Recently posted problems (14 days):
Show Digest for last:
2 Days |
3 Days |
5 Days |
1 Week |
2 Weeks
This is a base 8 multiplication. A well known French name is the key.
L O T I
R A V I
-----------
* * * * T
L * * * *
* * * * I
O * * * *
-----------------
L * * * E * O T
Find the inverse function f(x)=x+[x].
Solve the equation
16x3=(11x2+x-1)√(x2-x+1)
Find six distinct positive integers A, B, C, D, E, F, G satisfying: A3 + B3 = C3 + D3 = E3 + F3 = 19G3.
Please submit primitive solutions only, that is, A, B, C, D, E, F, G should not have a common factor.
Out of 26 ABC’s letters I have erased 15, leaving only those: a,e,i,j,k,o,q,u,v,x,y.
What were my criteria?
Consider the sum 1^99 + 2^99 + 3^99 + ... + 99^99.
Finding the last digit of this sum was the task of an old problem Last Digit. With a clever setup finding the last two digits was just as easy.
So I present a higher challenge: find the last four digits. No computer programs!
A bag contains an unknown number of red balls and yellow balls. When N balls are drawn at random (without replacement) the probability that they are all yellow is 1/2. The number of balls in the bag is the minimum for this to happen.
If the first N balls were all yellow, what is the probability that the next ball drawn is red? Express the probability as a function of N.
Solve the floor equation:
[x]3 + 2x2 = x3 + 2[x]2
If N is a nonnegative integer, the triangular number T(N)=1+2+3+...+N is given by N(N+1)/2.
Find a prime P such that the sum of the divisors of T(P) is a cube.
****The divisors of a positive integer N includes 1 and N.
For which digits d, is it possible to add d to every digit of a square and get another square?
For example, adding 3 to each digit of 16 gives 49.However, adding zero to each digit in this manner is NOT permissible. For which digits d are there infinitely many such squares?
*** Digit sums greater than 9 are not allowed. For example, you could not add 8 to the digits of 81 to get 169.
Let ABCDE be a convex pentagon such that AB = BC = CD and angle BDE =
angle EAC = 30. Find the possible values of angle BEC.
Let A and B be two different squares of positive integers, A < B, such that the set of base ten digits of A is the same as the set of base ten digits of B.
Find the smallest and largest value of A+B, such that A+B consists of 10 distinct digits.
Each of x, y and z is a positive integer with gcd(x,y,z)=1
Determine all possible pairs (x,y,z) satisfying this equation:
x3+y3=7z3
where x+y+z < 10^10
THESE FIFTY HAPPY GIGAS
The 4x5 matrix above has a certain peculiar feature, which allows you to perform a certain card trick.
Although it serves ok as a mnemonic for this trick, it is not a nicely structured sentence, like "NEVER TRUST BLIND DATES" (better, but misses the needed feature).
I ask you to find the essential feature, and then to suggest a nice mnemonic, logically making sense.
Find the number of trapeziums that it can be formed with the vertices of a regular polygon.
Real constants a, b, c are such that there is exactly one square all of whose vertices lie on the cubic curve y = x3 + ax2 + bx + c. Prove that the square has sides of length 721/4.
The digital product P(N) of an integer N is the product of its decimal digits. So P(128)=16.
Determine all sets of distinct positive integers A and B such that A = P(B)P(C) and B = P(A)P(C) for some integer C.
For each pair, A and B, give the lowest possible value for C.
How many non-negative integers are there with non-repeating digits?
To avoid ambiguity:
Smallest number: 0
Biggest: 9876543210
f(a,b) is defined by the following table:
f(2,3)=10,
f(3,7)=28,
f(4,5)=33,
f(5,8)=61,
f(6,7)=73,
f(7,8)= ???
Fill in the last value of f(a,b), and derive its formula.
What is the smallest positive integer N such that N+123456 and N+12345678 are both palindromic?
For example, the smallest whole number such that N+1234 and N+123456 are both palindromic is N=975445, since:975445+1234=976679 and 975445+123456=1098901.
A right circular cone has base of radius 1 and height 3. A cube is inscribed in the cone
so that one face of the cube is contained in the base of the cone.
What is the side's length of
the cube?
Source: Putnam 1998
For how many natural numbers n<452 are there coprime natural numbers a and b such that 45-√n is the root of the equation x2-ax+b=0?
Choose randomly 3 points on a circumference of a circle.
What is the probability that the center of the circle lies within the triangle ABC?
Source: Simplified from a 3-dimensional problem on a Putnam exam.
Find positive integers X, Y and N satifying the Pell equation X² - N*Y² = 1 such that such that the concatenation of X, Y and N contains exactly two of each digit 0 to 9.
Find the smallest distinct whole numbers, M and N such that you can rearrange the digits of M to get N, and you can rearrange the digits of M 7 to get N 7, and where neither M nor M 7 contains a 0.
KR died about 4 years ago.
He would be 85 today.
KENNY+ROGERS=CHOSEN
I miss him.
Derive an algorithm to calculate the total number of zeros in the decimal expansion of 2024 2024.
Prove that there exists no quadratic polynomials f, g, h, such that the equation f(g(h(x)))=0 has the solutions 1, 2, 3, 4, 5, 6, 7, 8.
HERE+THERE= each 5-letter word from the list below
Malta, Porto, London, Rouen, Miami, movies, races, sales each of the above can easily replace the sum defining my whereabouts thus creating a puzzle with a unique answer.
Please expand the list, using valid words providing a unique solution
Find the smallest distinct whole numbers, M and N such that you can rearrange the digits of M to get N, and you can rearrange the digits of M6 to get N6, and where neither M nor M6 contains a 0.
|
|
Please log in:
Forums (0)
Newest Problems
Random Problem
FAQ |
About This Site
Site Statistics
New Comments (9)
Unsolved Problems
Top Rated Problems
This month's top
Most Commented On
Chatterbox:
|