Let us introduce the notation – we denote the product of all natural numbers from 1 to \(n\) by \(n!\). For example, \(5!=1\times2\times3\times4\times5=120\).
a) Prove that the product of any three consecutive natural numbers is divisible by \(3!=6\).
b) What about the product of any four consecutive natural numbers? Is it always divisible by 4!=24?
Solve the rebus: \(AX \times UX = 2001\).
The product of two natural numbers, each of which is not divisible by 10, is equal to 1000. Find the sum of these two numbers.
For what natural numbers \(a\) and \(b\) is the number \(\log_{a} b\) rational?
In a row there are 20 different natural numbers. The product of every two of them standing next to one another is the square of a natural number. The first number is 42. Prove that at least one of the numbers is greater than 16,000.
The product of 1986 natural numbers has exactly 1985 different prime factors. Prove that either one of these natural numbers, or the product of several of them, is the square of a natural number.
The product of a group of 48 natural numbers has exactly 10 prime factors. Prove that the product of some four of the numbers in the group will always give a square number.
Try to get one billion \(1000000000\) by multiplying two whole numbers, in each of which there cannot be a single zero.