题目:
对于正实数x和y,定义x*y=| x·y |
| x+y |
答案
D解:∵x*y=
| x·y |
| x+y |
| y·x |
| y+x |
| x·y |
| x+y |
∴x*y=y*x,故*符合交换律;
∵x*y*z=
| x·y |
| x+y |
| ||
|
| xyz |
| xy+xz+yz |
x*(y*z)=x*(
| yz |
| y+z |
x·
| ||
x+
|
| xyz |
| xy+xz+yz |
∴x*y*z=x*(y*z),*故满足结合律.
∴“*”既符合交换律,也符合结合律.
故选D.
| x·y |
| x+y |
| x·y |
| x+y |
| y·x |
| y+x |
| x·y |
| x+y |
| x·y |
| x+y |
| ||
|
| xyz |
| xy+xz+yz |
| yz |
| y+z |
x·
| ||
x+
|
| xyz |
| xy+xz+yz |
