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MMATHS Mathathon Rounds

Part of MMATHS problems

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(2)
2014
2

2014 MMATHS Mathathon Rounds 1-4 Math Majors of America Tournament for HS

Round 1
p1. A circle is inscribed inside a square such that the cube of the radius of the circle is numerically equal to the perimeter of the square. What is the area of the circle?
p2. If the coefficient of zkykz^ky^k is 252252 in the expression (z+y)2k(z + y)^{2k}, find kk.
p3. Let f(x)=4x42x3x23x2x4x3+x2x1f(x) = \frac{4x^4-2x^3-x^2-3x-2}{x^4-x^3+x^2-x-1} be a function defined on the real numbers where the denominator is not zero. The graph of ff has a horizontal asymptote. Compute the sum of the x-coordinates of the points where the graph of ff intersects this horizontal asymptote. If the graph of f does not intersect the asymptote, write 00.
Round 2
p4. How many 55-digit numbers have strictly increasing digits? For example, 2378923789 has strictly increasing digits, but 2388923889 and 2386923869 do not.
p5. Let y=11+19+15+19+15+...y =\frac{1}{1 +\frac{1}{9 +\frac{1}{5 +\frac{1}{9 +\frac{1}{5 +...}}}}} If yy can be represented as ab+cd\frac{a\sqrt{b} + c}{d} , where bb is not divisible by any squares, and the greatest common divisor of aa and dd is 11, find the sum a+b+c+da + b + c + d.
p6. “Counting” is defined as listing positive integers, each one greater than the previous, up to (and including) an integer nn. In terms of nn, write the number of ways to count to nn.
Round 3
p7. Suppose pp, qq, 2p2+q22p^2 + q^2, and p2+q2p^2 + q^2 are all prime numbers. Find the sum of all possible values of pp.
p8. Let r(d)r(d) be a function that reverses the digits of the 22-digit integer dd. What is the smallest 22-digit positive integer NN such that for some 22-digit positive integer nn and 22-digit positive integer r(n)r(n), NN is divisible by nn and r(n)r(n), but not by 1111?
p9. What is the period of the function y=(sin(3θ)+6)210(sin(3θ)+7)+13y = (\sin(3\theta) + 6)^2 - 10(sin(3\theta) + 7) + 13?
Round 4
p10. Three numbers a,b,ca, b, c are given by a=22(i=022i)a = 2^2 (\sum_{i=0}^2 2^i), b=24(i=042i)b = 2^4(\sum_{i=0}^4 2^i), and c=26(i=062i)c = 2^6(\sum_{i=0}^6 2^i) . u,v,wu, v, w are the sum of the divisors of a, b, c respectively, yet excluding the original number itself. What is the value of a+b+cuvwa + b + c -u - v - w?
p11. Compute 6116+11\sqrt{6- \sqrt{11}} - \sqrt{6+ \sqrt{11}}.
p12. Let a0,a1,...,ana_0, a_1,..., a_n be such that an0a_n\ne 0 and (1+x+x3)341(1+2x+x2+2x3+2x4+x6)342=i=0naixi.(1 + x + x^3)^{341}(1 + 2x + x^2 + 2x^3 + 2x^4 + x^6)^{342} =\sum_{i=0}^n a_ix^i. Find the number of odd numbers in the sequence a0,a1,...,ana_0, a_1,..., a_n.

PS. You should use hide for answers. Rounds 5-7 have been posted [url=https://artofproblemsolving.com/community/c4h2781343p24424617]here. Collected [url=https://artofproblemsolving.com/community/c5h2760506p24143309]here.

