One set of numbers consists of consecutive integers and the least number is 3.How many numbers are there in the set (1)The average of all the numbers in the set is 6; (2)The number of integers is one more than the range of the set.
A: 条件(1)充分,但条件(2)不充分.
B: 条件(2)充分,但条件(1)不充分.
C: 条件(1)和(2)单独都不充分,但条件(1)和条件(2)联合起来充分.
D: 条件(1)充分,条件(2)也充分.
E: (E) 条件(1)和条件(2)单独都不充分,条件(1)和条件(2)联合起来也不充分.
A: 条件(1)充分,但条件(2)不充分.
B: 条件(2)充分,但条件(1)不充分.
C: 条件(1)和(2)单独都不充分,但条件(1)和条件(2)联合起来充分.
D: 条件(1)充分,条件(2)也充分.
E: (E) 条件(1)和条件(2)单独都不充分,条件(1)和条件(2)联合起来也不充分.
举一反三
- If S is an infinite set of real numbers, is there a number in S that is less than every other number in S ?() (1)Every number in S is an integer. (2)Every number in S is positive. A: 条件(1)充分,但条件(2)不充分. B: 条件(2)充分,但条件(1)不充分. C: 条件(1)和(2)单独都不充分,但条件(1)和条件(2)联合起来充分. D: 条件(1)充分,条件(2)也充分. E: 条件(1)和条件(2)单独都不充分,条件(1)和条件(2)联合起来也不充分.
- A:条件(1)充分,但条件(2)不充分. B:条件(2)充分,但条件(1)不充分. C:条件(1)和(2)单独都不充分,但条件(1)和条件(2)联合起来充分. D:条件(1)充分,条件(2)也充分. E:条件(1)和条件(2)单独都不充分,条件(1)和条件(2)联合起来也不充分. 已知{an
- A:条件(1)充分,但条件(2)不充分. B:条件(2)充分,但条件(1)不充分. C:条件(1)和(2)单独都不充分,但条件(1)和条件(2)联合起来充分. D:条件(1)充分,条件(2)也充分. E:条件(1)和条件(2)单独都不充分,条件(1)和条件(2)联合起来也不充分. 数列{an
- If P is a set of integers and 3 is in P, is every positive multiple of 3 in P ?() (1)If x is in P,then x+3 is in P. (2)If x is in p, then x-3 is in p. A: 条件(1)充分,但条件(2)不充分. B: 条件(2)充分,但条件(1)不充分. C: 条件(1)和(2)单独都不充分,但条件(1)和条件(2)联合起来充分. D: 条件(1)充分,条件(2)也充分. E: 条件(1)和条件(2)单独都不充分,条件(1)和条件(2)联合起来也不充分.
- S is a set of integers such that i) if a is in S. then -a is in S, and ii) if each of n and b is in S, then ab is in S. Is -4 in S ?() (1)1 is in S. (2)2 is in S. A: 条件(1)充分,但条件(2)不充分. B: 条件(2)充分,但条件(1)不充分. C: 条件(1)和(2)单独都不充分,但条件(1)和条件(2)联合起来充分. D: 条件(1)充分,条件(2)也充分. E: 条件(1)和条件(2)单独都不充分,条件(1)和条件(2)联合起来也不充分.