 |
|
| Set 5 |
- 25.
- Let c be a positive integer and let f0 = 1, f1 = c
and fn = 2fn-1 - fn-2 + 2 for n ³ 1. Prove that for
each k ³ 0, there exists m ³ 0 for which
fk fk+1 = fm.
- 26.
- Let p(x) be a polynomial with integer coefficients for
which p(0) = p(1) = 1. Let a0 be any nonzero integer and define
an+1 = p(an) for n ³ 0. Prove that, for distinct
nonnegative integers i and j, the greatest common divisor of
ai and aj is equal to 1.
- 27.
- (a) Let n be a positive integer and let f(x) be a quadratic polynomial with real coefficients and real roots that differ by at least n. Prove that the polynomial g(x) = f(x) + f(x + 1) + f(x + 2) + ¼+ f(x + n) also has real roots.
- (b) Suppose that the hypothesis in (a) is replaced by
positing that f(x) is any polynomial for which the difference
between any pair of roots is at least n. Does the result
still hold?
- 28.
- Find the locus of points P lying inside an equilateral
triangle for which ÐPAB + ÐPBC + ÐPCA = 90°.
- 29.
- (a) Prove that for an arbitrary plane convex quadrilateral, the ratio of the largest to smallest distance between pairs of points is at least Ö2.
- (b) Prove that for any six distinct points in the plane, the ratio of the largest to smallest distances between pairs of them is at least Ö3.
- 30.
- Let a, b, c be positive real numbers. Prove that
- (a) 4(a3 + b3) ³ (a + b)3;
- (b) 9(a3 + b3 + c3) ³ (a + b + c)3,
- (c) More generally, establish that for each integer n and n
nonnegative reals that
n2 (a13 + a23 + ¼+ an3) ³ (a1 + a2 + ¼+ an)3 .
- 25.
- First solution. A straightforward induction argument establishes that fn = nc + (n-1)2, and it can be checked algebraically that
|
- 25.
- Comment. This is basically a problem in experimentation and pattern recognition. Once the result is conjectured, the algebraic manipulations required are straightforward. One way to approach the problem is to consider fk fk+1 = m2 + (c - 2)m + 1 as a quadratic equation to be solved for m. Note that when c = 4, it turns out that fn = (n+1)2. If we let f(c, n) = nc + (n-1)2, then m = f(c+1, k). More generally, we have for every monic quadratic polynomial p with integer coefficients, p(k)p(k+1) = p(m) for some integer m.
- 26.
- First solution. By the factor theorem, we have that p(x) - 1 = x(x - 1)q(x) for some polynomial q(x) with integer coefficients. Hence
| |||||||||||
- 26.
- Second solution. Let p(x) = cd xd + ¼+ c1 x + c0. The conditions imply that c0 = cd + ¼+ c1 + c0 = 1. Let a be any nonzero integer. Then
|
|
- 27.
- (a) First solution. By making a substitution of the form x¢ = x - k, we can dispose of the linear term in the quadratic. Thus we may assume that f(x) = x2 - r2 where 2r ³ n. Then
| ||||||||||||||||||||||||||||
|
- 27.
- (a) Second solution. [Z. Amir-Khosravi] Let u and v be the two roots of f(x) with u + n £ v, with strict inequality when n = 1. Wolog, suppose that f(x) < 0 for x < u and x > v, while f(x) < 0 for u < x < v. Then g(x) is a quadratic polynomial for which
| ||||||||||||
- When n = 1 and v = u + 1, then g(u) = 0. Since g(x) is a real quadratic with at least one real root, both roots are real.
- 27.
- (b) First solution. Suppose that f(x), and hence g(x), has degree d, and let the roots of f(x) be a1, a2, ¼, ad where ai+1 ³ ai + n. Since f(x) has no multiple roots, it alternates in sign as x passes through the roots ai.
- To begin with, let n ³ 2, and let ai be one of the roots. Suppose, wolog, that f(x) < 0 for ai - n < x < ai and f(x) > 0 for ai < x < ai + n. Then
|
|
- Now suppose that n = 1. If the intervals [ai - 1, ai] are all disjoint, then we can use the foregoing argument since g(ai - 1) = f(ai - 1) and g(ai) = f(ai + 1) are nonzero with opposite signs. Suppose, on the other hand, there are s roots of f(x), namely ar, ar+1, ¼, ar+s-1 spaced unit distance apart (ar+i = ar+i-1 + 1 for 1 £ i £ s-1) such that ar - 1 and ar+s-1 + 1 are not roots of f(x). We will discuss the case that f(x) < 0 for ar-1 £ x < ar and f(x) > 0 for ar+s-1 < x £ ar+s-1 + 1; the other three cases can be handled analogously.
