Secondary Math 2 END-OF-YEAR REVIEW Complete the following packet. While in class, you may use this paper packet, BUT DO NOT WRITE IN IT!!! When working at home, please use the online version. All answers can be found online. The work (just answers will not be accepted!) for this packet will be due the day of the SAGE test and is worth 210 points AND WILL NOT BE ACCEPTED LATE! UNIT 1 REVIEW Name___________________________________ Period___________ Part I(Multiple Choice): Choose the best answer(s) for each of the following questions. _______1. Simplify the radical expression β24. (a) _______2. (b) Natural Rational (b) (e) Natural Rational (b) (e) 123β2 (b) (2π₯)4β5 (b) β105 (b) 1 3 β(π₯π¦)2 (b) Simplify the expression (a) ______10. 4π₯ 2 π¦ 3 ββ2 β32π₯π¦βπ¦ (c) β8π₯π¦βπ¦ (d) 8π₯π¦βπ¦ Whole Irrational (c) Integer Whole Irrational (c) Integer 122β3 (c) (2β3) 3 10π₯ 4 (c) 32π₯ 4 β50 (c) 5 β100 Rewrite the following exponential expression in radical form: (a) _______9. 6β2 Rewrite the following exponential expression in radical form: (a) _______8. (d) Rewrite the following radical expression in exponential form: (a) _______7. 2β12 Rewrite the following radical expression in exponential form: (a) _______6. (c) To which of the following set(s) does β11 belong? (Choose all that apply.) (a) (d) _______5. 2β4 To which of the following set(s) does β5 belong? (Choose all that apply.) (a) (d) _______4. (b) Simplify the radical expression β2β16π₯ 2 π¦ 3 . (a) _______3. 2β6 6π 8 (b) Simplify the expression (a) 8π¦ 5 (b) β 3 β(π₯π¦) (β12) (d) 3 8β27 4 β(2π₯)5 (d) (2π₯)5β4 105β2 (d) 5 β20 (π₯π¦)β3β2 1 (c) β3βπ₯π¦ (d) (c) 5π 8 (d) 6π 15 (c) 15π¦ 5 (d) 15π¦ 6 β(π₯π¦)3 (2π 5 )3 8π 15 3π¦ 3 β 5π¦ 2 8π¦ 6 Part II (Work-Out Problems): Show all work if you expect to receive any partial credit for incorrect answers. For Problems 11 and 12: State the set(s) to which the number belongs: Μ Μ Μ Μ 11. 17 12. β3. 66 For Problems 13 and 14: Rewrite the expression in exponential form. 13. 3 ( βπ₯ ) 4 14. 1 5 β(2π)2 For Problems 15 and 16: Rewrite the expression in radical form. 15. π 4β3 16. (2π)6β5 For Problems 17 β 20: Simplify the expression. 17. β8π₯ 3 β80π5 π 3 19. (5π6 )β1β3 18. 20. 10π₯ 2 π¦ 3 π§ 4 2π₯ 5 π¦ π§ 5 UNIT 2 REVIEW Part 1 (Multiple Choice): Choose the best answer(s) for each of the following questions. ________1. Simplify the expression (5π₯ 2 + 2π₯ 4) ) β ( 5π₯ 3 + 2π₯ 4 ) (a) β5π₯ 3 + 5π₯ 2 (b) π₯ 3 + 4π₯ 4 (c) 4π₯ 4 (d) β5π₯ 3 + 4π₯ 4 + 5π₯ 2 ________2. Simplify the expression (5π£ 2 + 4π£) + ( 3π£ β 3) (π) 5π£ 2 + 7π£ β 3 (b) 9v + 3π£ 2 - 1 (c) 9π£ 2 + 3v - 3 (d) 5π£ 2 + 1π£ β 3 _______ 3. Find the GCF of 18 , 30 (a) 6 (b) 2 (c) 4 (d) 7 (c) m (d) 13nm ________4. Find the GCF of 13π2 π , 39nπ2 (a) 13 (b) 3nm ________5. Factor the common factor out of the expression : 12π£ 2 + 18v (a) 2v ( 6v + 9 ) (b) 12v (v + 18) (c) 6v ( 2v + 3) (d) 6v ( 3v + 2) ________6. Factor the common factor out of the expression : β6π₯ 2 β 18 (a) -6 ( x + 3) (b) β6 π₯ (π₯ β 12 ) (c) β6π₯ ( x + 3 ) β4 (π₯ 2 β 2π₯) (d) ________7. Find the product of β5 ( π + 4 ) (a) - 5s + 1 (b) 5 s - 20 (c) - 5s + 4 (d) - 5s - 20 ________8. Factor 10π₯ 2 π¦ 2 π§ 5 β 40π₯π¦π§ 2 + 20π₯π¦π§ (a) 10π₯π¦π§ ( π₯π¦π§ 4 β 4π§ + 2 ) (b) 10π₯π¦π§ ( π§ 4 β 4π§ + 10 ) (c) π₯π¦π§ ( 10π§ 4 β 40π₯π¦ + 20 ) (d) 2π₯π¦π§ ( 5π₯π¦π§ 4 β 20π§ + 10 ) ________9. Find the product of ( x β 5 ) ( x + 5) (a) π₯ 2 + 10π₯ β 10 (b) π₯ 2 + 10π₯ β 20 (c) π₯ 2 β 10π₯ β 25 (d) π₯ 2 β 25 ________10. Find the product of ( 8π β 2 ) ( 6π + 3) (a) 48π2 + 12p + 1 (b) 14π2 + 12π + 6 (c) 24π2 β π + 1 (d) 48π2 + 12p β 6 ________11. Factor completely π2 + 2π β 80 (a) ( m + 16 )( m β 5 ) (b) ( m + 5 ) ( m β 16 ) (c) ( π + 10 ) ( π β 8 ) (d) ( π β 10 ) ( π + 8 ) (c) (8 π + 5 ) ( 2π β 5 ) (d) ( 8π β 5)2 ________12. Factor completely 25π2 β 60π + 36 (a) ( 5m + 6 )( 5m β 6 ) (b) (5π β 6)2 Part II (Work - Out Problems): Show all work, if you expect to receive any partial credit for incorrect answers. For problems 11-12: Factor 13. 4π£ β 16 14. 15π£ β 25 For problems 13-14: Find the product. 15. ( m + 7 ) ( 3m β 4 ) 16. ( 7x β 2 ) ( 6x β 3 ) For problems 15 β 16: Factor completely. 17. π2 + 8π + 15 18. π₯ 2 β 4π₯ β 32 For problems 17-18: Factor completely 19. 6π2 + 7π β 49 20. 3π2 β 13π β 10 For problems 19-20: Factor by Grouping 21. 12π₯ 3 β 21π₯ 2 + 28π₯ β 49 22. 28π₯ 3 + 16π₯ 2 β 21π₯ β 12 For problems 23-25: Simplify 23. ( 4 β 2π ) β ( β7 β π ) 24. (β5 + 8π ) + (5π) β (3π) 25. β3 (β6π) (7π) 26. (β2 β 8π)( β7 + 7π) Unit 3 REVIEW In this unit six functions have been studied and reviewed: Line y = mx + b, Quadratic (parabola) π¦ = π₯ 2 , square root y = 3 βπ₯ , Absolute Value y = |π₯| , Cubic Equation y = π₯ 3 , Cube Root y = βπ₯ . Each function can be translated using vertical shift, horizontal shift, stretch, and reflection about the x β axis. For Problems 1-3: Answer the following Questions about each graph. a) What type of function is this graph? (b) What is the equation of this function? (c) What is the domain? (d) What is the range? (e) Where (x-values in the interval notation) is the function increasing? (f) Where is the function decreasing? (g) Where is the function positive? (h) Where is the function negative? (i) Are there any minimums? If so, where (x,y)? (j) Are there any maximums? If so where (x,y)? 1. 2. 3. a) _____________________ a) _____________________ a) _____________________ b) _____________________ b) _____________________ b) _____________________ c) _____________________ c) _____________________ c) _____________________ d) _____________________ d) _____________________ d) _____________________ e) _____________________ e) _____________________ e) _____________________ f) _____________________ f) _____________________ f) _____________________ g) _____________________ g) _____________________ g) _____________________ h) _____________________ h) _____________________ h) _____________________ i) _____________________ i) _____________________ i) _____________________ j) _____________________ j) _____________________ j) _____________________ For Problems 4-12: Graph the following functions. Plot points as necessary. 