2D Geometry Questions and Answers

Hamilton Circuits Paths Which of the following is a Hamiltonian Circuit beginning at vertex A for the given graph ABCDA ACBDA ADBCA all of the above Question 3 25 points D A C B

Question 1 25 points Hamilton Circuits Paths Which of the below descriptions shows a possible HAMILTON CIRCUIT ADFECGBA ADFECBG ADFABGDECBA A D F E C B G

Rewrite cot 8 sec 0 in terms of sine and cosine cot 0 sec 8 Simplify your answer

Cuestion 3 Write the equation of each circle below in circle form Iden the center and radius Practice at least 1 of these a x 10x y 2y 20 0 b x 8x y 2y 8 0 c x 12x y 20y 8 0

Quiz 2 Target 78 Name 78 Calculate measurements of arcs sectors and circles using degrees and radians NM PT AT 1 Three friends bought a giant cookie cake and divided it into equal parts so that each of them got 1 piece The Cookie cake has a radius of 13cm Find the area of each person s piece Be sure to show your work 360 120 3 Per

9 F 10 8 B 2 15 3 G 16 11 12 14 17 21 13 18 20 4 6 19 C 5 D E Given G is the center of the circle AD is a diameter mAB 78 mFE 105 mED 27 mCD 42 m 1 m 2 m27 m 8 m 9 m 10 m 11 P D m 19 m 20 m 21 All Things Algebra 2015

54 32 D 4 1 112 Marcel is designing a circular necklace that will consist of 4 sections each with a different color of plastic Determine how he needs to cut the plastic by finding the measures of the angles m21 m22

or angles formed by two intersecting chords 1 The intersecting chords form vertical angles If mZDEB 105 then mZAEC 105 2 Find the sum of the angle measures mZDEB mZAEC 210 0 3 Find the sum of the arc measures mBD MAC Correct 0 mZDEB 105 mZAEC 105 mAC 130 mBD 80 B E C

Explore the properties of angles formed by two intersecting chords 1 The intersecting chords form vertical angles If m2DEB 105 then mZAEC 105 MIDA C 2 Find the sum of the angle measures mZDEB m2AEC D mZDEB 105 m ZAEC 105 B A C

Words to Know Write the letter of the definition next to the matching word as you work through the lesson You may use the glossary to help you A arc chord inscribed angle intercepted arc tangent to a circle Central Angles anangle whose vertex is on a circle and whose sides are chords B an arc in the interior of an angle that has its endpoints on the angle C a part of a circle between two given endpoints D a line line segment or ray that intersects a circle at exactly one point and contains no points inside the circle E a segment with both endpoints on a circle

C O A UU Which segment is both a chord and a diameter segment

Directions Determine whether a permutation or combination can be used Then solve 19 Three cards from a standard deck of 52 cards are chosen at random What is the probability that all three cards chosen are hearts 21 If the 3 digit security code on the back of a credit card using the digits 0 9 has no repeating digits what is the probability that the code does not contain any numbers less than 52 20 Marissa has a 50 20 10 5 and 1 bill in her wallet She takes the bills out and randomly line them up What is the probability that the first bill is greater than 5 22 There are twelve seniors and eight juniors on the prom committee If two students are chosen at random to decide on decorations what is the probability that one is a senior and one is a junior

In the triangle below with right angle LE suppose that mLF 2x 37 and mL G 5x 4 Find the degree measure of each angle in the triangle G E 5x 4 2x 37 F m ZE m LF m LG 0 0 0

5 The center of a circle is 1 15 and one point on the circle s circumference is 4 15 What is the length of the diameter 2 points a 5 b 10 c 25 d O O O 100 A OB O C

2 In the diagram above AC and AD are tangent to circle B at points C and D respectively If CB 4 and AE 8 determine the length of AC in simplest radical form 2 points a 8 2 b 4 2 c 4 3 d 8 3 O A O B O C A E B

6 In the circle below LA 4x 4 mzB 7x mzC 5x 41 and m D 5y What is the value of y 2 points a 5 b 10 C 15 d 20 O A O O B C D B D

1 What is the value of x 2 points a 7 2 111232 b 1 c 5 d 10 O A OB O C 3x 6 10

3 1 1 point What is the measure of ZY 136 b X 68 Z Type your answer 1 point What is the measure of FGH 101 H

What is the measure of the arc RU R S 88 30 V 35 Type your answer U x 1 point What is the measure of x 27 T 18

2 1 point Demetrius wants to paint the cylinder shape cardboard cut out he made in art class shown below 3 inches 8 inches If he just wants to paint the lateral area of the cylinder approximately how many square inches of paint will he need Type your answer 1 point Coach Fox is getting a new swimming pool It has a diameter of 18 feet and had a depth of 4 5 feet shown below 1204

YZ is tangent to OX What is the value of x Y 2x 4 38 Z

5 Let ABCD be a square of area 1 Let X Y Z W be random points on AB BC CD DA taken uniformly and independently of each other Let S be the area of the quadrangle XYZW D C We A Z a Find the expression of S in terms of X Y Z W Y B

