I have 5 real numbers whose product is non-zero. Now, I increase each of the 5 numbers by 1 and again multiply all of them. Is it possible that this new product is the same as the non-zero number obtained earlier?
(Explain your answer may be with an example)
Yes
example: -0.2, -0.3, -0.5, -07, -0.8, each increased by 1, we get 0.2, 0.3, 0.5, 0.7 & 0.8 by multiplying all 5 we get same number, positive this time
A four digit positive number having all non-zero distinct digits is such that the product of all the digits is least. If the difference of hundreds digit and tens digit is 1. How many possibilities are there of such number?
If the product of 3 consecutive numbers is divided by each of them in turn, the sum of the 3 quotients will be 74. What are the numbers?
