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Welcome to Interactive Chalkboard
Glencoe Geometry Interactive Chalkboard Copyright © by The McGraw-Hill Companies, Inc. Developed by FSCreations, Inc., Cincinnati, Ohio Send all inquiries to: GLENCOE DIVISION Glencoe/McGraw-Hill 8787 Orion Place Columbus, Ohio Welcome to Interactive Chalkboard
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Splash Screen
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Lesson 5-1 Bisectors, Medians, and Altitudes
Lesson 5-2 Inequalities and Triangles Lesson 5-3 Indirect Proof Lesson 5-4 The Triangle Inequality Lesson 5-5 Inequalities Involving Two Triangles Contents
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Example 1 Use Angle Bisectors Example 2 Segment Measures
Example 3 Use a System of Equations to Find a Point Lesson 1 Contents
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Given: Prove: Example 1-1a
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5. Definition of angle bisector
Proof: Statements Reasons 1. 1. Given 2. 2. Angle Sum Theorem 3. 3. Substitution 4. 4. Subtraction Property 5. 5. Definition of angle bisector 6. 6. Angle Sum Theorem 7. 7. Substitution 8. 8. Subtraction Property Example 1-1a
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Given: . Prove: Example 1-1b
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Proof: Statements. Reasons
1. Given 2. Angle Sum Theorem 3. Substitution 4. Subtraction Property 5. Definition of angle bisector 6. Angle Sum Theorem 7. Substitution 8. Subtraction Property 1. Given Example 1-1b
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ALGEBRA Points U, V, and W are the midpoints of. respectively
ALGEBRA Points U, V, and W are the midpoints of respectively. Find a, b, and c. Example 1-2a
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Segment Addition Postulate
Find a. Segment Addition Postulate Centroid Theorem Substitution Multiply each side by 3 and simplify. Subtract 14.8 from each side. Divide each side by 4. Example 1-2a
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Segment Addition Postulate
Find b. Segment Addition Postulate Centroid Theorem Substitution Multiply each side by 3 and simplify. Subtract 6b from each side. Subtract 6 from each side. Divide each side by 3. Example 1-2a
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Segment Addition Postulate
Find c. Segment Addition Postulate Centroid Theorem Substitution Multiply each side by 3 and simplify. Subtract 30.4 from each side. Divide each side by 10. Answer: Example 1-2a
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ALGEBRA Points T, H, and G are the midpoints of. respectively
ALGEBRA Points T, H, and G are the midpoints of respectively. Find w, x, and y. Answer: Example 1-2b
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COORDINATE GEOMETRY The vertices of HIJ are H(1, 2), I(–3, –3), and J(–5, 1). Find the coordinates of the orthocenter of HIJ. Example 1-3a
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Find an equation of the altitude from The slope of
so the slope of an altitude is Point-slope form Distributive Property Add 1 to each side. Example 1-3a
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Next, find an equation of the altitude from I to The
slope of so the slope of an altitude is –6. Point-slope form Distributive Property Subtract 3 from each side. Example 1-3a
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Equation of altitude from J
Then, solve a system of equations to find the point of intersection of the altitudes. Equation of altitude from J Substitution, Multiply each side by 5. Add 105 to each side. Add 4x to each side. Divide each side by –26. Example 1-3a
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Replace x with in one of the equations to find the y-coordinate.
Rename as improper fractions. Multiply and simplify. The coordinates of the orthocenter of Answer: Example 1-3a
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COORDINATE GEOMETRY The vertices of ABC are A(–2, 2), B(4, 4), and C(1, –2). Find the coordinates of the orthocenter of ABC. Answer: (0, 1) Example 1-3b
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End of Lesson 1
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Example 1 Compare Angle Measures Example 2 Exterior Angles
Example 3 Side-Angle Relationships Example 4 Angle-Side Relationships Lesson 2 Contents
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Inequalities For any real numbers a and b, a>b if and only if there is a positive number c such that a = b + c. If 6 = 4 + 2, 6 > 4 and 6 >2. Theorem 5.8: Exterior Angle Inequality – If an angle is an exterior angle of a triangle, then its measure is greater than the measure of either of its corresponding remote interior angles.
