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Geometry Unit 3B Review 3B Test on Monday Feb 6 Special Right Triangles 2n n n√2 n√3 n n BC is side OPPOSITE the reference angle CA is the side ADJACENT to the reference angle B sinθ°= Opp hypot cosθ°= Adj hypot tanθ°= opp adj opp C hypot adj θ° A 3B Review - Team Test 1. Find geometric mean between “a” and “b” (any 2 numbers). Give an exact answer. b x a = x2 = ab x x = √ab Simplify as much as you can, but OK to have the radical - is “An exact answer.” 2. Determine the values for x, y and z. Give exact answers in simplified radical form. Two similar triangles - so corresponding sides are proportional x y 7 z 16 y 16 = 7 y y2 = 7(16) y = 4√7 2. Determine the values for x, y and z. Give exact answers in simplified radical form. x y 7 z 16 Then use pythagorean theorem x2 = 72 + (4√7)2 = 49 +112 = 161 x = √161 2. Determine the values for x, y and z. Give exact answers in simplified radical form. x y 7 z 16 Then use pythagorean theorem z2 = 162 + (4√7)2 = 256 +112 = 368 z = √16(23) z = 4√23 2. 115 feet tall lighthouse, plus 45ft land 18° 160 ft total height above sea level d Sin 18° = 160 ft d d = 160 ft 0.3090 d -- 518ft 3. Find x. A. cos 16° = sin x When cosine of an angle is equal to the sine of another angle it is because the two angles are complementary angles - add up to 90° So 16° + x = 90° x = 74° 3. Find x. B. cos (2x + 15)° = sin (x + 9) When cosine of an angle is equal to the sine of another angle it is because the two angles are complementary angles - add up to 90° So 2x + 15 + x + 9 = 90° 3x + 24 = 90° 3x = 66° x = 22° 4. Find x and y. Exact answers only must be a special right triangle question. 30-60-90 triangle 14 cm = y√3 30° y x = 2y Here y = 14cm √3 But we shouldn’t leave the answer with a radical sign in the denominator 4. Find x and y. Exact answers only must be a special right triangle question. 30-60-90 triangle 14 cm = y√3 30° y x = 2y Here y = 14cm √3 √3 √3 y = 14√3 3 4. Find x and y. Exact answers only must be a special right triangle question. then 14 cm = y√3 30° y x = 2y x = 2(14√3 ) 3 x = 28√3 3 Check your answer is simplified. 5. Find x and y. Exact answers only must be a special right triangle question. x = 8√3 cm x = base√3 30° 8cm y = 2 base length y = 2(8cm) = 16cm 6. Find x. 45-45-90 triangle 18cm = x√2 x x = 18 √2 √2 √2 45° 18 cm x x = 9√2 cm rationalize the denominator 7. Find x. 45-45-90 triangle 25√2cm = x√2 cm x = 25√2 cm √2 45° 25√2 cm x x = 25 cm 8. Solve for the side x. Round all final answers to 2 decimal places. Use calculator. x 28cm 50° The side x is adjacent to the reference angle, 50° Need to use cosine Cos50° = adjacent = x Hypotenuse 28cm 0.6428 (28cm) = x Look up cosine of 50 degrees in the cosine table you have - then use calculator to find answer round to 2 decimal places 8. Solve for the side x. Round all final answers to 2 decimal places. Use calculator. x 28cm 50° The side x is adjacent to the reference angle, 50° Need to use cosine Cos50° = adjacent = x Hypotenuse 28cm 0.6428 (28cm) = x = 17.9984 x approx. 18.00 cm 9. Find the missing angle. Round to nearest tenths. Use calculator. θ° 44cm The 32cm side opposite to the reference angle, θ° Need to use sine sinθ° = opposite = 32 cm 32cm Hypotenuse 44cm Sinθ° = (0.72) θ° = sin-1(0.72) approx. 46.7° 9. Find the missing angle. Round to nearest tenths. Use calculator. θ° Check your answer makes sense using the sine table you have 44cm - you may punch in the numbers on the calculator and make a mistake doing that The 32cm side opposite to the reference angle, θ° Need to use sine sinθ° = opposite = 32 cm 32cm Hypotenuse 44cm Sinθ° = (0.72) θ° = sin-1(0.72) approx. 46.7° 10. Which trigonometric ratios are equivalent to ⅗. Select 2 that apply. 6 P Q θ° 8 10 R sinθ° = opposite hypotenuse cosθ° = adjacent Hypotenuse tanθ° =opposite = Adjacent NOT FINISHED... =8 10 =6 10 8 6 10. Which trigonometric ratios are equivalent to ⅗. Select 2 that apply. 6 Q P 8 10 a° R sina° = opposite hypotenuse cosa° = adjacent Hypotenuse tanθ° =opposite = Adjacent =6 10 =8 10 6 8 11. Find x. Pythagorean theorem c2 = a 2 + b 2 5 4 52 = 4 2 + x 2 25 - 16 = x2 x x = √9 = 3 12. 25ft ladder, 65° angle with ground. How far from the base of the building is the foot of the ladder. Round to tenths place. cos 65° = x 25ft x = 25ft(cos 65°) 25ft x -- 25ft(0.4226) x -- 10.6 ft 65° x 13. A 4.3ft guy wire is attached to a tree, 4ft from the ground. What is the angle that is formed between the wire and the ground, to the nearest degree? sin θ° = 4ft 4.3ft θ°= sin-1( 0.9302) 4ft is the side opposite the reference angle, and 4.3ft is the hypotenuse - so need to use sine relationship 4.3ft θ° - 68° θ° 4ft 14. Flying a kite. String forms an angle of elevation of 27° and distance to directly under the kite is 35 ft. How long is the kite string to the nearest foot. We know the side cos 27° = 35 ft xft x = 35ft 0.8910 x - 39 ft x 27° 35ft length that is adjacent to the reference angle, and we know the angle itself, so we can use cosine of the angle and the side length given to calculate the length of the string (hypotenuse of the right triangle.)
