Partial Fraction Decomposition by Repeated Synthetic Division
... The method presented above also works when one of the factors in the denominator is a power of an irreducible quadratic function even though the computation could be challenging when it is done by hand. The first step is to make a substitution u= x − α . The next step is to find the constants Bi’s a ...
... The method presented above also works when one of the factors in the denominator is a power of an irreducible quadratic function even though the computation could be challenging when it is done by hand. The first step is to make a substitution u= x − α . The next step is to find the constants Bi’s a ...
1 Maximum and Minimum Values
... Find the absolute maximum an minimum values of f (x) = x3 − 12x + 1 on the interval [1, 4] Example 1.9 (Instructor). Sketch a graph of a function f that is continuous on [1, 5] and has all of the following properties • An absolute minimum at 2 • An absolute maximum at 3 • A local minimum at 4 Exampl ...
... Find the absolute maximum an minimum values of f (x) = x3 − 12x + 1 on the interval [1, 4] Example 1.9 (Instructor). Sketch a graph of a function f that is continuous on [1, 5] and has all of the following properties • An absolute minimum at 2 • An absolute maximum at 3 • A local minimum at 4 Exampl ...
Abel's Version of Abel's Theorem
... I don’t find this simple form of the theorem in the literature (other than in Abel’s memoir itself). The reason, I believe, is that Abel’s setting of the theorem does not fit well with modern ways of thinking. For one thing, the overiding importance of the function concept in modern mathematics obsc ...
... I don’t find this simple form of the theorem in the literature (other than in Abel’s memoir itself). The reason, I believe, is that Abel’s setting of the theorem does not fit well with modern ways of thinking. For one thing, the overiding importance of the function concept in modern mathematics obsc ...
11.4 - Limits at Infinity and Limits of Sequences
... • Ex: Find the horizontal asymptotes of the following functions. ...
... • Ex: Find the horizontal asymptotes of the following functions. ...
BASIC NOTIONS AND RESULTS IN TOPOLOGY 1. Metric spaces A
... Compact sets are bounded and closed as in Rn , but the converse is far from being true in this generality! Exercise 1. If X is compact then it is complete and separable. Theorem 1.3. A set Y ⊂ X is compact if and only if from every open cover {Uα }α∈A of Y we can extract a finite cover. Proof. The s ...
... Compact sets are bounded and closed as in Rn , but the converse is far from being true in this generality! Exercise 1. If X is compact then it is complete and separable. Theorem 1.3. A set Y ⊂ X is compact if and only if from every open cover {Uα }α∈A of Y we can extract a finite cover. Proof. The s ...
Ken`s Cheat Sheet 2014 Version 11 by 17
... Derivative shows: maximum ( + to -) and minimum (-0 to +) values, increasing and decreasing intervals, slope of the tangent line to the curve, and velocity 2nd Derivative shows: inflection points, concavity, and acceleration 2nd Derivative Test for Extremes f (c) 0, and f ' '(c) 0, then f has a ...
... Derivative shows: maximum ( + to -) and minimum (-0 to +) values, increasing and decreasing intervals, slope of the tangent line to the curve, and velocity 2nd Derivative shows: inflection points, concavity, and acceleration 2nd Derivative Test for Extremes f (c) 0, and f ' '(c) 0, then f has a ...
Limits, Sequences, and Hausdorff spaces.
... Definition If (xn ) = x1 , x2 , . . . is a sequence in a Euclidean space Rn , we say that (xn ) converges to x ∈ Rn if for every > 0, we can produce an integer N > 0 such that if n > N , then ||xn − x|| < . That is, eventually the sequence enters and stays within any open ball about the point x. ...
... Definition If (xn ) = x1 , x2 , . . . is a sequence in a Euclidean space Rn , we say that (xn ) converges to x ∈ Rn if for every > 0, we can produce an integer N > 0 such that if n > N , then ||xn − x|| < . That is, eventually the sequence enters and stays within any open ball about the point x. ...
pwrpt 5.5
... Mean Value Theorem for Integrals If T(t) is the temperature at time t, we might wonder if there is a specific time when the temperature is the same as the average temperature. For the temperature function graphed in Figure 1, we see that there are two such times––just before noon and just before mi ...
... Mean Value Theorem for Integrals If T(t) is the temperature at time t, we might wonder if there is a specific time when the temperature is the same as the average temperature. For the temperature function graphed in Figure 1, we see that there are two such times––just before noon and just before mi ...
20 40 60 80 t 50 100 150 200
... numbers D(20), D(30), D(40), D(60), D(80), and D(90) you get by plugging in the appropriate t-values into the formula for D(t) above. Do you see a correspondence between these sequences of numbers? Do you have any idea why this correspondence should be true? (This correspondence amounts to a HUGE th ...
... numbers D(20), D(30), D(40), D(60), D(80), and D(90) you get by plugging in the appropriate t-values into the formula for D(t) above. Do you see a correspondence between these sequences of numbers? Do you have any idea why this correspondence should be true? (This correspondence amounts to a HUGE th ...
Test #3 Topics
... Section 3.1 (and again in Section 3.5) that idea was developed further to introduce the derivative. To compute the distance traveled by an object moving along a straight line at constant velocity (e.g. a car travels at 45 mi/hr for 2 hr on a straight road; how far has the car traveled?), the answer ...
... Section 3.1 (and again in Section 3.5) that idea was developed further to introduce the derivative. To compute the distance traveled by an object moving along a straight line at constant velocity (e.g. a car travels at 45 mi/hr for 2 hr on a straight road; how far has the car traveled?), the answer ...
MATH 409, Fall 2013 [3mm] Advanced Calculus I
... uniformly continuous on [a, b]. We have to show that f is not continuous on [a, b]. By assumption, there exists ε > 0 such that for any δ > 0 we can find two points x, y ∈ [a, b] satisfying |x − y | < δ and |f (x) − f (y )| ≥ ε. In particular, for any n ∈ N there exist points xn , yn ∈ [a, b] such t ...
... uniformly continuous on [a, b]. We have to show that f is not continuous on [a, b]. By assumption, there exists ε > 0 such that for any δ > 0 we can find two points x, y ∈ [a, b] satisfying |x − y | < δ and |f (x) − f (y )| ≥ ε. In particular, for any n ∈ N there exist points xn , yn ∈ [a, b] such t ...
Objective (Defn): something that one`s efforts or actions are intended
... Note: Items 1-20 are considered prerequisite topics, and are not specifically covered, but are built upon. ...
... Note: Items 1-20 are considered prerequisite topics, and are not specifically covered, but are built upon. ...