09:01

Evaluate the following Integrals

12:25

Riemann Sum. Right Hand, Left Hand and Midpoint Rule.

09:46

Optimization. What is the Maximum Vertical Distance between y=x+2 and y=x^2 for x in [-1, 2].

15:07

Curve Sketching. Inc. & Dec. Concave Up. Concave Down, Abs Max and Abs Min. The Extreme Value Th.

08:23

Optimization. Find two positive numbers whose Product is 100 and whose Sum is a Minimum.

10:28

The Mean Value Theorem.

05:03

A man 6-ft tall walks away from a streetlight mounted on a 15-ft tall pole at a rate of 5-ft/s.

08:05

Find the linearization of the function f(x) = SQR(x+5) at a = 4 and use it to approximate SQR (3.8).

05:55

Find the limit as x approaches " - infinity". L'Hospital's Rule " infinity * zero".

05:46

Find the limit as x Approaches 0 of (e^4x -1-4x)/x^2. L'Hospital's Rule_ Intermediate form (0/0).

07:14

Differentiate y=SQR ( 1+4 sin(x)). And find equations of the tangent line and the normal at (0, 1).

06:19

Implicit Differentiation. Find dy/ dx for 2x^3+x^2y-xy^3=2.

10:54

Differentiate y = x ^(SQR x)

02:50

Differentiate f(x) = x^2 ln(2x+1).

02:43

Differentiate y = ln ( cosh (3x)).

02:42

Differentiate y = 3^ (x ln x)

02:51

Differentiate the following y = e^(cosx) + cos(e^x)

24:33

Epsilon and delta Explained with an Example in Calculus.

13:43

The Quotient Rule Proof in Calculus.

07:35

Limit involving infinity

02:08

Limit sin 3x over x

07:01

Evaluate the Limit, or state that it does not exist.

54:42

Math 104 "Math Reasoning for Elementary Teachers". Final Review 20 Questions.

08:53

Evaluate the indefinite integral as an infinite series.

09:43

Find the Maclaurin Series of f(x), and find the associated Radius of Convergence.

12:02

Test the Series for Convergence or Divergence.

06:00

Find a power Series Representation for the Function. And Determine the Interval of Convergence.

05:57

Determine whether the series is Absolutely Convergent, Conditionally Convergent, or Divergent.

05:12

Test the Series for Convergence or Divergence.

04:47

Determine whether the Series is Convergent or Divergent.

04:28

Determine whether the series is convergent or divergent.

09:16

Sketch the Curve by using the Parametric Equations to plot points. Indicate with an arrow the direc.

07:16

Sketch the Curve by using the Parametric Equations to plot points. Indicate with an arrow the dir.

05:44

Test the Series for Convergence or Divergence.

05:27

Test the Series for Convergence or Divergence.

04:42

Use the Comparison Test to determine whether the Series is Convergent or Divergent.

05:11

Use the Integral Test to Determine whether the Series is Convergent or Divergent.

04:05

Determine whether the Geometric Series is Convergent or Divergent. If it is conv. , find the Sum.

02:37

Determine whether the Geometric Series is Convergent or Divergent. If it is conv., find the Sum.

03:38

Determine whether the Sequence Converges or Diverges. If it converges, find the limit. {n^2 e^(-n)}.

02:29

Determine whether the Sequence Converges or Diverges. If it converges, find the limit. an=(n+2)!/n!

06:54

How much work is required to pump all the water from a circular swimming pool over the side?

06:57

First Order Linear Differential Equation Example.

06:55

Find the Volume Using Cylindrical Shells.

24:15

Volume Using a Washer Three Examples in one.

06:05

Arc Length Example. Y= ln (cos x) from 0 to pi/3

01:21:10

Math 104 Midterm Review 20 Qs.

09:23

Find the Volume using Cylindrical Shells.

08:03

Find the Volume using a Washer.

01:38:39

Exam 1 Review College Algebra.

55:07

6.5 Approximate Integration_5 Examples.

34:53

6.3 Partial Fractions.

12:47

Graphing Quadratic Functions in Standard form.

21:14

6.1 Integration by Parts. 5 Examples

57:03

Math 106 " Geometry for Elementary Teachers" Final Exam Review-20 Qs

01:05:20

Math 106 "Geometry for Elementary Teachers" Midterm Review 20 Questions.

43:12

Final Exam Review Math 3

01:06:07

College Algebra Exam 3 Review includes 50 Quick Questions.

31:43

Logarithms and Logarithmic Functions.

01:41:33

Functions_ Domain; Range; Rates of Change; Composition; Inverse; Transformation; Absolute; System.