CHAPTER TEST REVIEW Are YOU ready Amara Majeed

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CHAPTER TEST REVIEW Are YOU ready? Amara Majeed

CHAPTER TEST REVIEW Are YOU ready? Amara Majeed

THEOREMS AND POSTULATES PROOFS POT LUCK $200 $400 $600 $800

THEOREMS AND POSTULATES PROOFS POT LUCK $200 $400 $600 $800

Fill in the blanks. The _______ Angles Theorem states that if 2 angles of

Fill in the blanks. The _______ Angles Theorem states that if 2 angles of one triangle are ______ to 2 angles of another triangle, then the _____ pair of angles are also ______

The THIRD Angles Theorem states that if 2 angles of one triangle are CONGRUENT

The THIRD Angles Theorem states that if 2 angles of one triangle are CONGRUENT to 2 angles of another triangle, then the THIRD pair of angles are also CONGRUENT.

Match these Postulates. 1. SAS Postulate 2. SSS Postulate 3. ASA Postulate a. If

Match these Postulates. 1. SAS Postulate 2. SSS Postulate 3. ASA Postulate a. If 2 angles and the included side of one triangle are congruent to 2 angles and the included side of another triangle, then the triangles are congruent. b. If three sides of one triangle are congruent to three sides of another triangle, then the triangles are congruent. c. If 2 sides and the included angle of one triangle are congruent to 2 sides and the included angle of another triangle, then the triangles are congruent.

1. SAS Postulate 2. SSS Postulate 3. ASA Postulate a. If 2 angles and

1. SAS Postulate 2. SSS Postulate 3. ASA Postulate a. If 2 angles and the included side of one triangle are congruent to 2 angles and the included side of another triangle, then the triangles are congruent. b. If three sides of one triangle are congruent to three sides of another triangle, then the triangles are congruent. c. If 2 sides and the included angle of one triangle are congruent to 2 sides and the included angle of another triangle, then the triangles are congruent.

Find the measure of Angle B. B 2 x+3 5 x-60 15° A C

Find the measure of Angle B. B 2 x+3 5 x-60 15° A C . D

The sum of the remote interior angles = the exterior angle. 2 x+3+15 <-----Sum

The sum of the remote interior angles = the exterior angle. 2 x+3+15 <-----Sum of Remote interior angles 2 x+18 = 5 x-60 <------Set the sum of the remote interior angles equal to the exterior angle. 18 = 3 x-60 <-------Subtract 2 x. 78 = 3 x <----Add 60. x= 26<-------Divide by 3. 2(26) + 3 = 55

S R Given: RS if perpendicular to ST. TU is perpendicular to ST. V

S R Given: RS if perpendicular to ST. TU is perpendicular to ST. V is the midpoint of ST. V Prove: ∆RSV is congruent to ∆UTV. T STATEMENT 1. 1) RS is perpendicular to ST, TU is perpendicular to ST, V is the midpoint of ST. 2. U Reason 1) Given 2) SV is congruent to TV. 2) Def. Of midpoint 3. 3) Angle UVT is congruent to Angle RVS. 3) Vertical Angles Theorem 4. 4) RS is parallel to UT. 4) ______? _______ 5. 5) Angle S is congruent to Angle T. 5) ______? _______ 6. 6) ∆RSV is congruent to ∆UTV. 6) ______? _______

Fill in the blanks. _______Parts of _______ triangles are _______. AAS Theorem: If 2

Fill in the blanks. _______Parts of _______ triangles are _______. AAS Theorem: If 2 angles and a ______ side of 1 triangle are congruent to 2 _____ and a ______ side of another triangle, then the triangles are ______. HL Theorem: If the ______ and a ______ of one ______ triangle are congruent to the ______ and _____ of another ______ triangle, then the triangles are congruent.

CORRESPONDING Parts of CONGRUENT triangles are CONGRUENT. AAS Theorem: If 2 angles and a

CORRESPONDING Parts of CONGRUENT triangles are CONGRUENT. AAS Theorem: If 2 angles and a NON-INCLUDED side of 1 triangle are congruent to 2 ANGLES and a NON-INCLUDED side of another triangle, then the triangles are CONGRUENT. HL Theorem: If the HYPOTENUSE and a LEG of one RIGHT triangle are congruent to the HYPOTENUSE and a LEG of another RIGHT triangle, then the triangles are congruent.

S R Given: RS if perpendicular to ST. TU is perpendicular to ST. V

S R Given: RS if perpendicular to ST. TU is perpendicular to ST. V is the midpoint of ST. V Prove: ∆RSV is congruent to ∆UTV. T STATEMENT PROVE 1. 1) RS is perpendicular to ST, TU is perpendicular to ST, V is the midpoint of ST. 1) Given 2) Def. Of midpoint 2. 2) SV is congruent to TV. 3) 3. 3) Angle UVT is congruent to Angle RVS. Vertical Angles theorem 4. 4) RS is parallel to UT. 4) 5. 5) Angle S is congruent to Angle T. 6) ∆RSV is congruent to ∆UTV. If 2 lines are perpendicular to the same line, then they are parallel 5) Alternate Interior Angles Theorem 6) ASA Postulate U

