In a leap year, which month has the same number of days as in a common year? A. February B. March C. April D. May 相关知识点: 试题来源: 解析 B、C、D。除了二月在闰年和平年天数不同,三月、四月、五月等月份在闰年和平年都是相同的天数。
ISO weeks: Number of weeks according to ISO-8601 (weeks starting on Monday). The first week is the week with a Thursday in the new year (first 4-day week). Leap years: Every year that is divisible by four is a leap year, except for years that are divisible by 100, but not by ...
That’s because over a period of four hundred years we only need to remove three days. So, every 400 years the turn of the century is a leap year.可知,2000年,千禧年,是闰年。这是因为在四百多年的时间里,我们只需要移动三天。所以,每400年世纪之交就是闰年。由可知,上次闰年是2000年,每四百...
There are ___ days in a leap year. A. three hundred and sixty-six B. three hundred and sixty five C. three hundreds and sixty-six D. three hundreds and sixty five 相关知识点: 试题来源: 解析 A。本题考查数词的用法。在英语中,“三百”用“three hundred”表示,hundred 不能加 s;“...
There are ___ days in a leap year. A. three hundred and sixty-five B. three hundred and sixty-six C. three hundreds and sixty-five D. three hundreds and sixty-six 相关知识点: 试题来源: 解析 B。本题考查闰年的天数。在英语中,hundred 前有具体数字时,hundred 用单数形式,排除 C、D ...
百度试题 结果1 题目There ___ days in a leap year.A. 3B. 366C. 3(7 相关知识点: 试题来源: 解析 B. 366 闰年有366天,因此答案为B. 366。 反馈 收藏
相关知识点: 试题来源: 解析 A,In a leap year, there are 366 days. “Hundred” is not pluralized when used with a specific number. So, it should be “three hundred” not “three hundreds”. The correct answer is A.反馈 收藏
答案 B 结果二 题目 In leap year, February has days.A. twenty-eightB. twenty-nineC. thirty 答案 B相关推荐 1In leap year, February has ___ days. ( )A.twenty-eightB.twenty-nineC.thirty 2In leap year, February has days.A. twenty-eightB. twenty-nineC. thirty 反馈 收藏...
There are ___ days in a leap year. A. three hundred and sixty-six B. three hundreds and sixty-six C. three hundreds sixty-six D. three hundred sixty six 相关知识点: 试题来源: 解析 A。hundred 前面有具体数字时,hundred 不用复数形式,且百位和十位之间要用 and 连接。反馈...
In either case the result was a year of 365 days, a period incompatible with the 29 1/2-day lunation. To find some simple relationship between the two periods was the problem that faced all calendar makers from Babylonian times onward. A number of non-astronomical natural signs have also ...