Geometry FSA Mathematics Practice Test Questions

Geometry FSA Mathematics Practice Test Questions The purpose of these practice test materials is to orient teachers and students to the types of questions on paper-based FSA tests. By using these materials, students will become familiar with the types of items and response formats they may see on a paper-based test. The practice questions and answers are not intended to demonstrate the length of the actual test, nor should student responses be used as an indicator of student performance on the actual test. The practice test is not intended to guide classroom instruction. Directions for Answering the Mathematics Practice Test Questions If you don t know how to work a problem, ask your teacher to explain it to you. Your teacher has the answers to the practice test questions. You may need formulas and conversions to help you solve some of the problems. You may refer to the Reference Sheets on pages 5 and 6 as often as you like. Use the space in your Mathematics Practice Test Questions booklet to do your work.

Page 7 Session 1

Session 1 FSA Mathematics Practice Test Questions Use the space in this booklet to do your work. For multiple-choice items, fill in one bubble for the correct answer. For editing task choice items, matching items, and multiselect items, fill in the bubbles for all of the correct answers. For items with response grids, refer to the Directions for Completing the Response Grids on pages 3 and 4. If you change your answer, be sure to erase completely. Calculators are NOT permitted for Session 1 of this practice test. 1. Match each building with the geometric shapes that can be used to model it. Cone Cylinder Pyramid Rectangular Prism A B C D E F G H I J K L 14978 Page 8

FSA Mathematics Practice Test Questions Session 1 2. In the diagram shown, chords AB and CD intersect at E. The measure of AC is 120, the measure of DB is (2x), and the measure of AEC is (4x). A D 120 (4x) E (2x) B C What is the degree measure of AED? ------- ````` aaaaaaa 0000000 1111111 2222222 3333333 4444444 5555555 6666666 7777777 8888888 9999999 14928 Page 9

Session 1 FSA Mathematics Practice Test Questions 3. Triangle SRT is shown. 10 y 9 8 7 6 5 S 4 3 T 2 R 1 1 0 1 2 3 4 5 6 7 8 9 10 1 x Choose the correct equation or word to fill in each blank in the paragraph. For each blank, fill in the circle before the equation or word that is correct. The vertices of ΔSRT are S (1, 4), R (2, 2) and T (1, 3). A reflection across the line [ A x = 4 B x = 6 C y = x + 5 D y = x + 6] and then across the line [ A y = 6 B y = 8 C y = x + 10 D y = x + 12] is the same as a translation of 4 units to the right and 4 units up because the lines are [ A congruent B parallel C perpendicular D similar]. 15028 Page 10

FSA Mathematics Practice Test Questions Session 1 4. Johnny wants to find the equation of a circle with center (3, 4) and a radius of 7. He uses the argument shown. Choose the correct word or phrase to fill in each blank in the argument. For each blank, fill in the circle before the word or phrase that is correct. Johnny s Argument Let (x, y) be any point on the circle. Then, the horizontal distance from (x, y) to the center is. A x 3 B x + 3 C x 4 D x + 4 The vertical distance from (x, y) to the center is. A y 3 B y + 3 C y 4 D y + 4 The total distance from (x, y) to the center is the radius of the circle, 7. The can now be used to create an equation that shows the relationship between the horizontal, vertical, and total distance of (x, y) to the center of the circle. A perimeter formula B Pythagorean Theorem C quadratic formula 14936 Page 11

Session 1 FSA Mathematics Practice Test Questions 5. Regular pentagon EFGHI with center K is shown. H I K E G F Select all the transformations that carry pentagon EFGHI onto itself. A a reflection across line EK, a 180 counterclockwise rotation about point K, and a reflection across a vertical line through point K B a 90 counterclockwise rotation about point E, a reflection across line FG, and a vertical translation C a reflection across line FI, a reflection across line GH, and a 180 clockwise rotation about point K D a reflection across a vertical line through point K, a 180 clockwise rotation about point K, and a reflection across line EK E a 180 clockwise rotation about point E, a reflection across a vertical line through point E, and a reflection across a horizontal line through point E 14942 Page 12

FSA Mathematics Practice Test Questions Session 1 6. Alejandro cut a circle with circumference C and radius r into 8 congruent sectors and used them to make the figure shown. Height Alejandro noticed that the figure was very close to the shape of a parallelogram. Select all the statements that apply to the figure. 14937 A The height of the parallelogram is approximately equal to the circle s diameter. B The area of the parallelogram is approximately C The length of the parallelogram is approximately equal to the circle s circumference. D The radius of the circle is approximately equal to the height of the parallelogram. E The area of the parallelogram is approximately 45 8 r 2. 360 1 2 Cr. Page 13