4. π¦ = 3|π₯ β 1| + 4 7. π¦ = βπ₯ + 3 10. π¦ = 2π₯ 5. π¦ = 3 x + 3 11. π¦ = 3π₯+1 9. π¦ = 2βπ₯ β 2 +2 8. π¦ = β(π₯ β 2)3 + 2 6. π¦ = (π₯ + 2)2 β 3 12. π¦ = 2(.5)π₯ 2 13. Is the given function exponential? If so, does it represent a growth ro a decay model? (a) π¦ = 2(3)π₯+4 (b) π¦ = 6π₯ 2 + 1 (c) π¦ = 4βπ₯ β 3 14. What is the average rate of change of the given function over the given interval? 1 (a) π¦ = 2 π₯ + 3, [0, 3] (b) π¦ = π₯ 2 β 2, [β1, 3] (c) π¦ = 2βπ₯ + 4, [β3, 5] Unit 5 REVIEW ©w I2o0N1h5R XK\uftGab HSFoKfetcwsaurEeC hLHLkCD.P h WAHlKll xrgiHgqhUtKsw nrcetsgeAryvqeZdm. Solve each equation. 1) x 2 - 6 x = 0 2) m 2 + 4m - 25 = - 4 3) 3 x 2 + 2 x - 8 = - 7 4) 9r 2 - 3r - 2 = 3 5) 10 x 2 + 2 x - 21 = - 5 Sketch the graph of each function. 2 2 6) y = - 2 ( x + 1 ) + 2 7) y = - ( x + 4 ) - 1 y y 1 3 2 -7 -6 -5 -4 -3 -2 x -1 1 -1 -9 -8 -7 -6 -5 -4 -3 -2 1 x -1 -2 -1 -2 -3 -3 -4 -4 -5 -5 -6 -6 -7 -7 8) y = x 2 + 6 x + 8 9) y = x 2 + 8 x + 18 y y 4 7 3.5 6 3 2.5 5 2 1.5 4 1 3 0.5 -5 -4 -3 -2 1 x -1 2 - 0.5 -1 1 - 1.5 -2 -6 -5 -4 -3 -2 -1 1 x Solve each equation. 10) 4 x 2 + 15 x = - 21 - 4 x 11) 3k 2 + 23k = 8 Worksheet by Kuta Software LLC -1- ©E K2[0N1g5W eKhuDtsaa aSlosfKtFwbacrseD \LkLMCI.Q \ lAQl]lo VrCisglhrt]sP srWewsFeLrgvLeXdt.a K VMTaZdBee Zwci_txhq BI^nFfMiEndietHeS tAdl[gleWbVrDaz Y2X. 12) 5 p 2 + 3 = 3 p - 9 13) - 3m 2 + 18m + 2 = - 12m 2 + 12m 14) 7n 2 - 16n - 24 = 5n 2 - 3n 15) 9 x 2 - 6 = 6 x Find the intercepts and the vertex and sketch a graph of the equation. 2 2 16) y = - x + 3 x + 4 17) y = 2 x + x - 6 vertex: _____________ vertex: _____________ x-intercepts: _____________ x-intercepts: _____________ y-intercepts: _____________ y-intercepts: _____________ y -8 -6 -4 y 8 8 6 6 4 4 2 2 -2 2 4 6 8 x -8 -6 -4 -2 2 -2 -2 -4 -4 -6 -6 -8 -8 4 6 8 x 2 18) y = - x + 2 x + 3 vertex: _____________ x-intercepts: _____________ y-intercepts: _____________ y 8 6 4 2 -8 -6 -4 -2 2 4 6 8 x -2 -4 -6 -8 Worksheet by Kuta Software LLC -2- ©B K2h0^1l5V kK^uetKav aSDoKfPtAwqa`rFeA ELqL`CB.S F [AnlTln IrViWgFhBtusj drheesVehrdvKeVdB.F n SMQaydZew ^wriKt`hP UI[nwfQiZnYictker bArlUgse]bHrWax i2x. Unit 6 Review Match the given equation to the picture of the parabola 1. _________ π¦ = β1 2 B. A. ( π₯ + 1)( π₯ β 4) (-1, 0) (4, 0) 2. _________ y = 2(π₯ + 4 )2 β 2 (5, 0) 3. _________ π¦ = β ( π₯ β 1)2 + 6 4 . _________ π¦ = (π₯ β 5 ) ( π₯ β 6 ) (6, 0) D. C. (1, 6) (-6, 6) (3, 2) (-4, -2) Solve the following inequalities. Match the given equation with its solution in interval notation. 5. _______ π₯ 2 β 6π₯ < 0 A. [β β , β2.712 ] βͺ [ 2.2122 6. _______ π₯ 2 + 3π₯ β€ 10 B. ( 0 ,6 ) 7. _______ 2π₯ 2 + 5π₯ β 12 β₯ 0 C. (ββ, 0) βͺ (6, β) D. [β 5 , 2 ] 8. ______ 2π₯ 2 > 12π₯ ,β ] For each of the following problems (9 β 10), write a quadratic equation, and solve. (Hint: Draw the picture) 9. The length of a rectangular room is 1 foot more than twice its width. The area is 78 square feet. Find the dimensions of the room. 10. A rectangular enclosure at a zoo is 35 feet long, by 18 feet wide. The zoo wants to double the area of the enclosure by adding the same distance x to the length and the width. Write and solve an equation to find the value of x. What are the new dimensions of the enclosure? 