Intro and Example 1 Activity Comparing Slopes Equations of Lines and Example 2 Example 3 Example 4 Self-Check
Author: Lisa Oberbroeckling
I am a mathematician and faculty member in the Mathematics and Statistics Department at Loyola University Maryland in Baltimore. I have my B.S. in mathematics from the University of Iowa and my M.S. and Ph.D in mathematics from the University of Oregon. My dissertation is entitled "Generalized Inverses in Certain Banach Algebras" advised by Dr. Bruce Barnes. My research is currently in applying my functional analysis background to numerical analysis: finite-element methods for solving systems of differential equations in collaboration with Dr. Christos Xenophontos (University of Cyprus). I have designed and taught a course in MATLAB and I know have a published textbook Programming Mathematics Using MATLAB.
H-H 1.5 Exponential Functions
Intro to Exponential Functions Example 1 Example 2 Example 3 Self-Checks
H-H 1.6 Natural Logarithm
Intro to Natural Log Properties of Log and Example 1 Example 2 Example 3 Self-Checks
H-H 1.7 Exponential Growth and Decay
Example 1 Present and Future Values Example 2 Self-Checks
H-H 2.1 Instantaneous Rate of Change
Example 1 Example 2 Example 3 Instantanous Rate of Change Example 4 Example 5 Self-Checks
H-H 2.2 The Derivative Function
Introduction Example 1 Self-Checks
H-H 2.3 Interpretations of the Derivative
Introduction Example 1 Example 2 Example 3 Example 4 Example 5 Example 6 Self-Checks
H-H 2.4 The Second Derivative
Intro, Part I Intro, Part II Example 1 Example 2 Example 3 Poll: the temperature outside on a given day is given by \( f(t){}^\circ C, \) where \( t \) is in hours since midnight. From 6 AM until noon, the first derivative was negative and the second was positive. Which of the following… Continue reading H-H 2.4 The Second Derivative
H-H 2.5 Marginal Cost and Revenue
Introduction Example 1 Example 2 Example 3 Example 4 Example 5 Self-Checks
H-H 3.1 Derivative Formulas
Intro and Example 1 Example 2 Example 3 Example 4 Self-Checks