Session 1 FSA Mathematics Practice Test Questions 7. Evelyn is designing a pattern for a quilt using polygon EQFRGSHP shown. y 10 8 6 E 4 P Q 2 F 10 8 6 4 2 0 2 4 6 8 10 2 H S R 4 x 6 G 8 10 Evelyn transforms EQFRGSHP so that the image of E is at (2, 0) and the image of R is at (6, 7). Which transformation could Evelyn have used to show EQFRGSHP and its image are congruent? A EQFRGSHP was reflected over the line y = x +2. B EQFRGSHP was translated right 7 units and down 4 units. C EQFRGSHP was rotated 135 degrees clockwise about the point Q. D EQFRGSHP was rotated 90 degrees clockwise about the point ( 3, 1). 14943 Page 14

FSA Mathematics Practice Test Questions Session 1 8. Katherine uses Δ ABC, where DE AC to prove that a line parallel to one side of a triangle divides the other two sides proportionally. A part of her proof is shown. B D E A C Statements Reasons 1. DE AC 1. Given 2. BDE BAC and BED BCA 2. 3. Δ BAC Δ BDE 3. 4. BA BD BC BE 4. 5. BA BD DA BC BE EC 6. 7. 8. 5. Segment addition postulate 6. 7. 8. Subtraction property of equality Which statement completes step 8 of the proof? A BA BD = DA and BC BE = EC B AD = BD and CE = BE 15020 C D BA BC DA BD DA EC EC BE Page 15

Session 1 FSA Mathematics Practice Test Questions 9. A rectangle and a horizontal line segment are shown. What is the resulting object when the rectangle is rotated around the horizontal line segment? A B C D 14940 Page 16

FSA Mathematics Practice Test Questions Session 1 10. Triangle RTV is shown on the graph. y V 6 5 4 3 2 1 6 5 4 3 2 1 0 1 1 2 3 4 5 6 2 3 4 5 6 T R x Triangle R T V is formed using the transformation (0.2x, 0.2y) centered at (0, 0). Select the three equations that show the correct relationship between the two triangles based on the transformation. A RV 5 R V B C D E R V 26 RV 0.2 26 0.2 10 RT 10R T RT 0.2R T 0.2 T V T V T V T V 34 0.2 34 F 15018 Page 17

Session 1 FSA Mathematics Practice Test Questions This is the end of Session 1. Page 18

Page 19 Session 2

Session 2 FSA Mathematics Practice Test Questions Use the space in this booklet to do your work. For multiple-choice items, fill in one bubble for the correct answer. For editing task choice items, matching items, and multiselect items, fill in the bubbles for all of the correct answers. For items with response grids, refer to the Directions for Completing the Response Grids on pages 3 and 4. If you change your answer, be sure to erase completely. Scientific calculators may be used for Session 2 of this practice test. 2 11. Points A, B, and C are collinear and AB:AC =. Point A is located at 5 ( 3, 6), point B is located at (n, q), and point C is located at ( 3, 4). What are the values of n and q? n = q = ------- ````` aaaaaaa 0000000 1111111 2222222 3333333 4444444 5555555 6666666 7777777 8888888 9999999 ------- ````` aaaaaaa 0000000 1111111 2222222 3333333 4444444 5555555 6666666 7777777 8888888 9999999 15016 Page 20

FSA Mathematics Practice Test Questions Session 2 12. Quadrilateral MATH is shown. y 5 4 3 M 2 1 A 5 4 3 2 1 0 1 1 2 3 4 5 2 T H 3 4 5 x Quadrilateral MATH is dilated by a scale factor of 2.5 centered at (1, 1) to create quadrilateral M A T H. Select all the statements that are true about the dilation. A MA M A B AT will overlap AT. C MA will overlap MA. D The slope of HT is equal to the slope of HT. E The area of M A T H is equal to 2.5 times the area of MATH. 15023 Page 21

Session 2 FSA Mathematics Practice Test Questions 13. One diagonal of square EFGH is shown on the coordinate grid. 8 y 6 4 G 2 8 6 4 E 2 0 2 4 6 8 x 2 4 6 8 Choose the correct option to fill in each blank below. For each blank, fill in the circle before the option that is correct. The location of point F could be [ A ( 3, 4) B ( 1, 6) C (1, 8)] because diagonals of a square are congruent and [ A have the same slope B bisect each other C are perpendicular]. 14975 Page 22

FSA Mathematics Practice Test Questions Session 2 14. Polygon ABCDE is shown on the coordinate grid. y A 5 4 3 2 1 B 5 4 3 2 1 0 1 2 3 4 5 1 C 2 E 3 4 5 D x What is the perimeter, to the nearest hundredth of a unit, of polygon ABCDE? ------- ````` aaaaaaa 0000000 1111111 2222222 3333333 4444444 5555555 6666666 7777777 8888888 9999999 14977 Page 23

