Given a integer N, with prime factorisation n1p1 * n2p2 …… The task is to check if the integer N is power-isolated or not....
A number system can be considered as a mathematical notation of numbers using a set of digits or symbols. In simpler words, the number system is a method of representing numbers. Every number system is identified with the help of its base or radix....
Given a matrix mat[][] of dimensions N * M, the task is to print the maximum number of trailing zeros that can be obtained in the product of matrix elements in the path from the top-left cell (0, 0) to the bottom-right cell (N – 1, M – 1) of the given matrix. Only possible moves from any cell (i, j) is (i + 1, j) or (i, j + 1)....
Vantieghems Theorem is a necessary and sufficient condition for a number to be prime. It states that for a natural number n to be prime, the product of where , is congruent to . In other words, a number n is prime if and only if....
Given an integer array A consisting of N integers. In one move, we can choose any index i ( 0 ≤ i ≤ N-1) and divide it either by 2 or 3(the number A[i] should be divisible by 2 or 3, respectively), the task is to find the minimum number of total moves required such that all array elements are equal. If it is not possible to make all elements equal, print -1....
Brahmagupta Fibonacci identity states that the product of two numbers each of which is a sum of 2 squares can be represented as sum of 2 squares in 2 different forms....
Given a number N, count the numbers X of length exactly N such that the number X and the sum of digits of the number X have digits A and B only in their decimal representation. The length of a number is defined as the number of digits in its decimal representation without leading zeroes....
We are given a number N. We need to check if the given number N can be represented as sum of two Great numbers. If yes then print those two great numbers else print no. Great numbers are those which are represented in the form : ((b)*(b+1)*(2*b+1))/6 where b is a natural number. Examples:...
According to Fermat’s Last Theorem, no three positive integers a, b, c satisfy the equation, for any integer value of n greater than 2. For n = 1 and n = 2, the equation have infinitely many solutions....
Given a floating-point number in the form of a string N, the task is to convert the given floating-point number into fractions....
In combinatorics, the Eulerian Number A(n, m), is the number of permutations of the numbers 1 to n in which exactly m elements are greater than previous element....