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Determine which angle has the greatest measure.
Explore Compare the measure of 1 to the measures of 2, 3, 4, and 5. Plan Use properties and theorems of real numbers to compare the angle measures. Example 2-1a
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Solve Compare m3 to m1. By the Exterior Angle Theorem, m1 m3 m4. Since angle measures are positive numbers and from the definition of inequality, m1 > m3. Compare m4 to m1. By the Exterior Angle Theorem, m1 m3 m4. By the definition of inequality, m1 > m4. Compare m5 to m1. Since all right angles are congruent, 4 5. By the definition of congruent angles, m4 m5. By substitution, m1 > m5. Example 2-1a
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Answer: 1 has the greatest measure.
Compare m2 to m5. By the Exterior Angle Theorem, m5 m2 m3. By the definition of inequality, m5 > m2. Since we know that m1 > m5, by the Transitive Property, m1 > m2. Examine The results on the previous slides show that m1 > m2, m1 > m3, m1 > m4, and m1 > m5. Therefore, 1 has the greatest measure. Answer: 1 has the greatest measure. Example 2-1a
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Determine which angle has the greatest measure.
Answer: 5 has the greatest measure. Example 2-1b
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Use the Exterior Angle Inequality Theorem to list all angles whose measures are less than m14.
By the Exterior Angle Inequality Theorem, m14 > m4, m14 > m11, m14 > m2, and m14 > m4 + m3. Since 11 and 9 are vertical angles, they have equal measure, so m14 > m9. m9 > m6 and m9 > m7, so m14 > m6 and m14 > m7. Answer: Thus, the measures of 4, 11, 9, 3, 2, 6, and 7 are all less than m14 . Example 2-2a
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Use the Exterior Angle Inequality Theorem to list all angles whose measures are greater than m5.
By the Exterior Angle Inequality Theorem, m10 > m5, and m16 > m10, so m16 > m5, m17 > m5 + m6, m15 > m12, and m12 > m5, so m15 > m5. Answer: Thus, the measures of 10, 16, 12, 15 and 17 are all greater than m5. Example 2-2b
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a. all angles whose measures are less than m4
Use the Exterior Angle Inequality Theorem to list all of the angles that satisfy the stated condition. a. all angles whose measures are less than m4 b. all angles whose measures are greater than m8 Answer: 5, 2, 8, 7 Answer: 4, 9, 5 Example 2-2c
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More Inequality Theorems
Theorem 5.9: If one side of a triangle is longer than another side, then the angle opposite the longer side has a greater measure than the angle opposite the shorter side. Theorem 5.10: If one angle of a triangle has a greater measure than another angle, then the side opposite the greater angle is longer than the side opposite the lesser angle.
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Determine the relationship between the measures of RSU and SUR.
Answer: The side opposite RSU is longer than the side opposite SUR, so mRSU > mSUR. Example 2-3a
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Determine the relationship between the measures of TSV and STV.
Answer: The side opposite TSV is shorter than the side opposite STV, so mTSV < mSTV. Example 2-3b
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Determine the relationship between the measures of RSV and RUV.
mRSU > mSUR mUSV > mSUV mRSU + mUSV > mSUR + mSUV mRSV > mRUV Answer: mRSV > mRUV Example 2-3c
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Determine the relationship between the measures of the given angles.
a. ABD, DAB b. AED, EAD c. EAB, EDB Answer: ABD > DAB Answer: AED > EAD Answer: EAB < EDB Example 2-3d
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HAIR ACCESSORIES Ebony is following directions for folding a handkerchief to make a bandana for her hair. After she folds the handkerchief in half, the directions tell her to tie the two smaller angles of the triangle under her hair. If she folds the handkerchief with the dimensions shown, which two ends should she tie? Example 2-4a
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Answer: So, Ebony should tie the ends marked Y and Z.
