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Conference rusure::math

Title:	Mathematics at DEC

Moderator:	RUSURE::EDP

Created:	Mon Feb 03 1986
Last Modified:	Fri Jun 06 1997
Last Successful Update:	Fri Jun 06 1997
Number of topics:	2083
Total number of notes:	14613

1345.0. "1990 Putnam problems, taken from the net" by HERON::BUCHANAN (combinatorial bomb squad) Tue Dec 04 1990 04:27

Problem A-1
Let T_0 = 2, T_1 = 3, T_2 = 6, and for n >= 3,
T_n = (n + 4)T_{n-1} - 4n T_{n-2} + (4n - 8)T_{n-3}.
The first few terms are 2, 3, 6, 14, 40, 152, 784, 5168, 40576, 363392.
Find, with proof, a formula for T_n of the form T_n = A_n + B_n, where
(A_n) and (B_n) are well-known sequences.

Problem A-2
Is \sqrt{2} the limit of a sequence of numbers of the form
\root3{n} - \root3{m}, (n, m = 0, 1, 2, ...) ? Justify your answer.

Problem A-3
Prove that any convex pentagon whose vertices (no three of which are
collinear) have integer coordinates must have area >= 5/2.

Problem A-4
Consider a paper punch that can be centered at any point of the plane
and that, when operated, removes from the plane precisely those points
whose distance from the center is irrational. How many punches are
needed to remove every point?

Problem A-5
If A and B are square matrices of the same size such that ABAB = 0, does
it follow that BABA = 0?

Problem A-6
If X is a finite set, let |X| denote the number of elements in X. Call
an ordered pair (S,T) of subsets of {1,2,...,n} admissible if s > |T|
for each s \in S, and t > |S| for each t \in T. How many admissible
ordered pairs of subsets of {1,2,...,10} are there? Prove your answer.

Problem B-1
Find all real-valued continuously differentiable functions f on the real
line such that for all x
(f(x))^2 = \int_0^x ((f(t))^2 + (f'(t))^2) dt + 1990.

Problem B-2
Prove that for |x| < 1, |z| > 1, 1 + \sum_{j = 1}^\infty
(1 + x^j) { (1 - z)(1 - zx)(1 - zx^2)...(1 - zx^{j-1})
\over (z - x)(z - x^2)(z - x^3)...(z - x^j) } = 0.

Problem B-3
Let S be a set of 2x2 integer matrices whose entries a_{ij} (1) are all
squares of integers, and, (2) satisfy a_{ij} <= 200. Show that if S has
more than 50387 (= 15^4 - 15^2 - 15 + 2) elements, then it has two
elements that commute.

Problem B-4
Let G be a finite group of order n generated by a and b. Prove or
disprove: there is a sequence g_1, g_2, g_3, ..., g_{2n} such that
(1) every element of G occurs exactly twice, and
(2) g_{i+1} equals g_i a or g_i b, for i = 1, 2, ..., 2n. (Interpret
g_{2n+1} as g_1.)

Problem B-5
Is there an infinite sequence a_0, a_1, a_2, ... of nonzero real numbers
such that for n = 1, 2, 3, ... the polynomial
p_n(x) = a_0 + a_1x + a_2x^2 + ... + a_nx^n has exactly n distinct real
roots?

Problem B-6
Let S be a closed bounded convex set in the plane. Let K be a line and t
a positive number. Let L_1 and L_2 be support lines for S parallel to K,
and let \overbar{L} be the line parallel to K and midway between L_1 and
L_2. Let B_S(K,t) be the band of points whose distance from \overbar{L}
is at most (t/2)w, where w is the distance between L_1 and L_2. What is
the smallest t such that S \cap \bigcap_K B_S(K,t) \ne 0 for all S?
(K runs over all lines in the plane.) [ picture deleted ]

Regards,
Andrew.

