1. ANGLES FORM BY A TRANSVERSAL PARALLEL LINES CUT BY A TRANSVERSAL
Standard 7
ANGLES FORM BY A TRANSVERSAL
PARALLEL LINES CUT BY A TRANSVERSAL
PROBLEM 1
PROBLEM 2
PROBLEM 3
PROBLEM 4
PROBLEM 5
PROBLEM 6
PROBLEM 7A
PROBLEM 7B
PROBLEM 8A
PROBLEM 8B
PROBLEM 9A
PROBLEM 9B
END SHOW
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2. STANDARD 7:
Students prove and use theorems involving the properties of parallel lines cut by a transversal, the properties of quadrilaterals, and properties of circles.
ESTÁNDAR 7:
Los estudiantes prueban y usan teoremas involucrando las propiedades de líneas paralelas cortadas por una transversal, las propiedades de cuadriláteros, y las propiedades de círculos.
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3. LINES CUT BY A TRANSVERSAL
Standard 7
LINES CUT BY A TRANSVERSAL k m l
Line k is a TRANSVERSAL cutting lines m and l.
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4. EXTERIOR INTERIOR Standard 7 k m l
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5. ANGLES FORMED BY A TRANSVERSAL Standard 7k m l
CORRESPONDING Angles: 1
and 5 1 2 3 4 5 6 7 8 2
and 6 3
and 7 4
and 8
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6. ANGLES FORMED BY A TRANSVERSAL Standard 7k m l
ALTERNATE INTERIOR Angles: 3
and 6 1 2 3 4 5 6 7 8 4
and 5
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7. ANGLES FORMED BY A TRANSVERSAL Standard 7k m l 1 2 3 4 5 6 7 8 7
and 2 1
and 8
ALTERNATE EXTERIOR Angles:
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8. ANGLES FORMED BY A TRANSVERSAL Standard 7k m l 1 2 3 4 5 6 7 8 4
and 6 3
and 5
CONSECUTIVE INTERIOR Angles:
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9. ANGLES FORMED BY A TRANSVERSAL Standard 7k
CORRESPONDING Angles: m l 1 2 3 4 5 6 7 8 1
and 5 3
and 7 2
and 6 4
and 8
ALTERNATE INTERIOR Angles: 3
and 6 4
and 5
ALTERNATE EXTERIOR Angles: 1
and 8 7
and 2
CONSECUTIVE Interior Angles: 3
and 5 4
and 6
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10. If both lines m and l are PARALLEL the following holds true:
Standard 7
If both lines m and l are PARALLEL the following holds true: k m l
CORRESPONDING Angles are : 1 5 3 7 2 6 1 2 3 4 5 6 7 8 4 8
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11. If both lines m and l are PARALLEL the following holds true:
Standard 7
If both lines m and l are PARALLEL the following holds true: k m l 1 2 3 4 5 6 7 8 3 6 4 5
ALTERNATE INTERIOR Angles are :
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12. If both lines m and l are PARALLEL the following holds true:
Standard 7
If both lines m and l are PARALLEL the following holds true: k m l 7 2 1 8 1 2 3 4 6 5 8 7
ALTERNATE EXTERIOR Angles :
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13. If both lines m and l are PARALLEL the following holds true:
Standard 7
If both lines m and l are PARALLEL the following holds true: k m l 1 2 3 4 5 6 7 8 3 m 5 +
=180° 4 m 6 +
=180°
CONSECUTIVE INTERIOR Angles are supplementary:
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14. If both lines m and l are PARALLEL the following holds true:
Standard 7
If both lines m and l are PARALLEL the following holds true: k
CORRESPONDING Angles are : 1 5 m l 3 7 2 6 1 2 3 4 5 6 7 8 4 8
ALTERNATE INTERIOR Angles are : 3 6 4 5
ALTERNATE EXTERIOR Angles : 1 8 7 2
CONSECUTIVE Interior Angles are supplementary: 3 m 5 +
=180° 4 m 6 +
=180°
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15. Find all angles in the figure: Standard 71
60° 2 3 4 5 6 7
What is the measure for ? 1
60° = 180° 1 m
because they form a LINEAR PAIR 1 m
= 120°
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16. Find all angles in the figure: Standard 7
60° 1 2 3 4 6 7 5
What is the measure for ? 1
60° = 180° 1 m
because they form a LINEAR PAIR 1 m
= 120°
Now is vertical with 60° angle, so: 2 2 m
= 60°
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17. Find all angles in the figure: Standard 7
60° 1 2 3 4 6 7 5
What is the measure for ? 1
60° = 180° 1 m
because they form a LINEAR PAIR 1 m
= 120°
Now is vertical with 60° angle, so: 2 2 m
= 60°
and are also vertical: 1 3
3 = m 1 m
3 = m
120°
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18. Find all angles in the figure: Standard 7
60° 1 2 3 4 6 7 5
Now all the following angles are CORRESPONDING, and : 5 m
= 60° 1 4 2 6 3 7 4 m
= 120° 6 m
= 60° 7 m
= 120°
What is the measure for ? 1
and finally:
60° = 180° 1 m
because they form a LINEAR PAIR 1 m
= 120°
Now is vertical with 60° angle, so: 2 2 m
= 60°
and are also vertical: 1 3
3 = m 1 m
3 = m
120°