Theorem 5.10 states that if one side of a triangle is longer than another side, then the angle opposite the longer side has a greater measure than the angle opposite the shorter side. Since X is opposite the longest side it has the greatest measure. Answer: So, Ebony should tie the ends marked Y and Z. Example 2-4a
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KITE ASSEMBLY Tanya is following directions for making a kite
KITE ASSEMBLY Tanya is following directions for making a kite. She has two congruent triangular pieces of fabric that need to be sewn together along their longest side. The directions say to begin sewing the two pieces of fabric together at their smallest angles. At which two angles should she begin sewing? Answer: A and D Example 2-4b
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End of Lesson 2
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Example 1 Stating Conclusions Example 2 Algebraic Proof
Example 3 Use Indirect Proof Example 4 Geometry Proof Lesson 3 Contents
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Answer: is a perpendicular bisector.
State the assumption you would make to start an indirect proof for the statement is not a perpendicular bisector. Answer: is a perpendicular bisector. Example 3-1a
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State the assumption you would make to start an indirect proof for the statement
Answer: Example 3-1b
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If m1 m2 is false, then m1 > m2.
State the assumption you would make to start an indirect proof for the statement m1 is less than or equal to m2. If m1 m2 is false, then m1 > m2. Answer: m1 > m2 Example 3-1c
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Answer: is not congruent to
State the assumption you would make to start an indirect proof for the statement If B is the midpoint of and then is congruent to The conclusion of the conditional statement is is congruent to The negation of the conclusion is is not congruent to Answer: is not congruent to Example 3-1d
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State the assumption you would make to start an indirect proof of each statement.
a. is not an altitude. b. Answer: is an altitude. Answer: Example 3-1e
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d. If is an angle bisector of MLP, then MLH is congruent to PLH.
State the assumption you would make to start an indirect proof of each statement. c. mABC is greater than or equal to mXYZ. Answer: mABC < mXYZ Answer: MLH is not congruent to PLH. Example 3-1e
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Write an indirect proof.
Given: Prove: Indirect Proof: Step 1 Assume that . Example 3-2a
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Step 2 Substitute –2 for y in the equation
Substitution Multiply. Add. This is a contradiction because the denominator cannot be 0. Example 3-2b
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Step 3. The assumption leads to a contradiction
Step 3 The assumption leads to a contradiction. Therefore, the assumption that must be false, which means that must be true. Example 3-2c
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Write an indirect proof.
Given: Prove: Write an indirect proof. Indirect Proof: Step 1 Assume that Example 3-2d
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Step 2 Substitute –3 for a in the inequality
This is a contradiction because the denominator cannot be 0. Substitution Multiply. Add. Example 3-2b
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Step 3. The assumption leads to a contradiction
Step 3 The assumption leads to a contradiction. Therefore, the assumption that must be false, which means that must be true. Example 3-2b
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Given: Marta spent less than $156.
CLASSES Marta signed up for three classes at a community college for a little under $156. There was an administration fee of $15, but the class costs varied. How can you show that at least one class cost less than $47? Answer: Given: Marta spent less than $156. Prove: At least one of the classes x cost less than $47. That is, Example 3-3a
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Step 1 Assume that none of the classes cost less than $47.
Indirect Proof: Step 1 Assume that none of the classes cost less than $47. Step 2 then the minimum total amount Marta spent is However, this is a contradiction since Marta spent less than $156. Step 3 The assumption leads to a contradiction of a known fact. Therefore, the assumption that must be false. Thus, at least one of the classes cost less than $47. Example 3-3a
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Given: David spent less than $135.
SHOPPING David bought four new sweaters for a little under $135. The tax was $7, but the sweater costs varied. How can you show that at least one of the sweaters cost less than $32? Answer: Given: David spent less than $135. Prove: At least one of the sweaters x cost less than $32. That is, Example 3-3b
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Step 1 Assume that none of the sweaters cost less than $32.
