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WARM UP:
1. What is the length of the hypotenuse of triangle RST?
2. Cassie’s computer monitor is in the shape of a rectangle. The screen on the monitor is 11.5 in. high and 18.5 in. wide. What is the length of the diagonal? Round to the nearest tenth of an inch.
3. A triangle has side lengths 24, 32, and 42. Is it a right triangle? Explain.
4. A triangle has side lengths 9, 10, and 12. Is it acute, obtuse, or right? Explain.
5. Can three segments with lengths 4 cm, 6 cm, and 11 cm be assessed to form an acute triangle, a right triangle, or an obtuse triangle? Explain.
I C A N U S E T H E P R O P E RT I E S O F 4 5 4 5 9 0 A N D 3 0 6 0 9 0 T R I A N G L E S .
8.2 - SPECIAL RIGHT TRIANGLES
CERTAIN RIGHT TRIANGLES HAVE PROPERTIES THAT ALLOW YOU TO USE SHORTCUTS TO DETERMINE
SIDE LENGTHS WITHOUT USING THE PYTHAGOREAN THEOREM.
45 45 90 Triangle Theorem
In a 45 45 90 triangle, both legs are congruent and the length of the hypotenuse is times the length of
a leg.
PROBLEM: FINDING THE LENGTH OF THE HYPOTENUSE
• What is the value of each variable?
PROBLEM: FINDING THE LENGTH OF THE HYPOTENUSE
• What is the length of the hypotenuse of a 45 45 90 triangle with leg length 5?
PROBLEM: FINDING THE LENGTH OF THE HYPOTENUSE
• What is the value of each variable?
PROBLEM: FINDING THE LENGTH OF A LEG
• What is the value of x?
A. 3B. 3C. 6D. 6
PROBLEM: FINDING THE LENGTH OF A LEG
• The length of the hypotenuse of a 45 45 90 triangle is 10. What is the length of one leg?
PROBLEM: FINDING THE LENGTH OF A LEG
• What is the value of x?
A. 5B. 10C. 5D. 10
PROBLEM: FINDING DISTANCE
• A high school softball diamond is a square. The distance from base to base is 60 ft. To the nearest foot, how far does a catcher throw the ball from home plate to second base?
PROBLEM: FINDING DISTANCE
• You plan to build a path along one diagonal of a 100 ft.-by-100 ft. square garden. To the nearest foot, how long will the path be?
PROBLEM: FINDING DISTANCE
• A courtyard is shaped like a square with 250-ft-long sides. What is the distance from one corner of the courtyard to the opposite corner? Round to the nearest tenth.
ANOTHER TYPE OF SPECIAL RIGHT TRIANGLE IS A 30 60 90 TRIANGLE.
30 60 90 Triangle Theorem
In a 30 60 90 triangle, the length of the hypotenuse is twice the length of the shorter leg. The length of the longer leg is times the length of the shorter leg.
PROBLEM: USING THE LENGTH OF ONE SIDE
• What is the value of “d” in simplest radical form?
PROBLEM: USING THE LENGTH OF ONE SIDE
• What is the value of “f” in simplest radical form?
PROBLEM: USING THE LENGTH OF ONE SIDE
• What is the value of x?
PROBLEM: APPLYING THE 30 60 90 TRIANGLE THEOREM
• An artisan makes pendants in the shape of equilateral triangles. The height of each pendant is 18 mm. What is the length “s” of each side of a pendant to the nearest tenth of a millimeter?
PROBLEM: APPLYING THE 30-60-90 TRIANGLE THEOREM
• Suppose the sides of a pendant are 18 mm long. What is the height of the pendant to the nearest tenth of a millimeter?
PROBLEM: APPLYING THE 30-60-90 TRIANGLE THEOREM
• What is the height of an equilateral triangle with sides that are 12 cm long? Round to the nearest tenth.
AFTER: LESSON CHECK
• What is the value of x? If your answer is not an integer, express it in simplest radical form.
HOMEWORK:PAGE 503, #8 – 20 EVEN, 21,22-26 EVEN,29
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