- In this case, all the roots of f(x) are simple, s is odd, and
|
|
|
- We can apply this analysis to the other ``blocks'' of s roots of f(x) spaced at unit distance to obtain disjoint intervals with at least s roots of g(x). From this, we can deduce that all the roots of g(x) must be real.
- 28.
- First solution. Let ÐPAB = a, ÐPAC = a¢, ÐPBC = b, ÐPBA = b¢, ÐPCA = g and ÐPCB = g¢, so that a+ a¢ = b+ b¢ = g+ g¢ = 60°. Let |AP | = u, |BP | = v and |CP | = w. By the Law of Sines,
|
|
| |||||||||||||
| |||||||||||||
- Since also a¢+ b¢+ g¢ = 90°, a similar identity holds for a¢, b¢ and g¢. Hence
| |||||||||
- Now sinl+ sinm = 2sin1/2(l+m)cos1/2(l- m) = -2 sin[(n)/2]cos[(l-m)/2] and sinn = 2 sin[(n)/2]cos[(n)/2], whence 0 = 2 sin[(n)/2] [ cos[(n)/2] - cos[(l- m)/2]]. Hence n = 0, n = l-m or n = m- l. If n = 0, then g = g¢ and P lies on the bisector of angle C. If l = m+ n, then l = 0 and P lies on the bisector of angle A. If m = l+ n, then m = 0 and P must lie on the angle bisector of the triangle ABC.
- Conversely, it is easily checked that any point P on these bisectors satisfies the given condition.
- 28.
- Second solution. [Z. Amir-Khosravi] See Figure 28.2. Let the vertices of the triangle in the complex plane be 1, -1 and Ö3i, and let z be a point on the locus. Then, with the angles as indicated in the diagram and cis q = cosq+ isinq, we have that
|
|
|
|
| ||||||||||||
- 29.
- First solution. (a) One of the angles q of the quadrilateral must be between 90° and 180° inclusive so that cosq £ 0. Let a and b be the lengths of the sides bounding this angle and let u be the length of the diagonal joining the endpoints of these sides (opposite q). Wolog, suppose that a £ b. Then
|
- (b) If ABC is a triangle for which a £ b £ c and C ³ 120°, then -1 £ cosC £ -1/2 and
|
- Consider the smallest closed convex set containing the six points. If all six points are on the boundary, then they are the vertices of a (possibly degenerate) convex hexagon. Since the average interior angle of such a hexagon is 120°, one of the angles is at least 120° and we get the desired result.
- If the convex set has fewer than six points on the boundary, the remaining point(s) lie in its interior. Triangulate the convex set using only the boundary points; one of the interior points lies inside one of the triangles (possibly on a side), and one of the sides of the triangle must subtend at this point an angle of at least 120°. Again, the desired result holds.
- 29.
- Second solution. [L. Lessard] Suppose ABC is a triangle with a £ b £ c and 90° £ C £ 180°. Then 2A £ A + B = 180° - C, so that by the Law of Sines,
|
- 30.
- First solution. (a) Taking the difference of the two sides of the inequality yields 3 times
|
- (b) Using the result in (a), we obtain that
| ||||||||||||||||||
- 30.
- Second solution. (b) Since the desired inequality is completely symmetrical in the variables, wolog we may suppose that a ³ b ³ c. Then
|
|
|
|
| |||||||||
- 30.
- First solution. The Chebyshev Inequality asserts that if x1 ³ x2 ³ ¼ ³ xn ³ 0 and y1 ³ y2 ³ ¼ ³ yn ³ 0, then
|
- Using this twice yields
| |||||||||
- 30.
- Second solution. The power mean inequality asserts that, for k > 1,
|
- 30.
- Third solution. By the Cauchy-Schwarz Inequality, we obtain
| |||||||||||||||||||||||||||||||||||||||||||||||||||||||
- 30.
- Comment. L. Lessard began his solution by in effect replacing the original set { ai } be a set whose elemenets are a little closer to the mean of these numbers.The result holds for n = 1. We assume as an induction hypothesis that it holds for n = K, viz. that
|
|
|