Step 3 The assumption leads to a contradiction of a known fact. Therefore, the assumption that must be false. Thus, at least one of the sweaters cost less than $32. Step 1 Assume that none of the sweaters cost less than $32. Indirect Proof: Step 2 then the minimum total amount David spent is However, this is a contradiction since David spent less than $135. Example 3-3b
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Write an indirect proof.
Given: JKL with side lengths 5, 7, and 8 as shown. Prove: mK < mL Example 3-4a
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Indirect Proof: Step 1 Assume that
Step 2 By angle-side relationships, By substitution, . This inequality is a false statement. Step 3 Since the assumption leads to a contradiction, the assumption must be false. Therefore, mK < mL. Example 3-4a
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Given: ABC with side lengths 8, 10, and 12 as shown.
Prove: mC > mA Write an indirect proof. Example 3-4b
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Indirect Proof: Step 1 Assume that
Step 3 Since the assumption leads to a contradiction, the assumption must be false. Therefore, mC > mA. Indirect Proof: Step 1 Assume that Step 2 By angle-side relationships, By substitution, This inequality is a false statement. Example 3-4b
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End of Lesson 3
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Example 1 Identify Sides of a Triangle
Example 2 Determine Possible Side Length Example 3 Prove Theorem 5.12 Lesson 4 Contents
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Theorem 5.11: Triangle Inequality Theorem
The sum of the lengths of any two sides of a triangle is greater than the length of the third side. This theorem will be used to determine whether three segments can form a triangle.
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Determine whether the measures and
can be lengths of the sides of a triangle. Answer: Because the sum of two measures is not greater than the length of the third side, the sides cannot form a triangle. Example 4-1a
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Determine whether the measures 6. 8, 7. 2, and 5
Determine whether the measures 6.8, 7.2, and 5.1 can be lengths of the sides of a triangle. Check each inequality. Answer: All of the inequalities are true, so 6.8, 7.2, and 5.1 can be the lengths of the sides of a triangle. Example 4-1b
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Determine whether the given measures can be lengths of the sides of a triangle.
Answer: no Answer: yes Example 4-1c
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Multiple-Choice Test Item In and Which measure cannot be PR?
A 7 B 9 C 11 D 13 Example 4-2a
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You need to determine which value is not valid.
Read the Test Item You need to determine which value is not valid. Solve the Test Item Solve each inequality to determine the range of values for PR. Example 4-2a
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Graph the inequalities on the same number line.
The range of values that fit all three inequalities is Example 4-2a
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Examine the answer choices
Examine the answer choices. The only value that does not satisfy the compound inequality is 13 since 13 is greater than Thus, the answer is choice D. Answer: D Example 4-2a
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Multiple-Choice Test Item Which measure cannot be XZ?
A 4 B 9 C 12 D 16 Answer: D Example 4-2b
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Perpendicular Segments
Theorem 5.12: The perpendicular segment from a point to a line is the shortest segment from the point to the line. Corollary 5.1: The perpendicular segment from a point to a plane is the shortest segment from the point to a plane.
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Given: line through point J Point K lies on t.
Prove: KJ < KH Example 4-3a
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2. Perpendicular lines form right angles.
Proof: Statements Reasons 1. 1. Given are right angles. 2. 2. Perpendicular lines form right angles. 3. 3. All right angles are congruent. 4. 4. Definition of congruent angles 5. 5. Exterior Angle Inequality Theorem 6. 6. Substitution 7. 7. If an angle of a triangle is greater than a second angle, then the side opposite the greater angle is longer than the side opposite the lesser angle. Example 4-3a
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Given: is an altitude in ABC.
Prove: AB > AD Given: is an altitude in ABC. Example 4-3b
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Proof: Statements 1. 2. 3. 4. Reasons
Reasons 1. Given 2. Definition of altitude 3. Perpendicular lines form right angles. 4. All right angles are congruent. is an altitude in are right angles. Example 4-3b
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Proof: Statements 5. 6. 7. 8. Reasons
5. Definition of congruent angles 6. Exterior Angle Inequality Theorem 7. Substitution 8. If an angle of a triangle is greater than a second angle, then the side opposite the greater angle is longer than the side opposite the lesser angle. Example 4-3b
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End of Lesson 4
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Example 1 Use SAS Inequality in a Proof
Example 2 Prove Triangle Relationships Example 3 Relationships Between Two Triangles Example 4 Use Triangle Inequalities Lesson 5 Contents
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Write a two-column proof.
