Unit 04: Learning Targets: Properties of Geometric Figures – Triangles
The information in this unit is so vast. The content will be broken up into multiple test sections.
04.A
GD2a1: I can identify triangles by their sides. GD2a2: I can identify triangles by their angles. GD2a3: I can classify triangles by their sides. GD2a4: I can classify triangles by their angles. |
04.B
GD2b1: I can identify medians of triangles. GD2b2: I can identify altitudes of triangles. GD2b1: I can identify perpendicular bisectors of triangles. GD2b2: I can identify angle bisectors of triangles. GD2b1: I can use properties of medians of triangles to solve problems. GD2b2: I can use properties of altitudes of triangles to solve problems. GD2b1: I can use properties of perpendicular bisectors of triangles to solve problems. GD2b2: I can use properties of angle bisectors of triangles to solve problems. MAP Problem Solving: Inscribing and Circumscribing Right Triangles MAP Problem Solving: Geometry Problems: Circles and Triangles |
Video (KhanA)Notes Medians & Centroids
Video (KhanA)Notes Altitudes Video (KhanA)Notes Perpendicular Bisectors Video (KhanA)Notes Angle Bisectors Video (KhanA)Notes Review Notes ppt Online Assignment 04a.1B Exit Slip 04.1B |
04.C
GD2c1: I can apply the Triangle Inequality Theorem to determine if a triangle exists. GD2c2: I can apply the Triangle Inequality Theorem to determine the order of sides and angles of a triangle. |
04.D
GD2d1: I can solve problems involving the relationships formed when the altitude to the hypotenuse of a right triangle is drawn. |
04.E
GD2e1: I can apply the Pythagorean Theorem to triangles to solve mathematical problems. GD2e2: I can apply the converse Pythagorean Theorem to triangles to solve mathematical problems. GD2e3: I can apply the Pythagorean Theorem to triangles to solve real-world problems. GD2e4: I can apply the converse Pythagorean Theorem to triangles to solve real-world problems. MAP Problem Solving: Proofs of the Pythagorean Theorem |
04.F
GD2f1: I can identify Pythagorean triples in right triangles. GD2f2: I can use Pythagorean triples in right triangles to find the length of an unknown side. |
04.G
GD2i1: I can apply the Angle Sum Theorem for triangles to find interior and exterior angle measures given the number of sides. GD2i2: I can apply the Angle Sum Theorem for polygons to find interior and exterior angle measures given the number of sides. GD2i3: I can apply the Angle Sum Theorem for triangles to find the number of sides given angle measures. GD2i4: I can apply the Angle Sum Theorem for polygons to find the number of sides given angle measures. GD2i5: I can apply the Angle Sum Theorem for triangles to solve real-world problems. GD2i6: I can apply the Angle Sum Theorem for polygons to solve real-world problems. |
Video (KhanA) Notes
Web Notes ppt Video Remote Interior Angles Web Notes Remote Interior Angles Online Assignment 04a.1G Exit Slip 04a.1G |
04.H
GD2j1: I can apply the Isosceles Triangle Theorem to solve mathematical problems. GD2j2: I can apply the Isosceles Triangle Theorem to solve real-world problems. GD2j3: I can apply the converse Isosceles Triangle Theorem to solve mathematical problems. GD2j4: I can apply the converse Isosceles Triangle Theorem to solve real-world problems. |
04.I
GC1f1: I can prove two triangles congruent by applying the SSS congruence statements. GC1f2: I can prove two triangles congruent by applying the SAS congruence statements. GC1f3: I can prove two triangles congruent by applying the ASA congruence statements. GC1f4: I can prove two triangles congruent by applying the AAS congruence statements. GC1f5: I can prove two triangles congruent by applying the HL congruence statements. GC1g1: I can use the principle that corresponding parts of congruent triangles are congruent to solve problems. GC1h1: I can use AA to prove that two triangles are similar .GC1h2: I can use SAS to prove that two triangles are similar. GC1h3: I can use SSS to prove that two triangles are similar. GC1h4: I can use AA to prove that corresponding sides are proportional. GC1h5: I can use SAS to prove that corresponding sides are proportional. GC1h6: I can use SSS to prove that corresponding sides are proportional. GC1h7: I can use AA to prove that corresponding angles are congruent. GC1h8: I can use SAS to prove that corresponding angles are congruent. GC1h9: I can use SSS to prove that corresponding angles are congruent. GC1e1: I can read two-column proofs. GC1e2: I can read flowchart proofs. GC1e3: I can read paragraph proofs. GC1e4: I can read indirect proofs. GC1e5: I can write two-column proofs. GC1e6: I can write flowchart proofs. GC1e7: I can write paragraph proofs. GC1e8: I can write indirect proofs. MAP Concept Development: Analyzing Congruence Proofs |
Performance Tasks
Performance Tasks click link to see list
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Square in Triangle (may complete after Area & Perimeter unit)
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