How many positive integers less than 50 are not divisible by 2, 3 or 5? [8]...

how many different positive integers less than 5,000 are not divisible by 10,14, or 15

how many different positive integers less than 5,000 are not divisible by 10,14, or 15

How many positive integers less than 10000 are there which contain at least one 3 or...

How many positive integers less than 10000 are there which contain at least one 3 or at least one 8 (or both)?

How many of the integers 1,2,....,2000 are not divisible by any of the numbers 2, 3...

How many of the integers 1,2,....,2000 are not divisible by any of the numbers 2, 3 or 11?

how many positive integers less than 1000 have no repeated digits?

how many positive integers less than 1000 have no repeated digits?

How many of the integers from 1 to 200 are divisible by 3,4 or 5?

How many of the integers from 1 to 200 are divisible by 3,4 or 5?

Complete the table of the orders (modulo 9) of each of the positive integers less than...

Complete the table of the orders (modulo 9) of each of the positive integers less than 9 and relatively prime to 9. Integer 1 2 4 5 7 8 Order modulo 9 Please show work.

a) How many of the integers from 1 to 1000 are divisible by at least one...

a) How many of the integers from 1 to 1000 are divisible by at least one of 3, 5, and 7? b)(When the expression (A+ a)(B + b)(C + c)(D + d)(E + e) is multiplied out, how many terms will have three uppercase letters? c) How many ways are there to pick a combination of k things from {1, 2,...,n} if the elements 1 and 2 cannot both be picked? d) 2 How many ways are there to put...

If d is a positive integer, how many integers must we divide by d to guarantee...

If d is a positive integer, how many integers must we divide by d to guarantee that two of them leave the same remainder? Explain your answer.

Let A be the set of all natural numbers less than 100. How many subsets with...

Let A be the set of all natural numbers less than 100. How many subsets with three elements does set A have such that the sum of the elements in the subset must be divisible by 3?

How many numbers are there from 1 to 1050 which are not divisible by the digits...

How many numbers are there from 1 to 1050 which are not divisible by the digits 3, 5, and 7?