Microsoft Word - Practice Test Branded.docx



Geometry Spring Break PacketFor multiple choice items, circle the correct response. For fill-in response items, write your answer in the box provided, placing one digit in each box and no spaces between digits.MA.912.G.1.31. In the figure below, what is the measure of ∠MKJ?A. 58? B. 82? C. 98? D. 122?MA.912.G.4.1What is the most accurate name for the triangle below?Right scaleneObtuse isoscelesRight isoscelesAcute scaleneMA.912.G.1.13. PR has an endpoint at (25, -5) and a midpoint of (18, -1). What is the value of the x-coordinate of the other endpoint?MA.912.G.1.14. TV has endpoints at (2, 10) and (18, -18). What is the approximate length of the segment?A. 29.00B. 32.25C. 47.92D. 49.07MA.912.G.4.2Point O is the circumcenter of the triangle ABC shown below.Which segment passes through point O for all lengths of sides of the triangle?angle bisector of angle ABCperpendicular bisector of side ABa line segment drawn from vertex C to bisect side ABa line segment drawn from vertex A to cut side BC at right anglesMA.912.G.4.7Rebecca is designing a backpack and needs to determine the length of the adjustable strap that connects the shoulder strap to the backpack. The height of the backpack is 19.5 inches, and the shoulder strap is 12 inches.Which is not a possible length for the connecting adjustable strap?7 in10 in15 in22 inMA.912.G.4.7Ruthann is buying a home, and the plot of land is triangular. She would like to have a long property line along the street. The given angle, ?M, is opposite the road side of the plot of land.The following are angle measures of ?M for four different properties that Ruthann may choose from.Plot A: 65? Plot B: 89? Plot C: 68? Plot D: 103?Which property has the longest property line on the street?Plot APlot BPlot CPlot DMA.912.G.4.4The figure below shows the length of side DC equal to 120 units and the length of side DB equal to 160 units.What is the length of segment AC?120 units160 units240 units320 unitsMA.912.G.4.4Triangle MNO and triangle PQR are similar. What is the length, in units, of segment NO?MA.912.G.4.5A.14 B.19 C.22 D.26Ben has a toy light saber, and he wants to construct one proportionally smaller than his. The light on his is 33 in, and the handle is 9 in.If the light on the smaller version is 11 in, how long should the handle be?3 in4 in4.5 in6 inMA.912.G.4.5In the triangle below, what is the approximate value of x?4 in4.5 in4.9 in5.1 inMA.912.G.5.4Look at the figure shown below.What is the length of Segment AB to the nearest tenth of a meter?MA.912.G.5.3Look at the figure.What is the length of side AD?6 cm8.5 cm10.4 cm12 cmMA.912.T.2.1Look at the figure.What is the distance, in meters, between point B and point C?A. 200 cos 35? B. 200 tan 35?200C.cos35?200D.sin35?MA.912.G.3.1Look at the chart.Name of quadrilateralXHas all interior angles equalSquareYesYesRectangleNoYesWhich title best represents X?Has all sides equalHas all angles equal to 180°Has adjacent sides unequal in lengthHas sum of all interior angles equal to 360°MA.912.G.3.216. When comparing a square and a rectangle, one major difference is:Squares must have four 90? angles. Rectangles do not have to have all 90? angles.Squares have two sets of equal sides. Rectangles have only one set of parallel sides.Squares have four equal sides. Rectangles have two pairs of equal opposite sides.Squares have diagonals that bisect each other. Rectangles have diagonals that are perpendicular.MA.912.G.3.3The coordinates of the three vertices of a square ABCD are A (-3, 5), B (1, 7), and C (3, 3). What are the coordinates of vertex D?A. (-4, 2)B. (-2, 1)C. (-1, 1)D. (-4, -2) MA.912.G.2.1Look at the figure below.What type of polygon is shown?Convex nonagonConcave nonagonConvex hendecagonConcave hendecagonMA.912.G.2.1Athena described the figure below as a convex, irregular octagon.Is she