Integers with absolute values less than 4 have (), integers with absolute values greater than 5.6 and less than 9.2 have ()
1: - 3, - 2, - 1,0,1,2,3
2: - 6, - 7, - 8, - 9,6,7,8,9
RELATED INFORMATIONS
- 1. Why is the sum of all negative integers whose absolute value is greater than 2.5 but less than 5.6?
- 2. Find all integers with absolute value greater than 2 and less than 6
- 3. Integers with absolute values between 2 and 5 are————————
- 4. What are the integers with absolute values between 2 and 5
- 5. The sum of integers with absolute values between 2 and 9 is
- 6. All negative integers with absolute values greater than 2 and less than 5
- 7. An integer whose absolute value is less than five
- 8. The sum of all integers whose absolute value is less than 5
- 9. What is the sum of all integers whose absolute value is less than 14.5
- 10. The sum of all integers whose absolute value is less than 14.5 is
- 11. The sum of all integers whose absolute value is less than 10 is______ .
- 12. The sum of all integers whose absolute value is not less than 2 but less than 5 is______ .
- 13. What is the sum of all integers with absolute values greater than 10 and less than 14?
- 14. The sum of all integers whose absolute value is less than 10 is______ .
- 15. The sum of all integers whose absolute value is less than 10 is______ .
- 16. Given that a is the sum of the opposite number of - 6 and the absolute value of - 10, B is the number of integers whose absolute value is not greater than 3, and C is the smallest natural number, the value of a + 2b-c is obtained? To be specific, it's better to have an absolute value
- 17. The product of all natural numbers with absolute value less than 5 is ()
- 18. The absolute value of a number is equal to its opposite number. This number will not be () A. negative integer B. negative fraction c.0 D. natural number
- 19. Let a B C be a nonzero vector w = A / (the absolute value of a) + B / (the absolute value of B) + C / (the absolute value of C), then the value range of the absolute value of W is Let a B C be a nonzero vector w = A / (absolute value of a) + B / (absolute value of B) + C / (absolute value of C) The range of absolute value of W is
- 20. The positions of rational numbers a, B and C on the number axis are shown in the figure, where the absolute value of a is equal to the absolute value of C, and the absolute value of a is divided by the absolute value of a + B Value divided by the absolute value of C + a minus the absolute value of C —————————————————————————— B A O I C