11. A snowboarder in the terrain park at Powder Mountain hits a jump at 39.6 feet per second. The equation of the boarders height is modeled by π (π‘) = β16π‘ 2 + 39.6π‘. How high did the boarder jump? 12. While playing rec basketball this weekend, Frank shoots an air-ball. The height h in feet of the ball is given by β(π‘) = β16π‘ 2 + 32π‘ + 8. What is the maximum height of the ball? What is the degree of the polynomial that has the following zeros? 13. 3, 8, 9 14. 1, 3(multiplicity 2), 6 State the number of complex roots and then list the possible rational roots for the following function. 15. π(π₯) = 2π₯ 4 β π₯ 3 β 7π₯ 2 + 4π₯ β 4 Solve each equation for the variable specified. 1 16. π΄ = 2 πβ , for (b) 17. E = mπ 2 , for (c) Unit 7 REVIEW 1. Which point lies on the x-axis? a. (0, 1) b. (2, 5) c. (-3, 0) d. (-1, 1) 2. Which of the following models suggests a plane? a. bowling ball b. garage door c. beam of a flashlight d. fence post 3. What is the coordinate of the midpoint of AD? a. -5 b. -2 c. -1 d. 5 4. Find the distance between J(8, 3) and K (3, 15). a. 5 b. 12 c. 13 d. 18 For Questions 5-6, refer to the figure at the right. 5. Use a protractor to find the measure of β TAC. a. 125 b. 55 c. 150 d. 35 6. Use a protractor to classify β CAQ . a. acute b. right c. obtuse d. complementary 7. Find the slope of the line passing through the points (0, 5) and (-1. 2). 1 1 a. β3 b. β 3 c. 3 d. 3 8. What is the slope of a line that is parallel to the line π¦ = β4π₯ + 1 ? 1 1 a. 1 b. β 4 c. 4 d. β4 9. In which figure are β 1 and β 2 alternate interior angles? a. b. c. 10. Find the value of x so that a. 5 b. 12 c. 60 d. 125 d. a ΗΗ b 11. The coordinates of the endpoints of a segment are (5, 8) and (-7, 16) Find the midpoint of the segment. 12. A triangle has vertices at A (1, -3), B (15, -1) and C (7,5). Which two sides of the triangle have the same length? 13. Name the angle in four ways, and classify the angle as acute, right or obtuse. 14. If the measure of β B is 55, find the measure of an angle that is complementary to β B and find the measure of an angle that is supplementary to β B . (be sure to specify which answer is for complementary/supplementary) 15. Graph the equation π¦ = 3 π₯ 2 β3 16. Find the slope of the line shown below. 17. Using the picture below determine the measure of β 3, β 6 and β 8; if the measure of β 2 = 40 18. Using the picture from problem 17: Name two angles that are Vertical angles: Name two angles that are Consecutive Interior angles: Name two angles that are Corresponding angles: 19.Find the value of x so that a ΗΗ b 20. In the figure below, M is the midpoint of LN. Find the value of x, and find the length of LM 3x + 16 L 7x M N Unit 8 Review ______ 1. In βπ΄π΅πΆ β A is 78°, β B is 41°, find β C. a. 51 b. 63 c. 32 d. 61 ________ 2. βDEF , πβ π· = 48°, πππ πβ πΉ = 24°. What type of triangle is triangle DEF? a. acute b. right c. obtuse d. isosceles ________ 3. If two sides of an isosceles triangle