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Grade 10 Triangles CCSS: HSG-SRT.B.5

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What is the missing reason in step 22?
  1. SAS Congruence Theorem
  2. AAS Congruence Theorem
  3. HL Congruence Theorem
  4. ASA Congruence Theorem
Grade 10 Two Dimensional Shapes
Grade 9 Triangles
If two angles of one triangle are congruent to two angles of another triangle, then the third pair of angles are congruent.
  1. Triangle Sum Theorem
  2. Third Angles Theorem
  3. Pythagorean Theorem
  4. Exterior Angle Theorem
Grade 10 Points, Lines, and Planes
Through a point not on a line, there is one and only one line parallel to the given line.
  1. Triangle Exterior Angles Theorem
  2. Triangle Angle-Sum Theorem
  3. Perpendicular Transversal Theorem
  4. Parallel Postulate
Grade 7 STEM Words
Choose the correctly spelled word:
  1. theorem
  2. therem
  3. theorum
Grade 10 Similar and Congruent Figures CCSS: HSG-SRT.B.4

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What is the missing reason in step 34?
  1. Binomial Expansion Theorem
  2. Addition Property of Equality
  3. Pythagorean Theorem
  4. Perimeter of a triangle
Grade 10 Pythagorean Theorem and Applications
Grade 10 Pythagorean Theorem and Applications
Grade 11 Trigonometry CCSS: HSF-TF.C.9

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What is the missing reason in step 11?
  1. Ratios of right triangles
  2. SAS Congruence Theorem
  3. Pythagorean Theorem
  4. SAS formula for area of a triangle
Grade 10 Points, Lines, and Planes CCSS: HSG-CO.A.1
Grade 8 Pythagorean Theorem and Applications
Grade 11 Trigonometry CCSS: HSG-SRT.D.9

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What is the missing reason in step 6?
  1. Definition of an altitude
  2. Perpendicular Bisector Theorem
  3. Triangle Bisector Theorem
  4. [math]bar{AC}[/math] and [math]bar{CD}[/math] are not parallel so they must be perpendicular
Grade 8 Pythagorean Theorem and Applications CCSS: 8.G.B.6
Which of the following is a way to state the Pythagorean Theorem?
  1. [math]l eg^2 - "hypotenuse"^2 = l eg^2[/math]
  2. [math]l eg^2 + "hypotenuse"^2 = l eg^2[/math]
  3. [math]l eg^2 - l eg^2 = "hypotenuse"^2[/math]
  4. [math]l eg^2 + l eg^2 = "hypotenuse"^2[/math]
Grade 11 Trigonometry CCSS: HSG-SRT.D.9

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What is the missing reason in step 3?
  1. [math]bar{BD}[/math] and [math]bar{AC}[/math] are not parallel, so they must be perpendicular
  2. Triangle Bisector Theorem
  3. Perpendicular Bisector Theorem
  4. Definition of an altitude
Grade 11 Trigonometry CCSS: HSG-SRT.D.10
Which of the following is true concerning the law of cosines formula for a right triangle? Choose all correct answers.
  1. It simplifies to the Pythagorean Theorem for the right angle.
  2. It simplifies to the Pythagorean Theorem for all angles.
  3. It can be easily proven for the acute angles, mainly using the Pythagorean Theorem and the cosine ratio for that angle.
  4. It cannot be applied to right triangles.
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