This bundle includes a total of 21 mazes. Each of these mazes is sold separately at my store. Please visit the links below for more details about each individual product. The mazes are:

• Maze - Evaluating Logarithmic Functions

• Maze - Rewriting Logarithmic Equation in Exponential Form

• Maze - Rewriting Exponential Equation in Logarithmic Form

• Maze - Evaluate Logarithmic Functions using Change of Base Formula

• Maze - Use Properties to Evaluate Logarithmic Expressions

• Maze - Logarithmic Functions- Solving Log Fxns - Level 1

• Maze - Logarithmic Functions- Solving Log Fxns - Level 2

• Maze - Logarithmic Functions- Solving Log Fxns - Must Condense - Simple

• Maze - Logarithmic Functions- Solving Log Fxns given two equal logs

• Maze - Logarithmic Functions- Solving Log Fxns - Must Condense - Advance

• Maze - Logarithmic Functions- Solving Log Fxns given two equal logs

• Maze - Logarithmic Functions- Solving Log Equations - Many Models

Each maze could be used as: a way to check for understanding, a review, recap of the lesson, pair-share, cooperative learning, exit ticket, entrance ticket, homework, individual practice, when you have time left at the end of a period, beginning of the period (as a warm up or bell work), before a quiz on the topic, and more.

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This product is intended for personal use in one classroom only. For use in multiple classrooms, please purchase additional licenses.

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Total Pages

21 Mazes

Answer Key

Included

Teaching Duration

N/A

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Standards

to see state-specific standards (only available in the US).

CCSSHSA-REI.D.11

Explain why the 𝘹-coordinates of the points where the graphs of the equations 𝘺 = 𝘧(𝘹) and 𝘺 = 𝑔(𝘹) intersect are the solutions of the equation 𝘧(𝘹) = 𝑔(𝘹); find the solutions approximately, e.g., using technology to graph the functions, make tables of values, or find successive approximations. Include cases where 𝘧(𝘹) and/or 𝑔(𝘹) are linear, polynomial, rational, absolute value, exponential, and logarithmic functions.

CCSSHSF-LE.A.4

For exponential models, express as a logarithm the solution to 𝘢𝘣 to the 𝘤𝘵 power = 𝘥 where 𝘢, 𝘤, and 𝘥 are numbers and the base 𝘣 is 2, 10, or 𝘦; evaluate the logarithm using technology.

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