Triangle Congruence Formative Assessment
What does "congruent" triangles mean?
[b][color=#ff0000][size=150][size=200]A congruent triangle means that one triangle shape can fit exactly over another using Turns, Flips and Slides[/size][/size][/color][/b]
[size=200][b][color=#ff0000]Congruent Triangles[/color][/b][/size]
[size=150][color=#0000ff]When two triangles are congruent they will have exactly [/color][b][color=#ff0000]the same side measures (all 3 sides),[/color][/b][color=#0000ff] and the [/color][b][color=#ff0000]same angle measures (all 3 angles).[/color][/b][color=#0000ff][br][br]The equal sides and angles may not be in the same position (if there is a turn of a flie), but they are there.[/color][/size]
[size=150][b][color=#980000][size=200]Same Sides[/size][/color][/b][/size]
[b][color=#0000ff]When the sides are the same then the triangles are congruent.[/color][/b]
[size=200][b][color=#980000]Same Angles[/color][/b][/size]
[size=150][b][color=#0000ff][size=200]Does this also work with angles? Not always![/size][/color][/b][/size]
[size=200][b][color=#ff0000]Marking[/color][/b][/size]
[b][color=#1e84cc][size=150]When two triangles are congruent we often mark corresponding sides and angles like this:[/size][/color][/b]
[size=150][b][color=#980000]The sides marked with one line are equal in length. Similarly for the sides marked with two lines. Also for the sides marked with three lines. [br][br][/color][/b][/size][b][color=#980000][size=150]The angles marked with one arc are equal in size. Similarly for the angles marked with two arcs. Also for the angles marked with three arc. [/size][/color][/b]
[size=200][b][color=#ff0000]Your Turn![/color][/b][/size]
[b][color=#0000ff][size=150]Choose the correct answer[/size][/color][/b]
[size=150][color=#0000ff][b]Choose the correct answer[/b][/color][/size]
[size=150][b][color=#0000ff]Choose the correct answer[/color][/b][/size]
[b][color=#ff0000]Which one of the following statements is NOT sufficient to determine whether or not two triangles P and Q are congruent?[/color][/b]
By what postulate are these ROTATED triangles congruent?
[img]data:image/png;base64,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[/img]
By what postulate are these REFLECTED triangles congruent?
[img]data:image/png;base64,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[/img]
By what postulate are these REFLECTED triangles congruent?
[img]data:image/png;base64,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[/img]