Show all factor pairs, prime factorization,
sum of factors (divisors), aliquot sum,
and prime power decomposition of -35
1) 0 < Factor Pairs ≤ -35
2) The factor pair product = -35
Number | Factor Pairs | Factor Pairs Sum |
---|---|---|
-35 | -35 x 1 | -34 |
-35 | -7 x 5 | -2 |
-35 | -5 x 7 | 2 |
-35 | -1 x 35 | 34 |
There are 4 factor pairs of -35
-35, -7, -5, -1, 1, 5, 7, 35
τ(-35) = 8
-35, -7, -5, -1, 1, 5, 7, 35
Proper factors are all factors except for the number itself
in this case -35
-35, -7, -5, -1, 1, 5, 7
No prime power decomposition exists since
there are no duplicate prime numbers in the prime factorization:
-35 + 1 + -7 + 5 + -5 + 7 + -1 + 35 = 0
This is the sum of all the factors except the number
-35 + -7 + 5 + -5 + 7 + -1 + 35 = -1