G Given: FG is congruent to OG, GR bisects FO. Prove: Angle F is

G Given: FG is congruent to OG, GR bisects FO. Prove: Angle F is congruent to Angle O. F STATEMENT REASON 1) FG is congruent to OG, GR bisects FO. 1) Given 2) GR is congruent to GR. 3) _____? ______ 4) ∆GFR is congruent to ∆GOR. 5) Angle F is congruent to Angle O. 2) ____? _____ 3) Def. Of Segment Bisector 4) ___? ____ 5) ___? ____ R O

STATEMENT REASON 1) FG is congruent to OG, GR bisects FO. 1) Given 2)

STATEMENT REASON 1) FG is congruent to OG, GR bisects FO. 1) Given 2) GR is congruent to GR. 3) FR is congruent to RO. 4) ∆GFR is congruent to ∆GOR. 5) Angle F is congruent to Angle O. 2) Reflexive POC 3) Def. Of Segment Bisector 4) SSS Postulate 5) CPCTC

Which theorem or postulate can be used to prove these two triangles congruent?

Which theorem or postulate can be used to prove these two triangles congruent?

HL THEOREM This is a right triangle. Therefore, since it is supplementary to this

HL THEOREM This is a right triangle. Therefore, since it is supplementary to this angle, both triangles are classified as right triangles. This line segment is congruent to itself. It is a leg of both triangles, since it makes a right angle with the other leg. Therefore, since the hypotenuse and leg of one triangle is congruent to the hypotenuse and leg of the other triangle, according to the HL theorem, the two triangles are congruent.

BONUS ROUND! Name the 2 simple corollaries present in this unit. ($500 each) NAME

BONUS ROUND! Name the 2 simple corollaries present in this unit. ($500 each) NAME THIS POSTULATE: The sum of the lengths of any 2 sides of a triangle is greater than the length of the third side. ($500)

Insert workgroup name on slide master Insert workgroup logo on slide master Home Corollaries:

Insert workgroup name on slide master Insert workgroup logo on slide master Home Corollaries: What’s New The acute angles of a right triangle are Projects complementary. Documents The Teammeasure of each angle of an equiangular triangle is 60°. Links This is the TRIANGLE INEQUALITY POSTULATE.

T Given: E is the midpoint of MJ. TE is perpendicular to MJ. Prove:

T Given: E is the midpoint of MJ. TE is perpendicular to MJ. Prove: ∆MET is congruent to ∆JET. M STATEMENT REASON 1) E is the midpoint of MJ, TE is perpendicular to MJ. 1) Given 2) Reflexive POC 2) TE is congruent to TE. 3) ______ 3) ME is congruent to EJ. 4) ______ 4) Angle TEM=90°, Angle TEJ=90° 5) ______ 6) ______ 5) Angle TEM is congruent to Angle TEJ. 6) ∆MET is congruent to ∆JET. E J

STATEMENT REASON 1) E is the midpoint of MJ, TE is perpendicular to MJ.

STATEMENT REASON 1) E is the midpoint of MJ, TE is perpendicular to MJ. 1) Given 2) TE is congruent to TE. 3) Def. of midpoint 3) ME is congruent to EJ. 4) Angle TEM=90°, Angle TEJ=90° 5) Angle TEM is congruent to Angle TEJ. 6) ∆MET is congruent to ∆JET. 2) Reflexive POC 4) Def. Of perpendicular lines 5) Transitive POC 6) SAS postulate

P Given: Isosceles ∆PQR, base QR, PA is congruent to PB A Prove: AR

P Given: Isosceles ∆PQR, base QR, PA is congruent to PB A Prove: AR is congruent to BQ Q STATEMENT REASON 1) Isosceles ∆PQR, base QR, PA is congruent to PB 1) Given 2) Reflexive POC 2) Angle P is congruent to Angle P 3) _________ 3) PQ is congruent to PR 4) _________ 4) ∆QPB is congruent to ∆RPA 5) _________ 5) AR is congruent to BQ B R

STATEMENT REASON 1) Isosceles ∆PQR, base QR, PA is congruent to PB 1) Given

STATEMENT REASON 1) Isosceles ∆PQR, base QR, PA is congruent to PB 1) Given 2) Angle P is congruent to Angle P 3) PQ is congruent to PR 4) ∆QPB is congruent to ∆RPA 5) AR is congruent to BQ 2) 2) Reflexive POC 3) 3) Def. Of Isosceles ∆ 4) 4) SAS postulate 5) 5) CPCTC

Can a triangle have the following measures? 1) 2, 4, 4 2) 8, 8,

Can a triangle have the following measures? 1) 2, 4, 4 2) 8, 8, 8 3) 3) 3, 1, 1 4) 4) 5, 6, 7

1)YES 2)YES 3)NO 4)YES

1)YES 2)YES 3)NO 4)YES

Any questions answered incorrectly will cost DOUBLE the amount of points. (Each question is

Any questions answered incorrectly will cost DOUBLE the amount of points. (Each question is 200 points. ) State which postulate or theorem, if any, proves that the two triangles are congruent. 1) 2)

1. 1) NONE 2) AAS THEOREM

1. 1) NONE 2) AAS THEOREM