Questions Math
What is the least positive integer that has exactly thirteen
factors?
Are you counting 1 and the number itself as factors? Do all of the factors have to be primes? Do factors that appear more than once get counteed each time? Unless these rules are clarified, many answers are possible.
answered by
drwls
16 years ago
0
0
You can ask a new question or answer this question .
Similar Questions
Top answer:
To find the least positive integer that has exactly thirteen factors, we need to understand the
Read more.
Top answer:
The property translates to the following equation: x^3-(x-1)^3-(x-2)^3-(x-3)^3=0 Expanding:
Read more.
Top answer:
A negative integer minus a negative integer will always have a positive solution.
Read more.
Top answer:
If only two numbers are involved, Let A and B be real, non-zero numbers. 1) (+)A + (+)B = (+) ? This
Read more.
Top answer:
SO WHAT'S the Correct Answer ??
Read more.
Top answer:
None of the above statements are true when you subtract integers. The sign (positive or negative) of
Read more.
Top answer:
The pairs of integer factors of -12 are: (-1, 12), (-2, 6), (-3, 4), (1, -12), (2, -6), (3, -4),
Read more.
Top answer:
To find the least positive integer with exactly 10 factors, we need to understand how factors of a
Read more.
Top answer:
To show that 4 divides 1 - n^2 whenever n is an odd positive integer, we can use the definition of
Read more.
Top answer:
To find the minimum possible value of f(75p^2), we need to determine the smallest number of distinct
Read more.