MathDB

1

no of of paths from A to B

In the following figure, it is desired to go from point

A

to point

B

by walking only along the lines of the figure up and to the right. How many different paths can we take? https://cdn.artofproblemsolving.com/attachments/7/c/dce2e0bcb69c9e2014474ab3699b4ef0470497.png

5

1

4 roots in arithmetic progression for x^4-(3n+2)x^2+n^2=0

Determine the values that

n

can take so that the equation in

x

x^4-(3n+2)x^2+n^2=0

has four different real roots

x_1

,

x_2

,

x_3

and

x_4

in arithmetic progression. That is, they satisfy that

x_4-x_3=x_3-x_2=x_2-x_1

4

1

P (m+P(m) )= P (m) where P is product of digits

Given a positive integer

n

, we denote by

P(n)

the result of multiplying all the digits of

n

. Find a number

m

with ten digits, none of them zero, with the following property:

P\left(m+P(m)\right)= P (m)

3

1

k = sum of perfect squares

Prove that for every natural number

n>2

there exists an integer

k

that can be written as the sum of

i

positive perfect squares, for every

i

between

2

and

n

.

6

1

OB=OC wanted, 2 circumcircles, 1 midpoint, orthocenter

Let

M

be the midpoint of side

BC

of a scalene triangle

ABC

. The circle passing through

A

,

B

and

M

intersects side

AC

again at

D

. The circle passing through

A

,

C

and

M

cuts side

AB

again at

E

. Let

O

be the circumcenter of triangle

ADE

. Prove that

OB=OC

.

2

1

equal areas (LENDMF)=(ABC)

Let

L

,

M

and

N

be the midpoints on the sides

BC

,

AC

and

AB

of a triangle

ABC

. Points

D

,

E

and

F

are taken on the circle circumscribed to the triangle

LMN

so that the segments

LD

,

ME

and

NF

are diameters of said circumference. Prove that the area of the hexagon

LENDMF

is equal to half the area of the triangle

ABC

2020 Regional Olympiad of Mexico West

Subcontests

no of of paths from A to B

4 roots in arithmetic progression for x^4-(3n+2)x^2+n^2=0

P (m+P(m) )= P (m) where P is product of digits

k = sum of perfect squares

OB=OC wanted, 2 circumcircles, 1 midpoint, orthocenter

equal areas (LENDMF)=(ABC)