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19. Standard 7 Find the value for X: 7X + 30 15X - 18
Both angles are ALTERNATE EXTERIOR and the lines are parallel, so the angles are :
7X + 30 = 15X -18
7X = 15X - 48
-15X -15X
-8X= - 48
X = 6
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20. Standard 7 Find the value for X: 14X + 6 8X + 54
Both angles are ALTERNATE INTERIOR and the lines are parallel, so the angles are :
14X + 6 = 8X + 54
14X = 8X + 48
-8X -8X
6X = 48
X = 8
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21. Standard 7 Find the value for X: 9X + 58 16X + 9
Both angles are CORRESPONDING and the lines are parallel, so the angles are :
16X + 9 = 9X + 58
16X = 9X + 49
-9X -9X
7X = 49
X = 7
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22. Standard 7 Find the value for X:
Both angles are CONSECUTIVE INTERIOR ANGLES, so they are SUPPLEMENTARY:
3X + 17
17X + 23
(3X + 17) + (17X + 23) = 180
3X + 17X = 180
20X + 40 = 180
20X = 140
X = 7
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23. Find the value for X and Z: Standard 7
=12( ) -14 10 =
= 106°
Both angles are ALTERNATE EXTERIOR :
8X + 26 = 12X -14
8X = 12X - 40
Angles form a LINEAR PAIR:
-12X -12X
Z + 106° = 180°
-4X= - 40
Z = 74
X = 10
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24. Find the value for Y and Z in the figure below: Standard 7
These are complementary: Y
Y + 63° = 90°
93 – 3Z
Y = 27°
= 93 – 3( ) 10 =
= 63°
Both angles are ALTERNATE INTERIOR :
5Z + 13 = 93 – 3Z
5Z = -3Z + 80
+ 3Z + 3Z
8Z = 80
Z = 10
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25. Find the value for X and Y in the figure below: Standard 7
= 6( ) + 15 3 X
These are complementary: =
= 33°
X + 33° = 90°
75 – 14Y
X = 57°
Both angles are ALTERNATE INTERIOR :
6Y + 15 = 75 – 14Y
6Y = -14Y +60
+ 14Y + 14Y
20Y = 60
Y = 3
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26. ANGLE SUM THEOREM: 180° = 35° + 87° + 58° = 180° B 87° 35° 58° A C + +
Standards 4 and 5
ANGLE SUM THEOREM: B m
87°
35°
58° A m C m =
180° + +
35° + 87° + 58° = 180°
The sum of the interior angles of a triangle is always 180°
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27. Find all the unknown angles in the figure below: Standard 7
65°
1. Vertical Angles
115°
115°
2. Linear pair:
65°
65°
180°-103° = 77°
115°
115°
180°-65°= 115°
65°
103°
3. Corresponding Angles
77°
77°
38°
4. Vertical Angles
103°
142°
142°
5. Linear Pair:
38°
38°
142°
180°-65°= 115°
142°
38°
6. Interior Angle Sum in triangle is 180°:
180°-77°-65° = 38°
7. Vertical Angles
8. Corresponding Angles
9. Linear Pair
180°-38°= 142°
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28. Find all the unknown angles in the figure below: Standard 7
85°
1. Vertical Angles
95°
95°
2. Linear pair:
85°
85°
180°-110° = 70°
95°
95°
180°-85°= 95°
85°
110°
3. Corresponding Angles
70°
70°
25°
4. Vertical Angles
110°
155°
155°
5. Linear Pair:
25°
25°
155°
180°-85°= 95°
155°
25°
6. Interior Angle Sum in triangle is 180°:
180°-70°-85° = 25°
7. Vertical Angles
8. Corresponding Angles
9. Linear Pair
180°-25°= 155°
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29. Find the value for X, Y and Z in the figure below: Standard 7
Alternate Exterior Angles: Z
Z = 145°
2X + 5
145°
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30. Find the value for X, Y and Z in the figure below: Standard 7
Alternate Exterior Angles: Z
Z = 145°
Linear Pair and supplementary:
2X + 5
145° + (5Y + 5)° = 180°
Y = 180
145°
5Y = 30
Y = 6
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31. Find the value for X, Y and Z in the figure below: Standard 7
Alternate Exterior Angles: Z
Z = 145°
Linear Pair and supplementary:
2X + 5
145° + (5Y + 5)° = 180°
Y = 180
145°
5Y = 30
Corresponding angles:
Y = 6
2X + 5 = 145°
2X = 140
X = 70
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32. Find the value for R, S and T in the figure below: Standard 7
Alternate Exterior Angles: T
T = 140°
2R – 15
140°
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33. Find the value for R, S and T in the figure below: Standard 7
Alternate Exterior Angles: T
T = 140°
Linear Pair and supplementary:
2R – 15
140° + (4S – 20 )° = 180°
S = 180
140°
4S = 60
S = 15
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34. Find the value for R, S and T in the figure below: Standard 7
Alternate Exterior Angles: T
Z = 140°
Linear Pair and supplementary:
2R – 15
140° + (4S – 20 )° = 180°
S = 180
140°
4S = 60
Corresponding angles:
S = 15
2R – 15 = 140°
2R = 155
R = 77.5
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