forty-nine days is how many weeks?
what are the factors of 12?
forty books were put into eight equal stacks how many books were in each stck? how many years are in five centuries? what is the seventh mutiple of 6 then subtract 12 what is the differcecne?
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To answer the first question, you need to know that there are 7 days in a week. To find out how many weeks are in forty-nine days, divide 49 by 7:
49 days ÷ 7 days per week = 7 weeks.
Therefore, forty-nine days is equal to seven weeks.
Moving on to the second question, to find the factors of 12, you need to determine which numbers divide evenly into 12. The factors of 12 are the whole numbers that can be multiplied together to give a product of 12. In this case, the factors of 12 are:
1, 2, 3, 4, 6, and 12.
These numbers can be multiplied in various combinations to get 12: 1 x 12, 2 x 6, and 3 x 4.
In the next question, you are given forty books that were divided equally into eight stacks. To determine how many books are in each stack, you can divide the total number of books by the number of stacks:
40 books ÷ 8 stacks = 5 books per stack.
Therefore, each stack contains 5 books.
The following question asks how many years are in five centuries. A century is a period of 100 years, so to find out how many years are in five centuries, you multiply 100 by 5:
100 years (1 century) x 5 centuries = 500 years.
Therefore, there are 500 years in five centuries.
Finally, the question asks for the seventh multiple of 6, subtracting 12 to find the difference. To find the seventh multiple of 6, you multiply 6 by 7:
6 (multiple) x 7 (number) = 42.
Now, subtracting 12 from 42:
42 (multiple) - 12 = 30.
Therefore, the difference between the seventh multiple of 6 and 12 is 30.