measure 7 and 7. Which of the following could be the measure of the base angles? a. 45, 35 b. 25, 26 c. 102, 45, d. 65, 65 ________ 4. The triangles are congruent. State which postulate applies. a. Side-Angle-Side (SAS) b. Angle-Side-Angle (ASA) c. Angle-Angle-Side (AAS) d. Side-Side-Side (SSS) _________5. Which postulate can be used to prove the triangles congruent? a. ASA b. SSS c. Not Possible d. SAS _________6. In triangle ABC, mβ A = 60, and mβ B = 40. Which side of the triangle ABC is the longest? a. AC b. AB c. BC d. BC β AB _________7. Which of the following lengths are the sides of a right triangle? a. 3, 4, 5 b. 6, 8, 10 d. 9, 12, 15 d. All of the above _________8. Find the length of the hypotenuse of a right triangle with legs of 9 cm and 12 cm. a. 17.3 cm b. 15 cm c. 7.9 cm d. 21 cm _________9. The side opposite the right angle of a right triangle is called the leg. a. True b. False ________10. In the diagram DE is parallel to AC, BD = 4, DA = 6 and EC = 8. Find BC to the nearest tenth. a. 4.3 b. 5.3 c. 8.3 d.13.3 11. Solve for βxβ. 12. Classify the triangle by its sides and angles. 13. State if the triangles are congruent. If they are state how you know. 14. State if the triangles are congruent. If they are state how you know. 15. State if the triangles in each pair are similar. If so , state how you know they are similar and complete the similarity statement. 16. State if the triangles are similar. Find the missing side of the triangle for questions 17-18. Round your answer to the nearest tenth if necessary. 17. 18. Story Problems (round answer to the nearest tenth) 19. A ladder leans against a building. The foot of the Ladder is 6 feet from the building. The ladder reaches a height of 14 feet on the building. Find the length of the ladder to the nearest foot. (Hint: Draw the pic) 20. A young boy is flying a kite. A strong wind came along and blew the kite onto the top edge of a shed 12 ft. high. The boy wanted to retrieve his kite. He leaned a 15 ft. ladder against the shed. How far away from the base of the shed was the ladder? (Hint: Draw the pic) Unit 9 REVIEW ©X k2V0x1]5_ VK]uutGao TSPobfTt_w]aVrJeI PLrLsCI.E Z oAdlBlx brbinghhetOsG crdeusSelrAvbeXdV. Find the value of each trigonometric ratio. 1) sin X 2) sin A 41 X 9 A Z 40 Y 34 30 B 3) cos Z C 16 4) sin Z 41 X Z 29 Z 40 20 Y 40 41 9 C) 41 40 9 41 D) 9 A) X 9 21 Y B) 20 21 29 C) 20 21 20 21 D) 29 A) B) Find the measure of the indicated angle to the nearest degree. 5) 6) 28 ? ? 16 8 7 7) 8) 3 4 ? 6 A) 34° C) 56° 7 B) 42° D) 66° ? A) 17° C) 67° B) 23° D) 25° Worksheet by Kuta Software LLC -1- ©S m2X0c1E5p IK\uAteaK bSloVfKtZwladrVeU sLALPCr.T ^ HA[lvly Mr`ikgOhRt_sY MrfetsRewr]vQeSdd.f p EMmaydEeL OwbiqtBhP KIJnlfAinnbictbeG XGPeCobmiePtnrfyo. Find the missing side. Round to the nearest tenth. 9) 10) x 59° 63° 14 x 13 11) 12) 11 x x 27° 39° A) 9.4 C) 4.7 20 B) 8.9 D) 13.6 A) 17.8 C) 17.3 B) 22.4 D) 16.4 13) The tallest building in the world is the Burj Kalifa. If you are on level ground exactly 5280 feet (one mile) from the base of the tower, the angle of elevation to the top of the skyscraper would be 27.7°. How tall is the tower? 