MathDB

1

no of paths in a triangular grid

A

to

B

on the picture that go along gridlines only, do not pass through any point twice, and never go upwards? https://cdn.artofproblemsolving.com/attachments/0/2/87868e24a48a2e130fb5039daeb85af42f4b9d.png

5

1

centers of 4 circles are vertices of a rectangle

Let

C_1

and

C_2

be two tangent unit circles inside a circle

C

of radius

2

. Circle

C_3

inside

C

is tangent to the circles

C,C_1,C_2

, and circle

C_4

inside

C

is tangent to

C,C_1,C_3

. Prove that the centers of

C,C_1,C_3

and

C_4

are vertices of a rectangle.

4

1

smallest n so that r =\overline{a_1a_0a_m ..._20} = 2n, in decimal

Find the smallest possible natural number

n = \overline{a_m ...a_2a_1a_0}

(in decimal system) such that the number

r = \overline{a_1a_0a_m ..._20}

equals

2n

.

3

1

1989-digit natural number such that product of its digits = their sum and ...

Prove that there is no

1989

-digit natural number at least three of whose digits are equal to

5

and such that the product of its digits equals their sum.

2

1

a|b^2, b^2|a^3, a^3|b^4, b^4|a^5$, but a^5 does not divide b^6

Find two positive integers

a,b

such that

a | b^2, b^2 | a^3, a^3 | b^4, b^4 | a^5

, but

a^5

does not divide

b^6

1

perpendicular medians in a triangle with given third side and area

In a triangle

ABC

the area is

18

, the length

AB

is

5

, and the medians from

A

and

B

are orthogonal. Find the lengths of the sides

BC,AC

.

1989 Mexico National Olympiad

Subcontests

no of paths in a triangular grid

centers of 4 circles are vertices of a rectangle

smallest n so that r =\overline{a_1a_0a_m ..._20} = 2n, in decimal

1989-digit natural number such that product of its digits = their sum and ...

a|b^2, b^2|a^3, a^3|b^4, b^4|a^5$, but a^5 does not divide b^6

perpendicular medians in a triangle with given third side and area