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Solving a Literal Linear Equation Resource ID#: 56525 Primary Type: Formative Assessment This document was generated on CPALMS - www.cpalms.org Students are given a literal linear equation and asked to solve for a specific variable. Subject(s): Mathematics Grade Level(s): 9, 10, 11, 12 Intended Audience: Educators Freely Available: Yes Keywords: MFAS, literal, linear, equation, solve Instructional Component Type(s): Formative Assessment Resource Collection: MFAS Formative Assessments ATTACHMENTS MFAS_SolvingALiteralLinearEquation_Worksheet.docx FORMATIVE ASSESSMENT TASK Instructions for Implementing the Task This task can be implemented individually, with small groups, or with the whole class. 1. The teacher asks the student to complete the problem on the Solving a Literal Linear Equation worksheet. 2. The teacher asks follow-up questions, as needed. TASK RUBRIC Getting Started Misconception/Error The student is not able to correctly use algebraic properties to solve the equation. Examples of Student Work at this Level The student is not able to solve for y. The student: Substitutes a value for b. Divides only the left side of the equation by b and then stops. Questions Eliciting Thinking What are you being asked to solve for? Where is that variable in the equation? How could you isolate the term –by? Suppose we replace b with a number. Could you then solve for y? Instructional Implications Be sure the student understands what it means to solve an equation for a variable. Review the order of operati Equality. Model for the student the order the properties should be used to solve equations. Discuss with the student why b and y must be non-zero real numbers. Ask the student what would happen if e Review the reasoning that is used in solving equations and assist the student in applying it to literal equations Relate the process of solving this equation for y to the process of solving 6 – by = 19 for y. Provide additional opportunities to solve literal equations for specified variables. Begin with equations requir multistep equations. Consider implementing MFAS tasks Literal Equations (A-CED.1.4), Solving Formulas for a Variable (A-CE Moving Forward Misconception/Error The student attempts to solve for the indicated variable but is unable to correctly use inverse operations. Examples of Student Work at this Level The student begins by adding six to both sides of the equation. The student attempts to subtract b from both sides of the equation. Questions Eliciting Thinking I see that you added six to each side of the equation. What is 6 + 6? Does adding six eliminate the six on the l What operation is suggested in the term –by? What is the coefficient of y? Is b positive or negative? What is 13 – b? Does that equal 13? Instructional Implications Review the four basic operations (i.e., add, subtract, multiply, and divide) and give the student the opportunit Review the reasoning that is used in solving equations and assist the student in applying it to literal equations equations requiring only one step to solve, and gradually transition the student to solving two-step and multis Consider implementing MFAS tasks Literal Equations (A-CED.1.4), Solving Formulas for a Variable (A-CE Almost There Misconception/Error The student is correctly able to apply inverse operations but makes calculation/careless errors. Examples of Student Work at this Level The student adds 6 to 19 when he or she indicated subtracting six from each side of the equation. The student drops the negative sign from the term –by and divides each side of the equation by a positive b. Questions Eliciting Thinking There is a minor error in your work. Can you find it? Instructional Implications Provide feedback on any error and ask the student to revise his or her work. Provide additional literal equation compare solution methods and reconcile any differences. Provide the student with a completed problem that contains errors. Have the student identify and correct the e Consider implementing MFAS tasks Literal Equations (A-CED.1.4), Solving Formulas for a Variable (A-CE Got It Misconception/Error The student provides complete and correct responses to all components of the task. Examples of Student Work at this Level The student correctly solves the equation for y getting . Questions Eliciting Thinking Why is it necessary that b and y be non-zero real numbers? What if you were asked to solve this equation for b? How would the process of solving for b be similar to or d Instructional Implications Provide the student with opportunities to solve more complex literal equations for specified variables that req reconcile any differences. ACCOMMODATIONS & RECOMMENDATIONS Special Materials Needed: o Solving a Literal Linear Equation worksheet SOURCE AND ACCESS INFORMATION Contributed by: MFAS FCRSTEM Name of Author/Source: MFAS FCRSTEM District/Organization of Contributor(s): Okaloosa Is this Resource freely Available? Yes License: CPALMS License - no distribution - non commercial Related Standards Name MAFS.912.A-REI.2.3: Description Solve linear equations and inequalities in one variable, including equations with coefficients represented by letters.