Honors Geometry Unit 4 Scale: Difference between revisions
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{| class="wikitable mw-collapsible" | {| class="wikitable mw-collapsible" | ||
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|'''Level 4''' | |'''Level 4''' | ||
| | | | ||
* | ===== I can... ===== | ||
* Construct formal arguments and justifications using segment and angle relationships. | |||
* Solve multi-step problems involving bisectors, vertical angles, or algebraic expressions. | |||
* Use precise geometric vocabulary and notation in explanations. | |||
|- | |- | ||
|'''Level 3.5''' | |'''Level 3.5''' | ||
| Line 19: | Line 23: | ||
|- | |- | ||
|'''Level 3''' | |'''Level 3''' | ||
| | | | ||
* | ===== I can... ===== | ||
* Identify and apply relationships among a variety of angles. | |||
* Use segment and angle addition postulates to solve problems. | |||
* Apply theorems about angles formed by parallel/perpendicular lines and transversals to solve problems. | |||
* Solve for unknown angle or segment measures using diagrams and equations. | |||
|- | |- | ||
|'''Level 2.5''' | |'''Level 2.5''' | ||
| Line 26: | Line 35: | ||
|- | |- | ||
|'''Level 2''' | |'''Level 2''' | ||
| | | | ||
* | ===== I can... ===== | ||
* Recognize and label points, lines, segments, and angles with guidance. | |||
* Identify basic relationships (e.g., vertical angles, midpoint) with some support. | |||
* Use formulas or properties when steps are scaffolded. | |||
|- | |- | ||
| Line 34: | Line 47: | ||
|- | |- | ||
|'''Level 1''' | |'''Level 1''' | ||
| | | | ||
===== I can... ===== | |||
* Recognize segments and angles but struggles to describe relationships. | |||
* | * Receive assistance to set up or solve basic geometric problems. | ||
* Misuse or confuse geometric terms or symbols. | |||
|} | |} | ||
=== Priority === | |||
==== '''Knowledge''' ==== | |||
Students know: | |||
* Undefined notions of point, line, distance along a line, and distance around a circular arc. | |||
* Properties of a mathematical definition, i.e., the smallest amount of information and properties that are enough to determine the concept. (Note: May not include all information related to the concept.) | |||
* Requirements for a mathematical proof. | |||
* Techniques for presenting a proof of geometric theorems. | |||
---- | |||
==== '''Skills''' ==== | |||
Students are able to: | |||
* Use known and developed definitions and logical connections to develop new definitions. | |||
* Communicate logical reasoning in a systematic way to present a mathematical proof of geometric theorems. | |||
* Generate a conjecture about geometric relationships that call for proof. | |||
---- | |||
==== '''Understanding''' ==== | |||
Students understand that: | |||
* Geometric definitions are developed from a few undefined notions by a logical sequence of connections that lead to a precise definition. | |||
* A precise definition should allow for the inclusion of all examples of the concept, and require the exclusion of all non-examples. | |||
* Proof is necessary to establish that a conjecture about a relationship in mathematics is always true, and may also provide insight into the mathematics being addressed. | |||
=== Supporting === | |||
'''Knowledge''' | |||
Students know: | |||
* Substitution, elimination, and graphing methods to solve simultaneous linear equations. | |||
* Use technology and other tools to discover patterns and relationships in figures. | |||
* Use patterns. relationships and properties to construct figures. | |||
----'''Skills''' | |||
Students are able to: | |||
* Find the coordinates of the vertices of a polygon given a set of lines and their equations by setting their function rules equal and solving or by using their graph. | |||
* Use properties to create methods for constructing different objects and prove that the constructions are accurate. | |||
----'''Understanding''' | |||
Students understand that: | |||
* Given the equations to a set of lines you can find the coordinates of the vertices of a polygon by setting their function rules equal and solving or by using their graph. | |||
* Many of the constructions build on the relationships among the objects and are justified by the properties used during the construction. | |||
* Technology can be used as a means to explain the properties and definitions by developing procedures to carry out the construction. | |||
Latest revision as of 22:13, 21 September 2025
| Unit 4 | Segments and Angles |
|---|---|
| Priority Standards: | 30, 31 |
| Supporting Standards: | 3, 29, 33 |
| Level 4 |
I can...
|
| Level 3.5 | |
| Level 3 |
I can...
|
| Level 2.5 | |
| Level 2 |
I can...
|
| Level 1.5 | |
| Level 1 |
I can...
|
Priority
Knowledge
Students know:
- Undefined notions of point, line, distance along a line, and distance around a circular arc.
- Properties of a mathematical definition, i.e., the smallest amount of information and properties that are enough to determine the concept. (Note: May not include all information related to the concept.)
- Requirements for a mathematical proof.
- Techniques for presenting a proof of geometric theorems.
Skills
Students are able to:
- Use known and developed definitions and logical connections to develop new definitions.
- Communicate logical reasoning in a systematic way to present a mathematical proof of geometric theorems.
- Generate a conjecture about geometric relationships that call for proof.
Understanding
Students understand that:
- Geometric definitions are developed from a few undefined notions by a logical sequence of connections that lead to a precise definition.
- A precise definition should allow for the inclusion of all examples of the concept, and require the exclusion of all non-examples.
- Proof is necessary to establish that a conjecture about a relationship in mathematics is always true, and may also provide insight into the mathematics being addressed.
Supporting
Knowledge
Students know:
- Substitution, elimination, and graphing methods to solve simultaneous linear equations.
- Use technology and other tools to discover patterns and relationships in figures.
- Use patterns. relationships and properties to construct figures.
Skills
Students are able to:
- Find the coordinates of the vertices of a polygon given a set of lines and their equations by setting their function rules equal and solving or by using their graph.
- Use properties to create methods for constructing different objects and prove that the constructions are accurate.
Understanding
Students understand that:
- Given the equations to a set of lines you can find the coordinates of the vertices of a polygon by setting their function rules equal and solving or by using their graph.
- Many of the constructions build on the relationships among the objects and are justified by the properties used during the construction.
- Technology can be used as a means to explain the properties and definitions by developing procedures to carry out the construction.