Students practice identifying the types of variation from equations and solving problems of different types of variation.
- Subject:
- Algebra I & II
- Material Type:
- Activity/Lab
- Author:
- Candice Barkley
- Date Added:
- 02/18/2021
Students practice identifying the types of variation from equations and solving problems of different types of variation.
Determining direct variationMathematics Instructional Plans (MIPs) help teachers align instruction with the 2016 Mathematics Standards of Learning (SOL) by providing examples of how the knowledge, skills and processes found in the SOL and curriculum framework can be presented to students in the classroom.
This a foldable that can be used for teaching the characteristics of direct and inverse variation.
Dividing Polynomials Mathematics Instructional Plans (MIPs) help teachers align instruction with the 2016 Mathematics Standards of Learning (SOL) by providing examples of how the knowledge, skills and processes found in the SOL and curriculum framework can be presented to students in the classroom.
This is a Desmos activity to explore domain and range of continuous functions. Students do not need prior knowledge of domain and range; this is an exploratory instructional activity.
This is a remix of a task to help students think about an expression for a function as built up out of simple operations on the variable, and understand the domain in terms of values for which each operation is invalid (e.g., dividing by zero or taking the square root of a negative number).
This classroom activity presents College Algebra students with a ConcepTest and a Question of the Day activity concerning the effect of the initial value, C, on the y-intercept and position of an exponential function where C>0 and k is an arbitrarily fixed value in f(x)=Ce^(kx).
This classroom activity presents College Algebra students with a ConcepTest and a Question of the Day activity concerning the effect of the proportionality constant, k, on the y-intercept and position of an exponential graph where k>0 and C is an arbitrarily fixed value in f(x)=Ce^(kx).
In this task, students decide which team wins the egg-launching contest by analyzing data from a table, graph and a verbal representation with a quadratic equation. In doing so, students analyze data, determine the equation of the curve of best fit in order to make predictions, and solve practical problems using models of quadratic functions.
This text respects the traditional approaches to algebra pedagogy while enhancing it with the technology available today. In addition, textual notation is introduced as a means to communicate solutions electronically throughout the text. While it is important to obtain the skills to solve problems correctly, it is just as important to communicate those solutions with others effectively in the modern era of instant communications.While algebra is one of the most diversely applied subjects, students often find it to be one of the more difficult hurdles in their education. With this in mind, John wrote Elementary Algebra from the ground up in an open and modular format, allowing the instructor to modify it and leverage their individual expertise as a means to maximize the student experience and success. Elementary Algebra takes the best of the traditional, practice-driven algebra texts and combines it with modern amenities to influence learning, like online/inline video solutions, as well as, other media driven features that only a free online text can deliver.
Students will be introduced to the Empirical Rule for normal distributions and practice using it to answer questions.
This task asks students to use inverse operations to solve the equations for the unknown variable, or for the designated variable if there is more than one. Two of the equations are of physical significance and are examples of Ohm's Law and Newton's Law of Universal Gravitation.
Evaluating algebraic expressionsMathematics Instructional Plans (MIPs) help teachers align instruction with the 2016 Mathematics Standards of Learning (SOL) by providing examples of how the knowledge, skills and processes found in the SOL and curriculum framework can be presented to students in the classroom.
Students evaluate functions with function notation both algebraically and graphically.
Students will explore literal equations using pictures/images to represent variables. Students use inverse operations and properties of equality to solve for the specified image.
This a foldable of the rules to simplify expressions with exponents.
This resource is a lesson plan that includes links to some useful Desmos Activities to have students practice identifying exponential functions based on the equations.
Students match features of exponential and logarithmic functions and then consider which features could change with a transformation. Features include: domain, range, intervals of increasing/decreasing, x- and y- intercepts, end behavior, and asymptotes.
Performing operations with radical expressions containing rational exponents Mathematics Instructional Plans (MIPs) help teachers align instruction with the 2016 Mathematics Standards of Learning (SOL) by providing examples of how the knowledge, skills and processes found in the SOL and curriculum framework can be presented to students in the classroom.
Identify the location and value of absolute and relative maxima and minima of functions Mathematics Instructional Plans (MIPs) help teachers align instruction with the 2016 Mathematics Standards of Learning (SOL) by providing examples of how the knowledge, skills and processes found in the SOL and curriculum framework can be presented to students in the classroom.