T.R	Title	User	Personal Name	Date	Lines
1345.1	hints	GUESS::DERAMO	Sometimes they leave skid marks.	`Thu Dec 06 1990 12:35`	18
	Partial "spoilers". Don't look at these hints if you want to work on these yourself. You're looking! :-) You'll love the solution to A-1. Once you have an answer, proving it by induction is easy. But getting to that point was rather involved. A-2 is yes. A-3 reduces by Pick's [?] theorem to showing the figure must contain at least one interior lattice point. I haven't worked on that part yet. A-4 is continuum many. A-5 is no, I have a counter-example with 4x4 matrices. A-6 I've only done for n=0,1, and 2 (the problem asks for the result when n=10). B-1 has two rather simple solutions. I haven't done any of the others yet. Dan
1345.2		HPSTEK::XIA	In my beginning is my end.	`Thu Dec 06 1990 14:12`	29
	re .0 .1, Dan, I haven't looked at the rest of the problem set, but the answer to A_4 is at most countably many. You just need to place the paper punch at the points with rational coordinates... Proof: Let (x, y) be a point on the plane. If x and y are both rational, then paper punch centered at (x+1, y+1) works. If only one of the two are rational, say x is rational, then the paper punch centered at (x, 0) works. Suppose x and y are both irrational and the distance between (x, y) and any rational points are rational. Then sqrt(x^2 + y^2) must be rational, hence equal to p/q where p, q are in Z. So we have x^2 + y^2 = p^2/q^2. Now the distance between (x, y) and (1, 0) must also be rational, so sqrt((x-1)^2 + y^2) = a/b where a, b are in Z ==> p^2/q^2 - 2x + 1 = a^2/b^2. Since a, b, p, q are all in Z (the integers), this implies x is rational. This contradicts the assumption that x and y are both irrational. Q.E.D As a matter of fact, I believe you may only need finite many punches. That is yet to be proven, but if you look at case three, you will find that after making a punch at (0,0) and (0,1), you have already removed all the points both coordinates irrational. Eugene
1345.3	a-3 & a-5	NOVA::VENU		`Thu Dec 06 1990 17:22`	38
	A-5 : Here's a simple 3x3 counter-example. A = 1 0 0 B = 0 0 1 0 0 1 1 0 0 0 0 1 0 0 0 AB = 0 0 1 ABAB = [0] 0 0 0 0 0 0 BA = 0 0 1 BABA = 0 0 0 1 0 0 0 0 1 0 0 0 0 0 0, hence the proof. A-3: This seems intuitive geometrically, given the following : a) We can have the orgin as one of the vertices, b) Given any convex pentagon, we can find one equal to or lesser in area by reducing one of the obtuse angles to 90 deg., c) Given the above 2 plus the fact that the vertices have integral coordinates, the smallest such pentagon that can be constructed has area of 5/2, and with coordinate pairs for the 5 vertices being {(0,0), (1,0), (0,1), (2,1) & (1,2)} or {(0,0), (1,0), (0,1), (2,2) and (2,1)} or {(0,0), (0,1), (1,0), (2,2) and (1,2)}. A-1's got me in knots so far .... /Venu
1345.4	make that "countable many REMAINING points"	GUESS::DERAMO	Sometimes they leave skid marks.	`Thu Dec 06 1990 17:58`	17
	re .2, Reviewing my notes, I see that on my first pass I blew away everything except for circles with rational radius centered at the origin. Then I inverted the sense of the paper punch and only removed points a rational distance away from any later punch centers. Oops. :-) Each "reversed" punch couldn't do very much as it could only get rid of at most the countably many points "quadratically" related to its coordinates. I was suspicious since my "proof" used the axiom of choice (more specifically, the countable AC, to show that a countable union of countable sets is countable) but I still didn't catch the error. Dan
1345.5		GUESS::DERAMO	Sometimes they leave skid marks.	`Thu Dec 06 1990 18:22`	23
