Can the number `6^(n)` , n being a positive integer end with digit 0 ? Give reasons.

Can the number 6^n , n being a natural number, end with the digit 5? Give reason.

Let an denote the number of all n-digit positive integers formed by the digits 0, 1 or both such that no consecutive digits in them are 0. Let b_n = the number of such n-digit integers ending with digit 1 and c_n = the number of such n-digit integers ending with digit 0. The value of b_6 , is

Let a_(n) denote the number of all n-digit numbers formed by the digits 0,1 or both such that no consecutive digits in them are 0. Let b_(n) be the number of such n-digit integers ending with digit 1 and let c_(n) be the number of such n-digit integers ending with digit 0. Which of the following is correct ?

Prove that 2^n gt n for all positive integers n.

Find the sum of : the first n positive integers

If n positive integers taken at random are multiplied together.

For any positive integer n, prove that n^(3) - n is divisible by 6.

An n-digit number is a positive number with exactly n digits. Nine hundred distinct n-digit numbers are to be formed using only the three digits 2, 5, and 7. The smallest value of n for which this is possible is a. 6 b. 7 c. 8 d. 9

Can two positive integers have 18 as their HCF and 380 as their LCM ? Give reasons,

Consider the numbers 4^(n) , where n is a natural number. Check whether there is any value of n for which 4^(n) ends with the digit zero.