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?