1948 Putnam

Part of Putnam

Subcontests

(12)

1

Putnam 1948 B6

Answer wither (i) or (ii):
(i) Let

V, V_1 , V_2

V_3

denote four vertices of a cube such that

V_1 , V_2 , V_3

are adjacent to

V.

Project the cube orthogonally on a plane of which the points are marked with complex numbers. Let the projection of

V

fall in the origin and the projections of

V_1 , V_2 , V_3

in points marked with the complex numbers

z_1 , z_2 , z_3

, respectively. Show that

z_{1}^{2} +z_{2}^{2} +z_{3}^{2}=0.

(a_{ij})

be a matrix such that

|a_{ii}| > |a_{i1}| + |a_{i2}|+\ldots +|a_{i i-1}|+ |a_{i i+1}| +\ldots +|a_{in}|

i.

Show that the determinant is not equal to

0.

1

Putnam 1948 B5

(a,b)

|a+bt+ t^2 |\leq 1

0\leq t \leq 1

fill a certain region in the plane. What is the area of this region?

1

Putnam 1948 B4

\lambda

does the equation

\int_{0}^{1} \min(x,y) f(y)\; dy =\lambda f(x)

have continuous solutions which do not vanish identically in

(0,1)?

What are these solutions?

1

Putnam 1948 B2

A circle moves so that it is continually in the contact with all three coordinate planes of an ordinary rectangular system. Find the locus of the center of the circle.

1

Putnam 1948 B1

f(x)

be a cubic polynomial with roots

x_1 , x_2

x_3.

f(2x)

is divisible by

f'(x)

and compute the ratio

x_1 : x_2: x_3 .

1

Putnam 1948 A6

Answer either (i) or (ii):
(i) A force acts on the element

ds

of a closed plane curve. The magnitude of this force is

r^{-1} ds

r

is the radius of curvature at the point considered, and the direction of the force is perpendicular to the curve, it points to the convex side. Show that the system of such forces acting on all elements of the curve keep it in equilibrium.
(ii) Show that

x+ \frac{2}{3}x^{3}+ \frac{2\cdot 4}{3\cdot 5} x^5 +\frac{2\cdot 4\cdot 6}{3\cdot 5\cdot 7} x^7 + \ldots= \frac{ \arcsin x}{\sqrt{1-x^{2}}}.

1

Putnam 1948 A5

\xi_1,\ldots,\xi_n

n

-th roots of unity, evaluate

\prod_{1\leq i<j \leq n} (\xi_{i}-\xi_j )^2 .

1

Putnam 1948 A4

D

be a plane region bounded by a circle of radius

r.

(x,y)

D

and consider a circle of radius

\delta

(x,y).

l(x,y)

the length of that arc of the circle which is outside

D.

\lim_{\delta \to 0} \frac{1}{\delta^{2}} \int_{D} l(x,y)\; dx\; dy.

1

Putnam 1948 A3

(a_n)

be a decreasing sequence of positive numbers with limit

0

b_n = a_n -2 a_{n+1}+a_{n+2} \geq 0

n.

\sum_{n=1}^{\infty} n b_n =a_1.

1

Putmam 1948 A2

Two spheres in contact have a common tangent cone. These three surfaces divide the space into various parts, only one of which is bounded by all three surfaces, it is "ring-shaped." Being given the radii of the spheres,

r

R

, find the volume of the "ring-shaped" part. (The desired expression is a rational function of

r

R.

1

Putnam 1948 A1

What is the maximum of

|z^3 -z+2|

z

is a complex number with

|z|=1?

1

[\sqrt{n}+\sqrt{n+1}]=[\sqrt{4n+1}] , floor function identity

[\sqrt{n}+\sqrt{n+1}]=[\sqrt{4n+1}]

n \in N