Final answer:
To find the number of positive integers less than or equal to 1000 that are not divisible by 3, 8, and 25, we can use the principle of inclusion-exclusion. The answer is 789.
Step-by-step explanation:
To find the number of positive integers less than or equal to 1000 that are not divisible by 3, 8, and 25, we can use the principle of inclusion-exclusion.
Step 1: Find the number of positive integers divisible by 3, 8, or 25.
- Divisible by 3: There are 1000/3 = 333 positive integers divisible by 3.
- Divisible by 8: There are 1000/8 = 125 positive integers divisible by 8.
- Divisible by 25: There are 1000/25 = 40 positive integers divisible by 25.
Step 2: Find the number of positive integers divisible by both 3 and 8, both 3 and 25, and both 8 and 25.
- Divisible by both 3 and 8: There are 1000/(3*8) = 41 positive integers divisible by both 3 and 8.
- Divisible by both 3 and 25: There are 1000/(3*25) = 13 positive integers divisible by both 3 and 25.
- Divisible by both 8 and 25: There are 1000/(8*25) = 5 positive integers divisible by both 8 and 25.
Step 3: Find the number of positive integers divisible by 3, 8, and 25.
- Divisible by 3, 8, and 25: There is 1000/(3*8*25) = 1 positive integer divisible by 3, 8, and 25.
Step 4: Apply the principle of inclusion-exclusion to find the number of positive integers divisible by none of 3, 8, and 25.
Number of positive integers divisible by none of 3, 8, and 25 = 1000 - (333 + 125 + 40 - 41 - 13 - 5 + 1)
= 789.