2014 MMATHS Mathathon Rounds 5-7 Math Majors of America Tournament for HS

Round 5
p13. How many ways can we form a group with an odd number of members (plural) from 9999 people? Express your answer in the form ab+ca^b + c, where a,ba, b, and cc are integers and aa is prime.
p14. A cube is inscibed in a right circular cone such that the ratio of the height of the cone to the radius is 2:12:1. Compute the fraction of the cone’s volume that the cube occupies.
p15. Let F0=1F_0 = 1, F1=1F_1 = 1 and Fk=Fk1+Fk2F_k = F_{k-1} + F_{k-2}. Let P(x)=k=099xFkP(x) = \sum^{99}_{k=0} x^{F_k} . The remainder when P(x)P(x) is divided by x31x^3 - 1 can be expressed as ax2+bx+cax^2 + bx + c. Find 2a+b2a + b.
Round 6
p16. Ankit finds a quite peculiar deck of cards in that each card has n distinct symbols on it and any two cards chosen from the deck will have exactly one symbol in common. The cards are guaranteed to not have a certain symbol which is held in common with all the cards. Ankit decides to create a function f(n) which describes the maximum possible number of cards in a set given the previous constraints. What is the value of f(10)f(10)?
p17. If x<14|x| <\frac14 and X=N=0n=0N(Nn)x2n(2x)Nn.X = \sum^{\infty}_{N=0} \sum^{N}_{n=0} {N \choose n}x^{2n}(2x)^{N-n}. then write XX in terms of xx without any summation or product symbols (and without an infinite number of ‘++’s, etc.).
p18. Dietrich is playing a game where he is given three numbers a,b,ca, b, c which range from [0,3][0, 3] in a continuous uniform distribution. Dietrich wins the game if the maximum distance between any two numbers is no more than 11. What is the probability Dietrich wins the game?
Round 7
p19. Consider f defined by f(x)=x6+a1x5+a2x4+a3x3+a4x2+a5x+a6.f(x) = x^6 + a_1x^5 + a_2x^4 + a_3x^3 + a_4x^2 + a_5x + a_6. How many tuples of positive integers (a1,a2,a3,a4,a5,a6)(a_1, a_2, a_3, a_4, a_5, a_6) exist such that f(1)=12f(-1) = 12 and f(1)=30f(1) = 30?
p20. Let ana_n be the number of permutations of the numbers S={1,2,...,n}S = \{1, 2, ... , n\} such that for all kk with 1kn1 \le k \le n, the sum of kk and the number in the kkth position of the permutation is a power of 22. Compute a1+a2+a4+a8+...+a1048576a_1 + a_2 + a_4 + a_8 + ... + a_{1048576}.
p21. A 44-dimensional hypercube of edge length 11 is constructed in 44-space with its edges parallel to the coordinate axes and one vertex at the origin. Its coordinates are given by all possible permutations of (0,0,0,0)(0, 0, 0, 0),(1,0,0,0)(1, 0, 0, 0),(1,1,0,0)(1, 1, 0, 0),(1,1,1,0)(1, 1, 1, 0), and (1,1,1,1)(1, 1, 1, 1). The 33-dimensional hyperplane given by x+y+z+w=2x+y+z+w = 2 intersects the hypercube at 66 of its vertices. Compute the 3-dimensional volume of the solid formed by the intersection.
PS. You should use hide for answers. Rounds 1-4 have been posted [url=https://artofproblemsolving.com/community/c4h2781335p24424563]here. Collected [url=https://artofproblemsolving.com/community/c5h2760506p24143309]here.
Sample
1

MMATHS Mathathon Round Sample- Math Majors of America Tournament for High School

p1. What is the largest distance between any two points on a regular hexagon with a side length of one?
p2. For how many integers n1n \ge 1 is 10n19\frac{10^n - 1}{9} the square of an integer?
p3. A vector in 3D3D space that in standard position in the first octant makes an angle of π3\frac{\pi}{3} with the xx axis and π4\frac{\pi}{4} with the yy axis. What angle does it make with the zz axis?
p4. Compute 20122+2012220132+2013220122\sqrt{2012^2 + 2012^2 \cdot 2013^2 + 2013^2} - 2012^2.
p5. Round log2(k=032(32k)3k5k)\log_2 \left(\sum^{32}_{k=0} {{32} \choose k} \cdot 3^k \cdot 5^k\right) to the nearest integer.
p6. Let PP be a point inside a ball. Consider three mutually perpendicular planes through PP. These planes intersect the ball along three disks. If the radius of the ball is 22 and 1/21/2 is the distance between the center of the ball and PP, compute the sum of the areas of the three disks of intersection.
p7. Find the sum of the absolute values of the real roots of the equation x44x1=0x^4 - 4x - 1 = 0.
p8. The numbers 1,2,3,...,20131, 2, 3, ..., 2013 are written on a board. A student erases three numbers a,b,ca, b, c and instead writes the number 12(a+b+c)((ab)2+(bc)2+(ca)2).\frac12 (a + b + c)\left((a - b)^2 + (b - c)^2 + (c - a)^2\right). She repeats this process until there is only one number left on the board. List all possible values of the remainder when the last number is divided by 3.
p9. How many ordered triples of integers (a,b,c)(a, b, c), where 1a,b,c101 \le a, b, c \le 10, are such that for every natural number nn, the equation (a+n)x2+(b+2n)x+c+n=0(a + n)x^2 + (b + 2n)x + c + n = 0 has at least one real root?
Problems' source (as mentioned on official site) is Gator Mathematics Competition.
PS. You should use hide for answers. Collected [url=https://artofproblemsolving.com/community/c5h2760506p24143309]here.