MathDB

P3

Part of 2020/2021 Tournament of Towns

Problems(6)

Incenter coincides with intersection of diagonals

Source: 42nd International Tournament of Towns, Senior A-Level P3, Fall 2020

2/18/2023
Two circles α\alpha{} and β\beta{} with centers AA{} and BB{} respectively intersect at points CC{} and DD{}. The segment ABAB{} intersects α\alpha{} and β\beta{} at points KK{} and LL{} respectively. The ray DKDK intersects the circle β\beta{} for the second time at the point NN{}, and the ray DLDL intersects the circle α\alpha{} for the second time at the point MM{}. Prove that the intersection point of the diagonals of the quadrangle KLMNKLMN coincides with the incenter of the triangle ABCABC.
Konstantin Knop
geometryTournament of Towns
Bob writes numbers according to Alice's instructions

Source: 42nd International Tournament of Towns, Junior A-Level P3, Fall 2020

2/18/2023
Alice and Bob are playing the following game. Each turn Alice suggests an integer and Bob writes down either that number or the sum of that number with all previously written numbers. Is it always possible for Alice to ensure that at some moment among the written numbers there are
[*]at least a hundred copies of number 5? [*]at least a hundred copies of number 10?
Andrey Arzhantsev
gamecombinatoricsTournament of Towns
Swapping digits cancels divisibility

Source: 42nd International Tournament of Towns, Senior O-Level P3, Fall 2020

2/18/2023
A positive integer number NN{} is divisible by 2020. All its digits are different and if any two of them are swapped, the resulting number is not divisible by 2020. How many digits can such a number NN{} have?
Sergey Tokarev
number theoryDivisibilityTournament of Towns
Game with stones in a heap

Source: 42nd International Tournament of Towns, Junior O-Level P3, Fall 2020

2/18/2023
There are nn{} stones in a heap. Two players play the game by alternatively taking either 1 stone from the heap or a prime number of stones which divides the current number of stones in the heap. The player who takes the last stone wins. For which nn{} does the first player have a strategy so that he wins no matter how the other player plays?
Fedor Ivlev
combinatoricsgameTournament of Towns
Tangent circles geo

Source: 42nd International Tournament of Towns, Senior A-Level P3, Spring 2021

2/18/2023
Let MM{} be the midpoint of the side BCBC of the triangle ABCABC. The circle ω\omega passes through AA{}, touches the line BCBC at MM{}, intersects the side ABAB at the point DD{} and the side ACAC at the point EE{}. Let XX{} and YY{} be the midpoints of BEBE and CDCD respectively. Prove that the circumcircle of the triangle MXYMXY touches ω\omega.
Alexey Doledenok
geometrycirclesTournament of Towns
The angle KPC is right

Source: 42nd International Tournament of Towns, Junior A-Level P3, Spring 2021

2/18/2023
There is an equilateral triangle ABCABC. Let E,FE, F and KK be points such that EE{} lies on side ABAB, FF{} lies on the side ACAC, KK{} lies on the extension of side ABAB and AE=CF=BKAE = CF = BK. Let PP{} be the midpoint of the segment EFEF. Prove that the angle KPCKPC is right.
Vladimir Rastorguev
geometryTournament of Towns