Session 2 FSA Mathematics Practice Test Questions 15. Ruben carries out a construction using Δ ABC. A sequence of diagrams shows a part of his construction. 1 2 3 4 5 Page 24

FSA Mathematics Practice Test Questions Session 2 What will be the result of Ruben s construction? A Ruben constructs a segment perpendicular to AC. B Ruben constructs the bisector of AC. C Ruben constructs an angle congruent to B. D Ruben constructs the bisector of B. 15015 Page 25

Session 2 FSA Mathematics Practice Test Questions 16. As phosphate is mined, it moves along a conveyor belt, falling off of the end of the belt into the shape of a right circular cone, as shown. 15.3 feet 48.6 feet A shorter conveyor belt also has phosphate falling off of the end into the shape of a right circular cone. The height of the second pile of phosphate is 3.6 feet shorter than the height of the first. The volume of both piles is the same. To the nearest tenth of a foot, what is the diameter of the second pile of phosphate? ------- ````` aaaaaaa 0000000 1111111 2222222 3333333 4444444 5555555 6666666 7777777 8888888 9999999 14939 Page 26

FSA Mathematics Practice Test Questions Session 2 17. Gabriel wrote a partial narrative proof to prove FD BD. A Given: AD bisects EAC FDA BDA E C Prove: FD BD D F B There are three blanks in the proof below. Choose the correct option to fill in each blank. For each blank, fill in the circle before the option that is correct. It is given that AD bisects EAC, and FDA BDA. Since AD bisects EAC, then DAE DAC from the definition of angle bisector. AD AD by the reflexive property. Δ [ A DAE B DAC C DEF D CDF E DAF F DAB] is congruent to Δ [ A DAE B DAC C DEF D CDF E DAF F DAB] because of [ A SSS B SAS C AAS D ASA]. Therefore, FD are congruent. BD because corresponding parts of congruent triangles 14986 Page 27

Session 2 FSA Mathematics Practice Test Questions 18. The population of Florida in 2010 was 18,801,310 and the land area was 53,625 square miles. The population increased 5.8% by 2014. A. To the nearest whole number, what is the population density, in people per square mile, for Florida in 2014? ------- ````` aaaaaaa 0000000 1111111 2222222 3333333 4444444 5555555 6666666 7777777 8888888 9999999 B. To the nearest whole number, how much did the population density, in people per square mile, increase from 2010 to 2014? ------- ````` aaaaaaa 0000000 1111111 2222222 3333333 4444444 5555555 6666666 7777777 8888888 9999999 14979 Page 28

FSA Mathematics Practice Test Questions Session 2 19. The Leaning Tower of Pisa is 56.84 meters (m) long. y height not to scale In the 1990s, engineers restored the building so that angle y changed from 5.5 to 3.99. To the nearest hundredth of a meter, how much did the restoration change the height of the Leaning Tower of Pisa? ------- ````` aaaaaaa 0000000 1111111 2222222 3333333 4444444 5555555 6666666 7777777 8888888 9999999 14988 Page 29

Session 2 FSA Mathematics Practice Test Questions This is the end of Session 2. Page 30

2 BAFS 2 0 1 4 Broward Assessment of Florida Standards Released Items Geometry

Released Items Page 1 2014 Geometry Broward Assessment of Florida Standards #2 Released Items Geometry MAFS.912.G-CO.2.6 In the graph below, ΔABC is transformed to obtain ΔXYZ. To show that the triangles are congruent, ΔABC could be transformed by which movement(s) to fit exactly on ΔXYZ? A. a rotation of 180 clockwise about the origin followed by a dilation of 1.2 with the center of dilation at the origin B. a rotation of 90 clockwise about the origin followed by translations down 1 unit and left 10 units C. a rotation of 270 clockwise about the origin followed by translations left 1 unit and up 10 units D. a reflection over the x-axis followed by a reflection over the y-axis Released Items

Geometry MAFS.912.G-CO.3.11 Page 2 2014 Geometry Broward Assessment of Florida Standards #2 Released Items Released Items MAFS.912.G-CO.1.2 Point K ( 3,4) is reflected over the y-axis and then translated 7 units down to produce K. Which rule could have been used to produce K from K? A. K(x, y) K (x, y 7) B. K(x, y) K ( x, y 7) C. K(x, y) K (x, y 7) D. K(x, y) K ( x 7, y 7) Anne is writing a proof about the figure shown on the coordinate plane below. She wants to show that quadrilateral ABCD is a parallelogram. Which of these is a correct, complete plan for Anne s proof? A. Show that AB and DC have equal slopes. B. Show that AB and DC have the same length. y A C. Show that the midpoints of DB and AC are the same point. D B D. Show that DB and AC have slopes that are negative reciprocals of each other. C Released Items x

