
PRACTICE TEST 2
I. 1. Define the derivative of f (x) at x = a
2. Use the definition of the
derivative to find the equation of the tangent
line to the graph of y = x 3, that is per
CALCULUS I - CHAP 2
1
PRACTICE TEST 1
I. 1. Define: lim f (x) = L (use , definition)
xa
2. Define: f (x) is continuous at x = a
II. Use the definition of limit to show
1. lim (3x 5) = 16
x7
2. lim (x2
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Math 251 Suggested Problems
NOTE: This list of problems is identical to the one that appears on the Math 251 website.
12.1: 5, 9, 11, 15, 21, 39, 45
12.2: 11, 13, 19, 25, 27, 33, 53
12.3: 1, 13, 21, 2
Name:
Homework 1
01/25/2016
1) Use the component method of vector addition to find the components of the resultant of
the four displacements shown in the figure. The magnitudes of the displacements ar
Name:
Homework 2
02/01/2016
1. A basketball is launched with an initial speed of 10.0 m/s and follows the trajectory shown.
The height of the basket y = 1.50m. From what distance x the ball is shot? N
Rowan Mat 125 Cale T & A
Sec 2.4 Limits
Three important computations to know:
.Xll
3. Try this example 4 different ways.
x->2
a. direct substitution b. trace the graph
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//:0wan Mat 125 Gate T & A
Sec 6.5 Evaluating Denite Integrals Apps
If a function gives a me i t e of a quantity, then the (£3. ,ri
between the graphs of the rate function aan the xaxis
i R. A 7 #30
j/l/l/owan Mat 125 Calc T & A Name Fig {{1} f row #
Sec 6.4 Fundamental Theorem of Calculus
l FTC
Suppose f is continuous on the interval [ab] and F is any antiderivative of f. The