Q: What is the total or count of factors of the number 402,404,312?

 A: 32

How do I find the total factors of the number 402,404,312?

Step 1

Find the prime factorization of the number 402,404,312.

Use a factor tree to assist with solving. Take a look at our prime factorization page for additional help.

Factor Tree
402,404,312
Factor Arrows
2201,202,156
Factor Arrows
2100,601,078
Factor Arrows
250,300,539
Factor Arrows
61824,599
Factor Arrows
3832,153

The prime factorization in exponential form is: 23 x 611 x 3831 x 2,1531

Step 2

Setup the equation for determining the number of factors or divisors. The equation is:

d(n) = (a + 1)(b + 1)(c + 1)(d + 1)

Where d(n) is equal to the number of divisors of the number and a, b, etc. are equal to the exponents of the prime factorization.

Now substitute the letters in the equation with the the exponents of your prime factorization and then solve to calculate the total number of divisors.

402,404,312 = 23 x 611 x 3831 x 2,1531
Down Arrow
d(n) = (a + 1)(b + 1)(c + 1)(d + 1)
Down Arrow
d(402404312) = (3 + 1)(1 + 1)(1 + 1)(1 + 1)
Down Arrow
d(402404312) = (4)(2)(2)(2)
Down Arrow
d(402404312) = 32

More numbers for you to try

Take a look at the factors page to see the factors of 402,404,312 and how to find them.

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