MathDB

2018I Sample

Part of MOAA Individual Speed General Rounds

Problems(1)

2018 MOAA Individual Round Sample - Math Open At Andover

Source:

10/14/2023
p1. Will is distributing his money to three friends. Since he likes some friends more than others, the amount of money he gives each is in the ratio of 5:3:25 : 3 : 2. If the person who received neither the least nor greatest amount of money was given 4242 dollars, how many dollars did Will distribute in all?
p2. Fan, Zhu, and Ming are driving around a circular track. Fan drives 2424 times as fast as Ming and Zhu drives 99 times as fast as Ming. All three drivers start at the same point on the track and keep driving until Fan and Zhu pass Ming at the same time. During this interval, how many laps have Fan and Zhu driven together?
p3. Mr. DoBa is playing a game with Gunga the Gorilla. They both agree to think of a positive integer from 11 to 120120, inclusive. Let the sum of their numbers be nn. Let the remainder of the operation n24\frac{n^2}{4} be rr. If rr is 00 or 11, Mr. DoBa wins. Otherwise, Gunga wins. Let the probability that Mr. DoBa wins a given round of this game be pp. What is 120p120p?
p4. Let S be the set {1,2,3,4,5,6,7,8,9,10}\{1, 2, 3, 4, 5, 6, 7, 8, 9, 10\}. How many subsets of SS are there such that if aa is the number of even numbers in the subset and bb is the number of odd numbers in the subset, then aa and bb are either both odd or both even? By definition, subsets of SS are unordered and only contain distinct elements that belong to SS.
p5. Phillips Academy has five clusters, WQNWQN, WQSWQS, PKNPKN, FLGFLG and ABBABB. The Blue Key heads are going to visit all five clusters in some order, except WQSWQS must be visited before WQNWQN. How many total ways can they visit the five clusters?
p6. An astronaut is in a spaceship which is a cube of side length 66. He can go outside but has to be within a distance of 33 from the spaceship, as that is the length of the rope that tethers him to the ship. Out of all the possible points he can reach, the surface area of the outer surface can be expressed as m+nπm+n\pi, where mm and nn are relatively prime positive integers. What is m+nm + n?
p7. Let ABCDABCD be a square and EE be a point in its interior such that CDECDE is an equilateral triangle. The circumcircle of CDECDE intersects sides ADAD and BCBC at DD, FF and CC, GG, respectively. If AB=30AB = 30, the area of AFGBAFGB can be expressed as abca-b\sqrt{c}, where aa, bb, and cc are positive integers and c is not divisible by the square of any prime. Find a+b+ca + b + c.
p8. Suppose that x,y,zx, y, z satisfy the equations x+y+z=3x + y + z = 3 x2+y2+z2=3x^2 + y^2 + z^2 = 3 x3+y3+z3=3x^3 + y^3 + z^3 = 3 Let the sum of all possible values of xx be NN. What is 12000N12000N?
p9. In circle OO inscribe triangle ABC\vartriangle ABC so that AB=13AB = 13, BC=14BC = 14, and CA=15CA = 15. Let DD be the midpoint of arc BCBC, and let ADAD intersect BCBC at EE. Determine the value of DEDADE \cdot DA.
p10. How many ways are there to color the vertices of a regular octagon in 33 colors such that no two adjacent vertices have the same color?
PS. You should use hide for answers. Collected [url=https://artofproblemsolving.com/community/c5h2760506p24143309]here.
MOAAalgebrageometrycombinatoricsnumber theory