3 Write an equation for the graphs in graphing form y a Equation 1 2 3 3 6 b NU d T 7 7 7

6 Determine the vertex and axis of symmetry o the graphed quadratic ertex 4y Axis of Symmetry

3 Solve for x 5 20 IM2 20 22 Kuta Software LL C Test Similarity Find the missing length indicated 1 K X 16 10 25 4x 2 x 8 10 5 X 8 16 5 CX 8 12x 48 12 12 x 4 1 25 12 tho 10 5X 40 16 27 30 X 4875 145 91 40 Kate Spia 120 AT Ale 50F5X XE S rights reserved 3 SASCH 2 4 6 Name Guisom Ahmadal 4x y V 4 20 34 15 15 GX 35X 8e 35 21 9x 2 20 9x 2 12 25x 296 25 25 X 8 225 904x41 255 36X19 15 Period 20 21x3c9x 2 21 54 12 321 54 32 X 6 216 36x 36 36 35 140 20x 20 20

one marble from the jar After you put that marble back in the jar you randomly draw a second marble Use this information to answer the questions Round your answers to the nearest tenth of a percent Do NOT include the percent symbol Question 7 2 pts What is the probability that you draw a blue marble first and a red marble second Question 8 2 pts

answers to the nearest tenth of a percent Do NOT include the percent symbol Question 9 2 pts What is the probability that the spinner stops on purple first and red second Question 10 2 pts

There are 4 green 10 red and 6 yellow marbles in a bag You choose a marble without looking put it aside and choose another marble without looking Find the probability that you choose a red marble followed by a yellow marble Express all probabilities as simplified fractions

A bag holds 4 white marbles and 2 blue marbles You choose a marble without looking put it aside and choose another marble without looking Find the probability that you choose a white marble followed by a blue marble Express all probabilities as simplified fractions

A die has the numbers 3 5 6 8 10 and 12 on its faces You roll the die twice What is the probability that you roll an odd number on both rolls Enter your answer as a simplified fraction

Find the measure each shaded Central Angle A B 9 120

c46 N 8 M Find the scale factor of the figures Then list all pairs of congruent angles AABC ALMN k B ZAZ ZB Write the ratios of the corresponding side lengths in a statement of proportionality

Given the circle below with secant YXW and tangent VW find the length of YX Round to the nearest tenth if necessary Y X 15 7 W

2 Find the solutions to the quadratic below using completing the square x 10x 4 0

Proving the First Case of the Inscribed Angle Theorem Given AB is the diameter of a circle and is one side of the angle that intercepts AC Prove mzABC is half the measure of AC 180 2x B You can draw line segment CD by the unique Since the triangle isl x D Triangle BCD is isosceles since BD and CD are both circle and all radii of a given circle are congruent EFO x A postulate of the its base angles are congruent

4 ERROR ANALYSIS Describe and correct the error in solving x 8x 10 by completing the square X x 8x 10 x 8x 16 10 x 4 10 x 4 10 x 4 V 10

2 Express the quadratic in vertex fo its vertex y x 12x 46

ROUND 2 3 Determine the vertex of the quadr y x 6x 5

5 Which of the graphs below could be the graph of the quadratic y x 6x 3 Circle your answer Ay 4 2 Ay 4 3 2 5 XY 4 IA 6 3 2 Ay 4 2 2 2 1 x X YA Ex 4 6

Examine angles whose Prove theorems involving angles Apply involving inscribed angles G lie on a circle Apply theorems involving angles formed by a and tangent

side of the angle that intercepts AC Prove The measure of ZABC is half the measure of AC ZADC and ZBDC are supplementary since they form a The measure of ZADC 180 180 2x which simplifies to or twice the measure of angle ABC Since ZADC is a central that of AC FLL LLL LLLL 180 2x D B thlebblebi bla bla kbEWERBLETT Since the measure of ZABC is x the measure of AC is 2x pair The sum of their measures is 180 xo its measure 2x is equal to that C

The Angle Formed by a Tangent and Chord Theorem Angle formed by a tangent and chord theorem If a tangent to a circle and a chord intersect at a point c on the circle then the measure of each angle they form is one half the measure of its intercepted arc MZ mAB This also means that ZEAB is going to be equal to the measure of its intercepted arc BCA E A B LL F

The trinket store is open for 14 hours per day They sell an average of 5 trinkets per hour The back storeroom currently has 560 trinkets in it 1 Write an equation that estimates the number of trinkets T that will be in the storeroom after H hours 2 How many days will it take to run out of trinkets

Find the volume of each object 1 the rectangular prism part of the milk container 2 the cylinder part of the measuring cup 6 3 cm 7 cm 10 cm 7 cm 7 cm

The Third Corollary to the Inscribed Angle Theorem Third corollary to the inscribed angle theorem The opposite angles of a quadrilateral inscribed in a circle are supplementary A B up to C Remember that the measures of supplementary anglesadd O D This theorem means the angles B and D are going to be and angles A and be supplementary are going to Remember thata circle has 360 and that the measure of angle is half the measure of the intercepted

Using the Third Corollary to the Inscribed Angle Theorem The measure of 20 is x 2 and the measure of 2S is 9x 7 What are the measures of angles Q and S Since angles Q and S are opposite in a they are supplementary x 2 9x 7 180 10x5 180 Our 185 10 10 x 18 5 Plug this value of x into the expressions m20 18 5 2 180 20 5 0 0 of a quadrilateral inscribed T S m s 9 18 5 7 You could have also used the fact that opposite angles are supplementary to find the measure of angle S Q Not drawn to scale R

Second corollary to the inscribed angle theorem An angle inscribed in a semicircle is a right angle Since DF is a diameter the angle is inscribed in half the circle or a Coroll ry to the Inscribed Angle Theorem This means that the inscribed angle is a angle A semicircle measures 180 so the measure of the angle would be half of that or E C LL

Central Angles The measure of a central angle is equal to the measure of its intercepted arc C 42 A B

An inscribed angle is an angle whose sides are chords is on a circle and whose An intercepted arc is the arc that lies in the interior of an and has endpoints on the angle C B angle

Find the area of polygon JKLMNO K 104 886 9 7 bl 2 10 9 8 7 6 5 4 3 2 11 123 2 456 M 1 2 3 4 5 6 7 8 9 10 N