![]() Maze - Quadratic Functions - Transformation of Parent Functionħ. Maze - Quadratic Functions - Find the y-intercept (Standard Form)Ħ. Maze - Quadratic Functions - Find the Vertex (Given the Vertex and Standard Form)ĥ. Maze - Quadratic Functions - Find the Vertex (Given the Vertex Form)Ĥ. Maze - Quadratic Functions - Find the Vertex (Given the Standard Form of QF)ģ. Maze - Quadratic Functions - Find Axis of SymmetryĢ. On a last note, if you're currently teaching the quadratic unit chapter, "reviews" of the quadratic bundle has indicated that the following mazes are an awesome resource to use:ġ. This 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. If you're interested in the second level of solving quadratic equation by factoring, you may find it at: Maze - Quadratic Functions - Solve Quadratic Equation by Factoring - Level 2Ī DIGITAL VERSION OF THIS ACTIVITY IS SOLD SEPARATELY AT MY STORE HERE From start to end, the student will be able to answer 17 questions out of the 19 provided to get to the end of the maze. There are 19 quadratic equation provided in this maze. The second level will focus on solving a quadratic equation that must be factored first and is sold separately at my store. Please keep in mind that this maze focuses only on finding the solution of an already factored quadratic equation (level 1). Some roots are integers while others are fractions. Some of the quadratic equations are factored into the product of 2 binomials, others are factored into a binomial squared, while others are factored into the product of a monomial and binomial. This activity is a good review of understanding how to "Solve Quadratic Equation by Factoring" given the quadratic equation written in "Factored Form" already (Level 1). Therefore, when solving quadratic equations by factoring, we must always have the equation in the form "(quadratic expression) equals (zero)" before we make any attempt to solve the quadratic equation by factoring.Please check out the collection of mazes which I hope that you find helpful at: If the product of factors is equal to anything non-zero, then we can not make any claim about the values of the factors. ![]() We can only draw the helpful conclusion about the factors (namely, that one of those factors must have been equal to zero, so we can set the factors equal to zero) if the product itself equals zero. In particular, we can set each of the factors equal to zero, and solve the resulting equation for one solution of the original equation. So, if we multiply two (or more) factors and get a zero result, then we know that at least one of the factors was itself equal to zero. Put another way, the only way for us to get zero when we multiply two (or more) factors together is for one of the factors to have been zero. Zero-Product Property: If we multiply two (or more) things together and the result is equal to zero, then we know that at least one of those things that we multiplied must also have been equal to zero.
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