	re .2, .4, A-4 Two points is insufficient. Three points is sufficient. Select any two distinct points in the plane as punch centers. If the distance between the two points is rational, neither was removed by either punch. But that is irrelevant. Let the distance between the two points be t. Let q be a rational between 0 and t. Call the points A and B. Consider the circle of radius q around A. Consider the line containing A and B, it intersects the circle at distances t-q and t+q from B. As you continuously travel along the circle between those two intersection points, the distance from B continuously varies, taking on every value between t-q and t+q. Some of those values are rational, and any such point is also the rational distance q away from A. Use the three punch centers (0,0), (1,0), and (a,0), where a is any real that is not quadratic over the rationals (for example, e, or the cube root of two). Dan
1345.6	A-1	GUESS::DERAMO	Sometimes they leave skid marks.	`Thu Dec 06 1990 22:17`	100
	A-1. T(0) = 2, T(1) = 3, T(2) = 6, and for n >= 3, T(n) = (n+4)T(n-1) - 4nT(n-2) + (4n-8)T(n-3) T(n) = A(n) + B(n), a sum of two "well-known sequences". First I figured I would try some interesting sequences like the Fibonacci numbers or powers of two. And in fact subtracting the Fibonacci sequence 1,1,2,3,5,... (starting with 0,1,1,2,3,... didn't yield anything) gives 1,2,4, (is it? is it?) 11, (no), .... So I set out to solve it using generating functions. For example, take the Fibonacci sequence F(0)=0,F(1)=1,for n>=2 F(n)=F(n-1)+F(n-2). Let f(x) = sum(n=0,...,oo) F(n)x^n Then xf(x) is a sum of terms like F(n-1)x^n and x^2 f(x) is a sum of terms like F(n-2)x^n. Since F(n)=F(n-1)+F(n-2) we have f(x) = xf(x) + x^2 f(x) + stuff, where stuff accounts for the "edge effects" of the lower order terms (we were breaking from the relation F(n)=F(n-1)+F(n-2) by implicitly setting F(-1)=F(-2)=F(-3)=...=0). The result is (1 - x - x^2)f(x) = a + bx. Solve 1 - x - x^2 = 0 to get roots r and s, making 1 - x - x^2 = (1-rx)(1-sx). Divide by that and use partial fractions to rewrite it as f(x) = c/(1-rx) + d/(1-sx). Since 1/(1-rx) = 1 + rx + r^2x^2 + ... + r^n x^n, and since f(x) is the sum of F(n) x^n, we get F(n) = c r^n + d s^n. This process will be a little harder for T(n) because the coefficients of the lagged terms are not constants (they depend on n), but let's try it and see what happens. First set f(x) = sum(n=0,...,oo) T(n)x^n. Note that the coefficient of x^n for xf, x^2 f, x^3 f, etc. are respectively T(n-1), T(n-2), T(n-3), etc. To get an "n" term, differentiate xf. The coefficient of x^n in (xf)' becomes (n+1)T(n). Multiplying by x shows that x(xf)' is associated with nT(n-1). Likewise x(x^2 f)' with nT(n-2) and x(x^3 f)' with nT(n-3). Putting this all together and keeping careful track of the low order terms yields x(xf)' + 4xf - 4x(x^2 f)' + 4x(x^3 f)' - 8x^3 f = f - 2 + 11x - 4x^2 Regrouping, (x^2 - 4x^3 + 4x^4)f' - (1 - 5x + 8x^2 - 4x^3)f = -(2 - 11x + 4x^2) Factoring and isolating f' yields 1-x 2 - 11x + 4x^2 f' + (- ---)f = - -------------- x^2 x^2 (1 - 2x)^2 Noting that 1/(1-2x) = 1+2x+4x^2+8x^3+... suggests trying 2^n, but earlier I had shown T - Fibo ==> 1,2,4, then 11. Now, what we have above is an easily solved differential equation in f. Solve it for f, express that as a Taylor series in x and voila! To solve it you first find a solution for the homogeneous equation f' + (- (1-x)/x^2 )f = 0 The solution to f' + P(x)f = 0 is f = exp(integral(-P(x)dx)) which yields f(x) = exp(integral( (1/x^2 - 1/x)dx )) or f(x) = exp( -1/x + ln x) or f(x) = (1/x)exp(-1/x). Oh, no. As a series that gives a series in 1/x instead of a series in x. I actually used this solution to try to solve the full equation with the non-homogeneous term (lots of partial fractions!). Don't bother. I didn't get anything I could use. Sigh. I was actually looking at this in the form f' = (1-x)/x^2 f Eventually that x^2 term moved itself out of the denominator and I