MathDB

1

a circumscribed pyramid from Russian for 11graders

ABCDS

is given. The opposite sidelines of its base meet at points

P

and

Q

in such a way that

A

and

B

lie on segments

PD

and

PC

respectively. The inscribed sphere touches faces

ABS

and

BCS

at points

K

and

L

. Prove that if

PK

and

QL

are complanar then the touching point of the sphere with the base lies on

BD

.

23

1

A,B,C,D, triharmonic quadruple of points i.e. AB x CD = AC x BD= AD x BC

Let

A, B, C

and

D

be a triharmonic quadruple of points, i.e

AB\cdot CD = AC \cdot BD = AD \cdot BC.

Let

A_1

be a point distinct from

A

such that the quadruple

A_1, B, C

and

D

is triharmonic. Points

B_1, C_1

and

D_1

are defined similarly. Prove that a)

A, B, C_1, D_1

are concyclic; b) the quadruple

A_1, B_1, C_1, D_1

is triharmonic.

22

1

convex polyhedron with diagonals and each of diagonal shorter than edge ?

Does there exist a convex polyhedron such that it has diagonals and each of them is shorter than each of its edges?

20

1

if 4 circumcircles ae concurrent, then other 4 circumcircles ae concurrent

A quadrilateral

KLMN

is given. A circle with center

O

meets its side

KL

at points

A

and

A_1

, side

LM

at points

B

and

B_1

, etc. Prove that if the circumcircles of triangles

KDA, LAB, MBC

and

NCD

concur at point

P

, then a) the circumcircles of triangles

KD_1A_1, LA_1B_1, MB_1C_1

and

NC1D1

also concur at some point

Q

; b) point

O

lies on the perpendicular bisector to

PQ

.

18

1

2 intersection points of tangents and incenter of ABCD are collinear

Let

I

be the incenter of a circumscribed quadrilateral

ABCD

. The tangents to circle

AIC

at points

A, C

meet at point

X

. The tangents to circle

BID

at points

B, D

meet at point

Y

. Prove that

X, I, Y

are collinear.

17

1

center of circles construction only by ruler

Let

AC

be the hypothenuse of a right-angled triangle

ABC

. The bisector

BD

is given, and the midpoints

E

and

F

of the arcs

BD

of the circumcircles of triangles

ADB

and

CDB

respectively are marked (the circles are erased). Construct the centers of these circles using only a ruler.

16

1

collinear midpoints

Given a triangle

ABC

and an arbitrary point

D

.The lines passing through

D

and perpendicular to segments

DA, DB, DC

meet lines

BC, AC, AB

at points

A_1, B_1, C_1

respectively. Prove that the midpoints of segments

AA_1, BB_1, CC_1

are collinear.

15

1

A altitude, B bisector, and C median are concurrent, lengths comparison

Let

ABC

be a non-isosceles triangle. The altitude from

A

, the bisector from

B

and the median from

C

concur at point

K

. a) Which of the sidelengths of the triangle is medial (intermediate in length)? b) Which of the lengths of segments

AK, BK, CK

is medial (intermediate in length)?

14

1

ina given disc, construct a subset such that area's conditions are statisfied

In a given disc, construct a subset such that its area equals the half of the disc area and its intersection with its reflection over an arbitrary diameter has the area equal to the quarter of the disc area.

13

1

prove that the circumcenter of a triangle moves along a straight line

Let

AC

be a fixed chord of a circle

\omega

with center

O

. Point

B

moves along the arc

AC

. A fixed point

P

lies on

AC

. The line passing through

P

and parallel to

AO

meets

BA

at point

A_1

, the line passing through

P

and parallel to

CO

meets

BC

at point

C_1

. Prove that the circumcenter of triangle

A_1BC_1

moves along a straight line.

12

1

prove that L_1 and L_2 are equidistant from line AB

Circles

\omega_1

and

\omega_2

meet at points

A

and

B

. Let points

K_1

and

K_2

of

\omega_1

and

\omega_2

respectively be such that

K_1A

touches

\omega_2

, and

K_2A

touches

\omega_1

. The circumcircle of triangle

K_1BK_2

meets lines

AK_1

and

AK_2

for the second time at points

L_1

and

L_2

respectively. Prove that

L_1

and

L_2

are equidistant from line

AB

.

11

1

Parallel lines inside a square

Points

K, L, M

and

N

lying on the sides

AB, BC, CD

and

DA

of a square

ABCD

are vertices of another square. Lines

DK

and

N M

meet at point

E

, and lines

KC

and

LM

meet at point

F

. Prove that

EF\parallel AB

.

10

1

Externally Tangent Circles in an Angle Part II

Two disjoint circles

\omega_1

and

\omega_2

are inscribed into an angle. Consider all pairs of parallel lines

l_1

and

l_2

such that

l_1

touches

\omega_1

and

l_2

touches

\omega_2

(

\omega_1

,

\omega_2

lie between

l_1

and

l_2

). Prove that the medial lines of all trapezoids formed by

l_1

and

l_2

and the sides of the angle touch some fixed circle.

9

1

Externally Tangent Circles in an Angle Part I

Two circles

\omega_1

and

\omega_2

touching externally at point

L

are inscribed into angle

BAC

. Circle

\omega_1

touches ray

AB

at point

E

, and circle

\omega_2

touches ray

AC

at point

M

. Line

EL

meets

\omega_2

for the second time at point

Q

. Prove that

MQ\parallel AL

4

4

4

4

4

4

4

2014 Sharygin Geometry Olympiad

Subcontests

a circumscribed pyramid from Russian for 11graders

A,B,C,D, triharmonic quadruple of points i.e. AB x CD = AC x BD= AD x BC

convex polyhedron with diagonals and each of diagonal shorter than edge ?

if 4 circumcircles ae concurrent, then other 4 circumcircles ae concurrent

2 intersection points of tangents and incenter of ABCD are collinear

center of circles construction only by ruler

collinear midpoints

A altitude, B bisector, and C median are concurrent, lengths comparison

ina given disc, construct a subset such that area's conditions are statisfied

prove that the circumcenter of a triangle moves along a straight line

prove that L_1 and L_2 are equidistant from line AB

Parallel lines inside a square

Externally Tangent Circles in an Angle Part II

Externally Tangent Circles in an Angle Part I