Given: Prove: Example 5-1a
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2. Alternate interior angles are congruent.
Proof: Statements Reasons 1. 1. Given 2. 2. Alternate interior angles are congruent. 3. 3. Substitution 4. 4. Subtraction Property 5. 5. Given 6. 6. Reflexive Property 7. 7. SAS Inequality Example 5-1a
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Given: m1 < m3 E is the midpoint of Write a two-column proof.
Prove: AD < AB Given: m1 < m3 E is the midpoint of Write a two-column proof. Example 5-1b
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Proof: Statements 1. 2. 3. 4. 5. 6. 7. Reasons
1. Given 2. Definition of midpoint 3. Reflexive Property 4. Given 5. Definition of vertical angles 6. Substitution 7. SAS Inequality E is the midpoint of Example 5-1b
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Given: Prove: Example 5-2a
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Proof: Statements Reasons 1. 1. Given 2. 2. Reflexive Property 3.
4. 4. Given 5. 5. Substitution 6. 6. SSS Inequality Example 5-2a
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Given: X is the midpoint of MCX is isosceles. CB > CM
Prove: Example 5-2b
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Proof: Statements 1. 2. 3. 4. 5. 6. 7. Reasons
Reasons 1. Given 2. Definition of midpoint 3. Given 4. Definition of isosceles triangle 5. Given 6. Substitution 7. SSS Inequality X is the midpoint of MCX is isosceles. Example 5-2b
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SAS Inequality/Hinge Theorem
If two sides of a triangle are congruent to two sides of another triangle and the included angle in one triangle has a greater measure than the included angle in the other, then the third side of the first triangle is longer than the third side of the second triangle.
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SSS Inequality If two sides of a triangle are congruent to two sides of another triangle and the third side in one triangle is longer than the third side in the other, then the angle between the pair of congruent sides in the first triangle is greater than the corresponding angle in the second triangle.
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The SSS Inequality allows us to conclude that
Write an inequality comparing mLDM and mMDN using the information in the figure. The SSS Inequality allows us to conclude that Answer: Example 5-3a
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Write an inequality finding the range of values containing a using the information in the figure.
By the SSS Inequality, Example 5-3b
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Subtract 15 from each side.
SSS Inequality Substitution Subtract 15 from each side. Divide each side by 9. Also, recall that the measure of any angle is always greater than 0. Subtract 15 from each side. Divide each side by 9. Example 5-3b
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The two inequalities can be written as the compound inequality
Answer: Example 5-3b
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Write an inequality using the information in the figure. a.
b. Find the range of values containing n. Answer: Answer: 6 < n < 25 Example 5-3c
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HEALTH Doctors use a straight-leg-raising test to determine the amount of pain felt in a person’s back. The patient lies flat on the examining table, and the doctor raises each leg until the patient experiences pain in the back area. Nitan can tolerate the doctor raising his right leg 35° and his left leg 65° from the table. Which foot can Nitan raise higher above the table? Assume both of Nitan’s legs have the same measurement, the SAS Inequality tells us that the height of the left foot opposite the 65° angle is higher than the height of his right foot opposite the 35° angle. This means that his left foot is raised higher. Answer: his left foot Example 5-4a
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HEALTH Doctors use a straight-leg-raising test to determine the amount of pain felt in a person’s back. The patient lies flat on the examining table, and the doctor raises each leg until the patient experiences pain in the back area. Megan can lift her right foot 18 inches from the table and her left foot 13 inches from the table. Which leg makes the greater angle with the table? Answer: her right leg Example 5-4b
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End of Lesson 5
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