In this activity, Landon was preparing for an exam on sections 3.4 and 3.5. This included exponential growth and decay along with Logistic growth curve. This did not include logistic decay and is normally not studied in HS.
In this activity, Landon graphed exponential and logarithmic equations, showing the symmetry with the identity functions. He also proved inverses using composition of functions.
In this activity, Landon worked on setting up exponential growth and decay regressions. He also worked on Logistic regression models as used in the study of population growth with humans and animals in a confined environment.
In this activity, Landon graphed exponential and linear equations and then determined their inverses. We also reviewed rules of exponents when they are negative rational numbers.
In this activity, Landon began his work with graphing an exponential function and determining domain and range. We then reviewed all his rules of exponents and completed several examples of simplifying numbers raised to negative rational numbers.
Section 3.1: Exponential functions and their graphs - Identifying the initial value and the base of exponential functions - Behavior of exponential functions for bases less than and greater than one - Graphs of exponential functions - The natural number e - The logistic function and population modeling -
Linear and quadratic functions and modeling - Modeling with power functions - Polynomial functions of higher order - Real zeros of polynomial functions - Complex zeros and the fundamental theorem of algebra - Graphs of rational functions - Solving inequalities in one variable -