correct?Yes.No, it is a heptagon.No, it is concave.No, it is regular.MA.912.G.2.2Look at the figure.MA.912.G.2.4What is the measure of Angle F?21. The vertices of pentagon LMPQR are at L(4, -2), M(5, -2), P(8, -5), Q(6, -7), R(2, -4). The coordinates of the pentagon after two translations are L1(-5, -1), M1(-4, -1), P1(-1, -4), Q1(-3, -6), R1(-7, -3). How was LMPQR translated to create L1M1P1Q1R1?To the left by 9 units and 1 unit upTo the right by 9 units and 1 unit upTo the left by 1 unit and 9 units upTo the right by 1 unit and 9 units upMA.912.G.2.5/MA.912.G.2.722. The right triangular flag of a sports club was designed to have a base length of 4 ft and height of 6 ft. For a sports event, the club made a new flag by doubling the base and height of the flag. The area of the new flag is times larger than the original flag.MA.912.G.4.423. Gina has designed two triangular flower beds, as shown below.Which statement is true for the two flower beds?They have different areas.They have the same perimeter.The length of side BC is equal to 10 feet.The length of side PQ is equal to 10 feet.MA.912.G.4.424. Look at the figure.Angle A is congruent to angle BDE. If the area of triangle ABC is 240 cm2, the area of triangle BDE is _____cm2.MA.912.G.6.6/ MA.912.G.6.725. The equation of a circle is shown. (x -5)2 + (y + 2)2 = 64 The radius of the circle is ________ units.MA.912.G.6.5/MA.912.G.6.2/MA.912.G.6.426. A satellite sends signals from space to the regions that lie within the shaded portion of the Earth, as shown below.If the radius of Earth is approximately 6000 kilometers, the part of Earth that receives signals from the satellite has an area of square kilometers. Use 3.14 for π.MA.912.G.3.4/MA.912.G.8.527. For the quadrilateral ABCD, the diagonals bisect each other.The flowchart shown below is used to prove that quadrilateral ABCD is a parallelogram.In the flowchart, what is justification B?Alternate interior angles are congruent.Corresponding angles are congruent.Corresponding parts of congruent triangles are congruent.Reflexive property.MA.912.G.3.4/MA.912.G.8.528. A (4, 4), B (7, 0), C (11, 3), and D (8, 7) are four points on the coordinate grid. Miranda and Pete joined the points using straight lines to draw a quadrilateral ABCD.Miranda wrote the following statements to prove that “ABCD is a parallelogram that is not a rhombus.”(4 ? 0)4slope of AB ?? ?(4 ? 7)3 (7 ? 3)4slope of DC ?? ?slope of BC ?slope of AD ?(8 ? 11)3 (0 ? 3)3(7 ? 11) ? 4(4 ? 7)3(4 ? 8) ? 4Pete wrote the following statements to prove that “ABCD is a rhombus.”AB ? BC ? CD ? DA ??? 5(4 ? 7)2 ? (4 ? 0)225(7 ? 11)2 ? (0 ? 3)225?? 5(11? 8)2 ? (3 ? 7)225?? 5(8 ? 4)2 ? (7 ? 4)225?? 5Which statement is correct?Miranda is incorrect because she has used the incorrect formula to calculate the slope of the lines.Pete is correct because all the four sides of the quadrilateral ABCD are equal: therefore, it is a rhombus.Pete is incorrect because he has used the incorrect formula to find the distance between the points of the segments.Miranda is correct because the slope of AB is equal to DC and slope of BC is equal to AD: therefore, it is a rhombus.MA.912.G.5.1/MA.912.G.8.429. Look at the squares, ABCD, CEFG, and PQEB in the figure shown below.Which fact can be best used to prove that BC2 + CE2 = BE2?Area of PQEB is greater than the square of the area of ABCD.Area of PQEB is greater than the square of the area of CEFG.Area of PQEB is equal to the sum of the areas of CEFG and ABCD.Area of CEFG is equal to the sum of the areas of PQEB and ABCD.MA.912.G.5.1/ MA.912.G.8.430. The points L1 and L2 are located on the circumference of a circle having a diameter of 54 feet.If C is the center of the circle, what is the distance from point L1 to point L2 along a straight line?18 feet27 feet32.24 feet38.18 feet ................
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