Released Items MAFS.912.G-CO.3.10 MAFS.912.G-CO.4.12 Page 3 2014 Geometry Broward Assessment of Florida Standards #2 Released Items Geometry Triangle JKL is an isosceles triangle, where J is the vertex angle, m J = 50º, and m L = (8x +13)º. What is the value of x? A. 3.4 B. 4.6 C. 6.5 D. 7.3 James wants to construct a regular hexagon inscribed in a circle with center O and diameter PQ. Which of these would be the next step of construction? A. Place the compass at O and draw an arc of length OP across the circle. B. Place the compass at P and draw an arc of length OP across the circle. C. Place the compass at Q and draw an arc of length QP across the circle. D. Place the compass at P and draw an arc of length PQ across the circle. Released Items

Geometry MAFS.912.G-SRT.3.8 Page 4 2014 Geometry Broward Assessment of Florida Standards #2 Released Items Released Items MAFS.912.G-GPE.2.5 On a coordinate plane, the line 3x 4y = 8 contains AB, which is one side of rectangle ABCD. What is the slope of the line that contains BC? A. B. C. 4 3 3 4 3 4 D. 4 3 An elementary school is having a door decorating contest. Mr. Xolo s students want to use decorative tape to put an X on their door. The X will be so big that it touches each corner of the door. The door is 84 inches tall by 35 inches wide. What is the amount of decorative tape, in inches, that the students will need to make the X? A. 91 inches B. 119 inches C. 182 inches D. 238 inches 84 inches Mr. Xolo's Classroom Door Released Items 35 inches

Released Items MAFS.912.G-MG.1.3 Page 5 2014 Geometry Broward Assessment of Florida Standards #2 Released Items Geometry Katie is using graph paper to sketch a design for a flat wooden bench that will have a rectangular seat. The front and side views that Katie sketched are shown below. If Katie uses a scale on the graph paper in which each box represents a 6-inch by 6-inch square, what are the dimensions of the seat of the bench Katie is designing? A. 2 feet long by 2.5 feet deep B. 5 feet long by 2 feet deep C. 5.5 feet long by 2.5 feet deep D. 10 feet long by 5 feet deep Released Items

Geometry MAFS.912.G-GPE.2.4 If the quadrilateral is a parallelogram then what are the values for x and y? 3x + 5 110º Page 6 A. x = 8, y = 48º B. x = 4, y = 48º C. x = 2, y = 28º D. x = 4.5, y = 28º MAFS.912.G-SRT.2.5 x +13 (2y +14)º In the figure below, what is the perimeter of ΔEFG? A. 39 units B. 55 units C. 66 units D. 82 units 2014 Geometry Broward Assessment of Florida Standards #2 Released Items Released Items Released Items

Released Items Page 7 2014 Geometry Broward Assessment of Florida Standards #2 Released Items Geometry MAFS.912.G-SRT.1.2 Triangles FGH and F G H shown below, are similar. Which series of transformations best takes ΔFGH to Δ F G H? A. reflection over the y-axis, dilation by a factor of 0.75, and rotation about point F by 90 counterclockwise B. reflection over the y-axis, dilation by a factor of 0.5, and rotation about point F by 45 counterclockwise C. translation 16 units to the right, dilation by a factor of 0.75, and rotation about point F by 90 counterclockwise D. translation 16 units to the right, dilation by a factor of 0.5, and rotation about point F by 45 counterclockwise Released Items

Geometry MAFS.912.G-SRT.1.3 Page 8 2014 Geometry Broward Assessment of Florida Standards #2 Released Items Released Items Jamelia is trying to prove that for the figure below, DE! BC. She is given the information that DB AD = EC AE and lists the first five statements of her proof. What are the correct remaining statements in Jamelia's proof? A. Statements C. 6. ΔADE ΔABC 7. ACB ABC 8. DE! BC Statements B. D. 6. ΔADE ΔABC 7. ADE ABC 8. DE! BC 1. 2. 3. 4. 5. DB AD = EC AE Statements AD AD + DB AD = AE AE + EC AE AD + DB AE + EC = AD AE AB = AD + DB AC = AE + EC AB AD = AC AE 6. A A Statements 7. ΔADE ΔABC 8. ACB ABC 9. DE! BC 6. A A Statements 7. ΔADE ΔABC 8. ADE ABC Released Items 9. DE! BC