Let n be 4-digit integer in which all the digits are different. If x is the number of odd integers and y is the number of even integers, then

Total number of 6-digit numbers in which all the odd digit appear is

Find the number of integers between 1 and 1000 having the sum of the digits 18.

If log2=0.301, the number of integers in the expansion of 4^(17) is

For some integer n every odd integer is of the form

Let n 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

The total number 9- digit number Which have all different digits is :

If the sum of m consecutive odd integers is m^(4) , then the first integer 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 ?

Let f: I rarr I be defined by f(x) = x + k where k is a fixed integer and I is the set of all integers then f is

Show that the square of any odd integer is of the form 4q +1 for any integer q.