MathDB

2005 Indonesia Regional

Part of Indonesia Regional

Subcontests

(1)
2

Indonesia Regional MO 2005 Part A 20 problems 90' , answer only

Indonesia Regional also know as provincial level, is a qualifying round for National Math Olympiad Year 2005 [hide=Part A]Part B consists of 5 essay / proof problems, that one is posted [url=https://artofproblemsolving.com/community/c4h2671390p23150609]here
Time: 90 minutes \bullet Write only the answers to the questions given. \bullet Some questions can have more than one correct answer. You are asked to provide the most correct or exact answer to a question like this. Scores will only be given to the giver of the most correct or most exact answer. \bullet Each question is worth 1 (one) point.
p1. If aa is a rational number and bb is an irrational number, then a+ba + b is number ...
p2. The sum of the first ten prime numbers is ...
p3. The number of sets XX that satisfy {1,2}X{1,2,3,4,5}\{1, 2\} \subseteq X \subseteq \{1, 2, 3, 4, 5\} is ...
p4. If N=123456789101112...9899100N = 123456789101112...9899100, then the first three numbers of N\sqrt{N} are ...
p5. Suppose ABCDABCD is a trapezoid with BCADBC\parallel AD. The points P P and RR are the midpoints of sides ABAB and CDCD, respectively. The point QQ is on the side BCBC so that BQ:QC=3:1BQ : QC = 3 : 1, while the point SS is on the side ADAD so that AS:SD=1:3AS : SD = 1: 3. Then the ratio of the area of ​​the quadrilateral PQRSPQRS to the area of ​​the trapezoid ABCDABCD is ...
p6. The smallest three-digit number that is a perfect square and a perfect cube (to the power of three) at the same time is ...
p7. If a,ba, b are two natural numbers aba\le b so that 3+a3+b\frac{\sqrt3+\sqrt{a}}{\sqrt3+\sqrt{b}} is a rational number, then the ordered pair (a,b)=...(a, b) = ...
p8. If AB=ACAB = AC, AD=BDAD = BD, and the angle DAC=39o\angle DAC = 39^o, then the angle BAD\angle BAD is ... https://cdn.artofproblemsolving.com/attachments/1/1/8f0bcd793f0de025081967ce4259ea75fabfcb.png
p9. When climbing a hill, a person walks at a speed of 1121\frac12 km/hour. As he descended the hill, he walked three times as fast. If the time it takes to travel back and forth from the foot of the hill to the top of the hill and back to the foot of the hill is 66 hours, then the distance between the foot of the hill and the top of the hill (in km) is ...
p10. A regular hexagon and an equilateral triangle have the same perimeter. If the area of ​​the triangle is 3\sqrt3, then the area of ​​the hexagon is ...
p11. Two dice are thrown simultaneously. The probability that the sum of the two numbers that appear is prime is ..
p12. The perimeter of an equilateral triangle is pp. Let QQ be a point in the triangle. If the sum of the distances from QQ to the three sides of the triangle is ss, then, expressed in terms of ss, p=...p = ...
p13. The sequence of natural numbers (a,b,c)(a, b, c) with abca\ge b \ge c, which satisfies both equations ab+bc=44ab + bc = 44 and ac+bc=23ac + bc = 23 is ...
p14. Four distinct points lie on a line. The distance between any two points can be sorted into the sequence 1,4,5,k,9,101, 4, 5, k, 9, 10. Then k=k = ...
p15. A group consists of 20052005 members. Each member holds exactly one secret. Each member can send a letter to any other member to convey all the secrets he holds. The number of letters that need to be sent for all the group members to know the whole secret is ...
p16. The number of pairs of integers (x,y)(x, y) that satisfy the equation 2xy5x+y=552xy-5x + y = 55 is ...
p17. The sets A and B are independent and AB={1,2,3,...,9}A\cup B = \{1, 2, 3,..., 9\}. The product of all elements of AA is equal to the sum of all elements of BB. The smallest element of BB is ...
p18. The simple form of (231)(331)(431)...(10031)(23+1)(33+1)(43+1)...(1003+1)\frac{(2^3-1)(3^3-1)(4^3-1)...(100^3-1)}{(2^3+1)(3^3+1)(4^3+1)...(100^3+1)} is ...
p19. Suppose ABCDABCD is a regular triangular pyramid, which is a four-sided space that is in the form of an equilateral triangle. Let SS be the midpoint of edge ABAB and TT the midpoint of edge CDCD. If the length of the side ABCDABCD is 11 unit length, then the length of STST is ...
p20. For any real number aa, the notation[a][a] denotes the largest integer less than or equal to aa. If xx is a real number that satisfies [x+3]=[x]+[3][x+\sqrt3]=[x]+[\sqrt3], then x[x]x -[x] will not be greater than ...

Indonesia Regional MO 2005

Problem 1. The longest side of a cyclic quadrilateral ABCDABCD has length aa, whereas the circumradius of ACD\triangle{ACD} is of length 1. Determine the smallest of such aa. For what quadrilateral ABCDABCD results in aa attaining its minimum?
Problem 2. In a box, there are 4 balls, each numbered 1, 2, 3 and 4. Anggi takes an arbitrary ball, takes note of the number, and puts it back into the box. She does the procedure 4 times. Suppose the sum of the four numbers she took note of, is 12. What's the probability that, while doing the mentioned procedure, that she always takes the ball numbered 3?
Problem 3. If α,β\alpha, \beta and γ\gamma are the roots of x3x1=0x^3 - x - 1 = 0, determine the value of 1+α1α+1+β1β+1+γ1γ. \frac{1 + \alpha}{1 - \alpha} + \frac{1 + \beta}{1 - \beta} + \frac{1 + \gamma}{1 - \gamma}.
Problem 4. The lengths of three sides, a,b,ca, b, c with abca \leq b \leq c, of a right triangle, are integers. Determine all triples (a,b,c)(a, b, c) so that the value of the perimeter and the area such triangle(s) are equal to each other.
Problem 5. Let AA and BB be two sets, each having consecutive natural numbers as their elements. The sum of the arithmetic mean of the elements of AA and the arithmetic mean of the elements of BB is 5002. If AB={2005}A \cap B = \{2005\}, then find the largest possible element of ABA \cup B.