Find the number of positive integers ≤ 1000 that are multiples of at least one of...

Find the number of positive integers not exceeding 10,000 that are not divisible by 3, 4,...

Find the number of positive integers not exceeding 10,000 that are not divisible by 3, 4, 7, or 11.

Can 1000 be expressed as the sum of two positive integers, one of which is divisble...

Can 1000 be expressed as the sum of two positive integers, one of which is divisble by 11 and the other by 17? If yes, then in how many ways?

How many integers from 1 through 1,000 are multiples of 5 or multiples of 7? (b)...

How many integers from 1 through 1,000 are multiples of 5 or multiples of 7? (b) Suppose an integer from 1 through 1,000 is chosen at random. Use the result of part (a) to find the probability that the integer is a multiple of 5 or a multiple of 7. (Round to the nearest tenth of a percent.) (c) How many integers from 1 through 1,000 are neither multiples of 5 nor multiples of 7?

How many integers from 1 through 1,000 are multiples of 5 or multiples of 9? (b)...

How many integers from 1 through 1,000 are multiples of 5 or multiples of 9? (b) Suppose an integer from 1 through 1,000 is chosen at random. Use the result of part (a) to find the probability that the integer is a multiple of 5 or a multiple of 9. (Round to the nearest tenth of a percent.) (c) How many integers from 1 through 1,000 are neither multiples of 5 nor multiples of 9?

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)?

(a) If a and b are positive integers, then show that gcd(a, b) ≤ a and...

(a) If a and b are positive integers, then show that gcd(a, b) ≤ a and gcd(a, b) ≤ b. (b) If a and b are positive integers, then show that a and b are multiples of gcd(a, b).

Using inclusion-exclusion, find the number of integers in{1,2,3,4, ...,1000} that are not divisible by 15, 35...

Using inclusion-exclusion, find the number of integers in{1,2,3,4, ...,1000} that are not divisible by 15, 35 or 21.

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...

. How many integers from 1 to 2000 are multiples of 2, 3 or 7? Here...

. How many integers from 1 to 2000 are multiples of 2, 3 or 7? Here 2, 4, 6,...,2000 are multiples of 2; and 3, 6, 9 .... are multiples of 3

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

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