was staring at x^2 f' = (1-x)f Something clicked ... those look like the kind of terms I used to convert the difference equation in T to a differential equation in f. Since I can't get a power series for this f, why not convert this back to a difference equation? This simplified equation (I dropped out the inhomogeneous term) can correspond to a new sequence S related to T. Let's see now, f corresponds to S(n), f' to (n+1)S(n+1), xf' to nS(n), and x^2 f' to (n-1)S(n-1). (1-x)f = f - xf corresponds to S(n) - S(n-1). So (n-1)S(n-1) = S(n) - S(n-1), or nS(n-1) = S(n). What?? S(n) = nS(n-1) ... I recognize that!! I think you can finish from here. Solve for S, see if T = S + something interesting, it does, so take that formula for T(n) and use induction to prove it. Dan
1345.7		GUESS::DERAMO	Sometimes they leave skid marks.	`Thu Dec 06 1990 22:22`	12
	In .6, when solving difference equations using generating functions you usually consider yourself to be doing formal manipulations without regard to questions of convergence and the like. When you get an "answer", you prove it by induction, thus sweeping any problems with the method of getting the answer under the proverbial rug. As it happens, the series T(0) + T(1)x + T(2)x^2 + ... has coefficients that grow so fast that the radius of convergence of the series is zero. I wonder if that is related to not being able to get a useful form for f(x). Dan
1345.8	A-6	TRACE::GILBERT	Ownership Obligates	`Fri Dec 07 1990 10:00`	19
	A-6 Suppose \|S\| and \|T\| are known. How many ordered pairs are there? Let a=\|S\| and b=\|T\|. So S contains a elements of {1..n} s.t. each > b. There are C(n-b,a) ways of doing this, where C is `choose', i.e., the binomial coefficient. Similarly, there are C(n-a,b) ways to choose the elements of T. So given a and b, there are C(n-b,a)C(n-a,b) ordered pairs. The above holds if a+b <= n; if a+b < n, then there are no ordered pairs. BTW, note that C(n-b,a) = C(n-a,b). The answer to A-6 is then 2 2 Sum C(n-b,a) , or Sum C(c,a) a+b < n 0 <= a < c <= n 0 <= a,b How does this simplify?
1345.9	A-1 is easy	TRACE::GILBERT	Ownership Obligates	`Fri Dec 07 1990 10:06`	3
	For A-1, I noticed that 363392 ~ 940576, and 40576 ~ 840576, etc, so a factorial was indicated. Trying T_n = n! + U_n suggested U_n = 2^n. T_n = n! + 2^n fit the recurrence, and the first 3 values fit, so QED.
1345.10		SSDEVO::LARY	under the Big Western Sky	`Fri Dec 07 1990 15:51`	5
	B-2 yields to an inductive argument similiar to A-1. Just combine the first two terms, note the simplifications, add the third term, note the simplification, generalize by induction, and show (based on the fact that there is some N such that j>N implies x^j < min((z-1)/2,1/z^2)) that the simplified form goes to zero.
1345.11	B-4	NEWOA::STRANGEWAYS	The brain's trussed	`Tue Dec 18 1990 07:28`	55
	A solution for B-4: Assume for convenience that a != b and a != b^-1. (G is cyclic and the proposition is trivially true in these cases.) Consider the directed graph D whose vertices are the elements of G and whose edges are all the (directed) lines running from any element g in G to ga or to gb. We assert that G is strongly connected (ie any vertex is reachable from any other). For consider the set of R elements reachable from the identity. This is the set of elements of G can be expressed as a product a^i1.b^i2.a^i3...b^ik for some suitable choice of positive integer exponents {i}. Since G is finite of order n, we know a^n = e, the identity, and hence a^n-1 = a^-1. So a^-1 is in R and similarly b^-1 is in R. This means that each of a^-1 and b^-1 is expressible as a product of positive powers of a and b. But any element of G is expressible as a product of (possibly negative) powers of a and b, and by substituting the positive power expressions for a^-1 and b^-1 where necessary, we can express