14) In rhombus ABCD with sides 3 inches long, diagonals AC and BD meet at point E. If the length of EB is 1.17 inches, what is the measure of angle DAB? 15) A communications tower is built on top of a building with the following specifications: from a point 150 meters from the base of the building, the angle of elevation to the top of the building is 16° and the angle of elevation to the top of the tower is 24°. Find the height of the tower. 16) A fire departmentβs longest ladder is 110 feet long, and the safety regulation states that they can use it at a maximum angle of elevation of 65.3°. W hat is the maximum heightn for the rescue ladder? 17) A 9 meter flagpole casts a 12 meter shadow. Find the angle of elevation of the sun. 18) A swimming pool is 20 meters long and 10 meters wide. The bottom of the pool is slanted so that the water depth is 1.5 meters at the shallow end and 5 meters at the deep end. Find the angle of depression of the bottom of the pool. Worksheet by Kuta Software LLC -2- ©u x2V0a1W5j iK]u\tUaJ \S[o\fStgwAaprMeT CLMLiCK.\ N tADlXlB \rEiygXhitqse srVeVsceUrCvCewdS.P ^ VMRa^d_eY ]wXirt[hD GIAncfMiyn[iZt\es `GWeZoRmkejtDrHyA. Unit-10 REVIEW Part 1: 1. Data was taken for two hospitals for a one month period of time. Assume all patients had an equal chance of going to either hospital and, on average, the patients that attended either hospital had about the same health histories. Fill in the blanks on the 2-way table below: Died Survived total Hospital A 63 Hospital B Total 79 784 2100 2. Build a Venn Diagram for the data in the completed table above. Label your ovals. Include the relevant numbers in your diagram. 3. For the data provided in problem 1 (above), calculate the following probabilities: a. P(Died) = _____ b. P(patient went to Hospital A) = ____ c. P(did not survive and was at hospital B) = ____ d. P(Survived given that the patient was at Hospital A) = ____ e. P(went to hospital A and survived OR went to hospital B and died) = ____ f. Which hospital would you rather go to? Justify your answer with at least two of your own probability statements (with numbers) that βprovesβ your opinion is correct. 4. Build a tree diagram for the data above. Choose the first branches so that you can use your table to answer the following probability statement: P(Died given that you went to Hospital B) = _____ Part 2: The following probability statements are given: P(green eyes) = 40/110 P(blue and male) = 15/110 P(male) = 40/110 P(female given that the person doesnβt have blue or green eyes) = 12/25 5. (6 points) Fill in the following table using the numbers from the probability statements above: Blue eyes Green eyes Other colored eyes total Male Female total 6. Build a tree diagram for the data above. Make your first branches so that you can answer the following question: P(Green eyes / male) = ____ 7. Build a Venn diagram 8. Calculate the following probabilities: a. P(female and blue eyes) = ____ b. P(other colored eyes given that the person is a male) = ____ c. P(male OR has green eyes) = _____ 9. 