If there are four numbers a, B, C and D, the least common multiple of a and B is 120, and the least common multiple of C and D is 160 most urgent
The least common multiple of 480, 120 and 160 is 480
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- 1. On the number axis, the integer whose distance from the origin is less than 2 is X. the number of integer points not greater than 3 is y. The number of integer points equal to 4 is e. find the value of X + y + E
- 2. There are four numbers a, B, C and D. It is known that the least common multiple of a and B is 120, and the least common multiple of C and D is 160. What is the least common multiple of these four numbers?
- 3. On the number axis, the number of integer points whose distance from the origin is less than 2 is a, the number of integers whose distance from the origin is not more than 2 is B, and the number of integers whose distance from the origin is equal to 3 is C. find the value of a + B + C Please explain
- 4. There are four numbers a, B, C and D. the least common multiple of AB is 120 and the least common multiple of CD is 160?
- 5. On the number axis, the number of integer points whose distance from the origin is less than 2, the number of positive integer points which are not more than 2 is y, and the number of integer points which are equal to 2 is Z. find the value of X + y + Z
- 6. The greatest common factor and the least common multiple of 26 and 97
- 7. The distance from the number axis to the origin is less than 100 and represents the value of integers. The product of their corresponding numbers is
- 8. The least common multiple and the greatest common factor of 87 and 38, 44 and 28
- 9. When X -- the square root of 2X-4 denotes the arithmetic square root of 2X-4
- 10. How to calculate 321-198 simply The first one,
- 11. The number of integer points whose distance from the number axis to the origin is less than 2 is x, the number of integer points whose distance is not more than 2 is y, and the number of integer points whose distance is equal to 2 is Z. find the value of X + y + Z
- 12. There are four numbers ABCD, 120 when the least common multiple of a and B is known, 160 when the least common multiple of C and D is known?
- 13. Given that the number of integer points whose distance from the origin is less than 2 on the number axis is x, the number of integer points whose distance from the origin is not more than 2 is y, and the number of integer points whose distance from the origin is equal to 2 is Z, find x + y+ There must be a process, preferably a detailed explanation It's "leaving the origin." I wrote 8. The teacher said it was wrong
- 14. There are four numbers ABCD. Given that the least common multiple of a and B is 120, and that of C and D is 160, what is the least common multiple of these four numbers?
- 15. How many integer points on the number axis whose distance from the origin is less than 2?
- 16. What is the least common multiple of 36
- 17. On the number axis, what is the number whose distance from the origin is equal to 3?
- 18. 24 may be the least common multiple of which two numbers? How many groups can you find out?
- 19. The distance between the number axis and the circle point is 2. There are () points of unit length. The numbers they represent are
- 20. 36 may be the least common multiple of which two numbers. How many groups are there?