any element of G as a product of positive powers. Hence, R is the whole of G. Thus any vertex of D is reachable from the identity, Also, the identiity is reachable in D from any vertex. To reach the identity from vertex g, express g^-1 as a product of positive powers of a and b and follow that path through the graph. Hence (by transitivity, if you want to be picky) we have shown that D is strongly connected. It is obvious that the out-degree of each vertex is 2, one edge to ga and one (distinct) edge to gb. The in-degree of each vertex is also 2, since the only possible incident edges arise from g.a^-1 and g.b^-1, (uniqueness by group cancellation law) and each of these does exist. So D is a strongly connected directed graph with the in-degree of each vertex equal to its out-degree. This is a necessary and sufficient condition for D to have an Eulerian trail (closed directed spanning circuit which cvers every edge.) List the vertices on one such trail. The list has the property that: each vertex is visited exactly twice, and the label of the successor on each vertex is obtained by postmultiplying the label of that vertex by a or b. These are the conditions of the proposition, which is therefore proved true. As an added bonus, the BEST theorem even tells us how may such sequences there are. Andy.
1345.12	later	HERON::BUCHANAN	Holdfast is the only dog, my duck.	`Sun Feb 10 1991 14:10`	16
	A solution for B-5: Given a0,...,a_n, we take a_(n+1) spectacularly teeny with respect to all the a_j already defined. This can ensure that in p_(n+1)(x), the n roots of p_n(x) are perturbed by at most \|a_(n+1)\| in the limit. That keeps us with n distinct roots. Now, the (n+1)th root must be real, since complex roots of real-valued polys come in pairs, and we already have n real ones. p_(n+1)(x) can only have a repeated root if z = x^(n+1)*p_(n+1)(1/x) has a repeated root. A poly has a repeated root if gcd(z, dx/dx) is not a constant. By tweaking a_(n+1) if we were unlucky enough to have a value which caused the (n+1)th to coincide with one of the ones we already had, we can avoid a problem. Regards, Andrew.
1345.13	uh-uh...	HERON::BUCHANAN	Holdfast is the only dog, my duck.	`Mon Feb 11 1991 09:07`	26
	>A-6 > >Suppose \|S\| and \|T\| are known. How many ordered pairs are there? > >Let a=\|S\| and b=\|T\|. So S contains a elements of {1..n} s.t. each > b. >There are C(n-b,a) ways of doing this, where C is `choose', i.e., the binomial >coefficient. Similarly, there are C(n-a,b) ways to choose the elements of T. >So given a and b, there are C(n-b,a)C(n-a,b) ordered pairs. >The above holds if a+b <= n; if a+b < n, then there are no ordered pairs. Yes. >BTW, note that C(n-b,a) = C(n-a,b). No: C(2-1,0) = 1 <> 2 = C(2-0,1) I still can't simplify the sum of all these chaps though. A thought: does Mr Putnam mean us to use arithmetic (byeuch!) to get the answer for n=10? The only other approach which I can think of is an inductive one, based on classifying any admissible pair by the cardinality of the two sets as above, and at the same time by the min of each set. Then induce over n. Regards, Andrew.
1345.14	A-6 half way	IOSG::CARLIN	Dick Carlin IOSG, Reading, England	`Mon Feb 11 1991 13:38`	24
	>The answer to A-6 is then > > 2 2 > Sum C(n-b,a) , or Sum C(c,a) > a+b < n 0 <= a < c <= n > 0 <= a,b > >How does this simplify? Rewriting this as 2 Sum ( Sum C(c,a) ) c = 1 to n a = 0 to c-1 that inner sum reduces to C(2*c,c)-1. Having patted myself on the back for finding this I then discovered that this was a result known to the Chinese in the early 1300's. I'm always the last to know. The outer sum looks as if it ought to simplify, but it's beyond me. Dick
1345.15	Problem A-6, according to an interactive VAX LISP session	GUESS::DERAMO	Dan D'Eramo	`Mon Feb 11 1991 17:12`	9