5 different books will be displayed in the library window. How many different arrangements are there? 10. In a talent show, the top 3 performers of 12 will advance to the next round. In how many ways can this be done? Unit 11 REVIEW ©j v2o0i1A5d KK\u`tVav ySoo_fKt\wNaWrden NLYLPCH.g u LAElYlP FrniLgLhwt_sh YrUeKsqeHrYvhesdu. Find the measure of the arc or angle indicated. 1) 2) X C ? ? W D 76 ° E A) 73° C) 55° V 82 ° 110 ° A) 182° C) 126° B) 57° D) 77° B) 186° D) 153° Find the measure of the arc or central angle indicated. Assume that lines which appear to be diameters are actual diameters. 3) m RPT 4) m IJH H Q G 56° R P I 76° J 59° F 59° U S E T Find the length of each arc (remember to change the degrees to radians). 5) 6) 240° 270° 6 in 11 m Find the area of each sector. 7) 8) 60° 13 in 19 in 90° Worksheet by Kuta Software LLC -1- ©Q c2m0h1e5i SKmuMtEaz ySIojfLt]wNakrne[ XLsLTCN.R z HAvlplm vroiIg_hctdsM qriewsceRruvPeJd].` \ bMdahdIeY SwtiStdhg UI\nofbi`nwiBtmeq WGbe[oNm_eotvrJym. Find the volume of each figure. Round your answers to the nearest tenth, if necessary. 9) 12 ft 10) 10 ft 11 ft 7 cm 11 ft 6 cm 10 ft 11) 12) 9m 5.7 yd 4m Find the volume of each figure. Round your answers to the nearest hundredth, if necessary. 13) 7 cm 3 cm 3 cm Find the volume. 14) A silot is formed by a 15ft tall cylinder with a radius of 2.1 ft, and topped by a 3ft tall cone. W hat is the volume of the rocket? Find the measure of the indicated angle to the nearest degree. 15) 47 ? 28 Worksheet by Kuta Software LLC -2- ©u T2F0e1V5F oKkuZtOae CSOotfptiwuatrKeq VLHL^Cn.V Q \AMljla ]rGingoh`tKsU XrVeysyeUrjvReXdD.u _ lMtaSdDeq XwtiXtKhF oIonafjivneintseo YG_eBoUmUeNtXrWyc. Find the missing side. Round to the nearest tenth. 16) 20° x 10 Find the value of each trigonometric ratio. 17) tan A C 41 40 B 9 A Find the measure of the indicated angle to the nearest degree. 18) 26 19) Jordon has finally made it to Paris for her summer vacation, she is so excited to visit the Eifeel Tower. The day she visit this iconic giant, she looks up at the Eifeel Tower at an angle of elevation of 84.6° and is standing 100 ft from its base. How tall is the Eifeel Tower? 25 ? Find the probability of each event. 20) A gambler places a bet on a horse race. To win, he must pick the top three finishers in order. Twelve horses of equal ability are entered in the race. Assuming the horses finish in a random order, what is the probability that the gambler will win his bet? 1 » 1.111% 90 1 C) » 0.076% 1320 A) 21) Kristin and Dan each purchase one raffle ticket. If a total of fourteen raffle tickets are sold and two winners will be selected, what is the probability that both Kristin and Dan win? 1 » 0.139% 720 1 C) » 4.762% 21 A) 1 » 2.222% 45 1 D) » 0.909% 110 B) 1 » 0.833% 120 1 D) » 1.099% 91 B) Worksheet by Kuta Software LLC -3- ©I ]2S0M1f5A ]K^u^tCaE ESgoHfXtcwEaorEeo zLnLRCV.Q z eAMlbld OrWiSgqhUtJsa arge]szearqveefdT.t p vMYaddEeQ HwhiZtYhO wItnQf^iAnfiMt_er rGUeRoFmfeRtIrfyw.
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