1. Find all polynomials f(x) such that f(2x) = f '(x) f ''(x).
2. ABCD is a square side 1. P and Q lie on the side AB and R lies on the side CD. What are the possible values for the circumradius of PQR?
3. Find all pairs (m, n) of integers such that n2 - 3mn + m - n = 0.
4. Which of the following statements are true?
(A) X implies Y, or Y implies X, where X is the statement, the lines L1, L2, L3 lie in a plane, and Y is the statement, each pair of the lines L1, L2, L3 intersect.
(B) Every sufficiently large integer n satisfies n = a4 + b4 for some integers a, b.
(C) There are real numbers a1, a2, ... , an such that a1 cos x + a2 cos 2x + ... + an cos nx > 0 for all real x.
5. Find the largest cube which can be placed inside a regular tetrahedron with side 1 so that one of its faces lies on the base of the tetrahedron.
Solutions
Problem 1
Find all polynomials f(x) such that f(2x) = f '(x) f ''(x).
Answer
4x3/9
Solution
Suppose deg f = n. Then deg f ' = n-1 and deg f " = n-2, so n = n-1+n-2. Hence n = 3. So put f(x) = ax3 + bx2 + cx + d. Then we have 8ax3 + 4bx2 + 2cx + d = (3ax2 + 2bx + c)(6ax + 2b) = 18a2x3 + 18abx2 + (6ac+4b2)x + 2bc. Comparing x3, a = 4/9. Then comparing x2, b = 0. Comparing x, c = 0. Comparing constant term, d = 0.
Problem 2
ABCD is a square side 1. P and Q lie on the side AB and R lies on the side CD. What are the possible values for the circumradius of PQR?
Answer
any value in [1/2, 1/√2]
Solution
Let O be the circumcenter. Then OP + OR ≥ PR ≥ AD = 1, so the radius is at least 1/2. P,Q,R always lie inside or on the circle through A,B,C,D which has radius 1/√2, so the radius is at most 1/√2.
Now take ∠RPQ = 90o, then QR is a diameter of the circumcircle and so the circumradius is ½QR. By adjusting the positions of Q, R we can obviously get QR to have any value in [1,√2].
Problem 3
Find all pairs (m, n) of integers such that n2 - 3mn + m - n = 0.
Answer
(m,n) = (0,0) or (0,1)
Solution
(3m+1)(3n-1) = 3n2-1, so if p divides 3n-1, then it also divides 3n2-1, and hence also (3n2-1) - n(3n-1) = n-1, and hence also (3n-1) - 3(n-1) = 2. So 3n-1 = 0, ±1 or ±2. But n must be an integer, so 0, 1, -2 do not work. -1 gives n = 0 and hence m = 0, which is a solution. 2 gives n = 1 and hence m = 0, which is a solution.
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Swedish Mathematical Society
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