	>> Problem A-6 >> If X is a finite set, let \|X\| denote the number of elements in X. Call >> an ordered pair (S,T) of subsets of {1,2,...,n} admissible if s > \|T\| >> for each s \in S, and t > \|S\| for each t \in T. How many admissible >> ordered pairs of subsets of {1,2,...,10} are there? Prove your answer. 17711. Dan
1345.16	the empirical formula for A-6	GUESS::DERAMO	Dan D'Eramo	`Mon Feb 11 1991 17:30`	18
	n # admissible pairs - ------------------ 1 3 2 8 3 21 4 55 5 144 6 377 7 987 8 2584 9 6765 10 17711 If you define the n-th Fibonacci number so that Fibo(0) = 0 Fibo(1) = 1, then the number of admissible pairs of subsets of {1,...,n} is Fibo(2n+2). Dan
1345.17	coup de grace for A-6	HERON::BUCHANAN	Holdfast is the only dog, my duck.	`Sat Feb 16 1991 11:28`	63
	Congrats to Dan for the key insight that the pattern is alternate Fibonacci. After that, the problem just solves itself... We want an analytic expression for: f(n) = sum (a+b =< n) C(n-a,b) * C(n-b,a) where n, a & b are natural numbers. In fact, if we define C(x,y) = 0 when y < 0, or when y > x, then we can imagine that the sum is over all integers a & b such that they sum to the natural n. Moreover, the key identity: C(n,x) = C(n-1,x) + C(n-1,x-1) is then valid for all integers n and x except for the case n=x=0, since C(0,0) = 1. f(n) = sum (a+b =< n) C(n-a,b) * C(n-b,a) = sum (a+b =< n) C(n-a,b) * [C(n-b-1,a) + C(n-b-1,a-1)] + C(n-0,n) * C(n-n,0) = sum (a+b =< n) C(n-a,b) * C(n-b-1,a) + sum ((a-1)+b =< (n-1)) C((n-1)-(a-1),b) * C((n-1)-b,a-1) + 1 = sum (a+b =< n) C(n-a,b) * C(n-b-1,a) + f(n-1) + 1 So, let's define g(n), = 1 + sum (a+b =< n) C(n-a,b) * C(n-b-1,a) Thus f(n) = f(n-1) + g(n). g(n) = 1 + sum (a+b =< n) C(n-a,b) * C(n-b-1,a) = 1 + sum (a+b =< n) [C(n-a-1,b-1) + C(n-a-1,b)] * C(n-b-1,a) + C(n-n,0) * C(n-0-1,n) = 1 + sum (a+b =< n) C(n-a-1,b-1) * C(n-b-1,a) + sum (a+b =< n) C(n-a-1,b) * C(n-b-1,a) + 0 = 1 + sum (a+(b-1) =< (n-1)) C((n-1)-a,b-1) * C((n-2)-(b-1),a) + sum (a+b =< (n-1)) C((n-1)-a,b) * C((n-1)-b,a) + sum (a+b = n) C((n-1)-a,b) * C((n-1)-b,a) = g(n-1) + f(n-1) + 0. Thus, if we put f(n) = F(2n+2), and g(n) = F(2n+1), we find that f & g satisfy F(m)+F(m+1)=F(m+2). All it remains to do is to examine F(2) = f(0) = 1, and F(3) = g(1) = 2, to confirm that what we have in F is the Fibonnacci series, and that f(10) = F(22). Regards, Andrew.
1345.18		GUESS::DERAMO	Dan D'Eramo	`Sat Feb 16 1991 14:05`	38
	>> .17 >> Congrats to Dan for the key insight that the pattern is alternate >> Fibonacci. After that, the problem just solves itself... That's what I thought ... state the induction hypothesis, then sit back and wait for the problem to solve itself. And it did! :-) As for the "key insight", the table in .16 was generated backwards. I used LISP and had a list of the 1024 subsets of {1,...,10}, and I counted how many of the 1,048,576 pairs were admissible. That's all that was needed for the numerical answer to A-6. Only as an afterthought did I take the subsets with a 10 out of the list and count up the answer for n=9; then take out the subsets with a 9 and count up the answer for n=8; etc. So I caught the Fibonacci sequence from the generated answers 144 (square, Fibo), 55 (yeah, that's a Fibo too, isn't it?), 21 (that clinches it, they must all be Fibo's). [I'm so trusting. :-)] The final 8 and 3 weren't surprises, but it was obvious some Fibonacci numbers were missing, so I generated a list of them to see that the way the missing ones were skipped was regular. But that raises the question ... how did they expect the problem to be solved? From the pattern 3-8-21 for n=1,2,3? There are already 64 total pairs of subsets for n=3 (that increases as a factor of four as n is incremented). This is a pencil and paper test with three hours for each six-question part. So what is the insight going from n to n+1 that they expected people to get? Dan