A number is said to be a divisor of 33 if that number completely divides 33 without a remainder. In this section, we will discuss about divisors of 33.
Table of Contents
Highlights of Divisors of 33
- Divisors of 33: 1, 3, 11 and 33
- Negative divisors of 33: -1, -3, -11 and -33
- Prime divisors of 33: 3 and 11
- Number of divisors of 33: 4
- Sum of divisors of 33: 48
- Product of divisors of 33: 332
What are Divisors of 33
A number n is a divisor of 33 if $\dfrac{33}{n}$ is an integer. Note that if 33/n=m is an integer, then both m and n will be the divisors of 33.
To find the divisors of 33, we need to find the numbers n such that 33/n becomes an integer. We have:
33/1=33 | 1, 33 are divisors of 33. |
33/3=11 | 3, 11 are divisors of 33 |
No numbers other than 1, 3, 11, and 33 can divide 33. So we conclude that
The divisors of 33 are: 1, 3, 11, and 33. |
Thus, the total number of divisors of 33 is four.
Negative Divisors of 33
We know that if m is a divisor of a number, then -m is also a divisor of that number.
As the divisors of 33 are 1, 3, 11, and 33, we can say that:
The negative divisors of 33 are -1, -3, -11, and –33.
Prime Divisors of 33
The divisors of 33 are 1, 3, 11, and 33. Among these numbers, only 3 and 11 are prime numbers. So we obtain that:
The prime divisors of 33 are 3 and 11.
Sum, Product, Number of Divisors of 33
The prime factorization of 33 is given below.
33 = 31 ×111
(i) By the number of divisors formula, we have that the number of divisors of 33 is
=(1+1)(1+1)=2×2=4.
(ii) By the sum of divisors formula, we have that the sum of the divisors of 33 is
$=\dfrac{3^2-1}{3-1} \times \dfrac{11^2-1}{11-1}$
$=\dfrac{9-1}{2} \times \dfrac{121-1}{10}$
$=4 \times 12=48$
(iii) By the product of divisors formula, we have that the product of the divisors of 33 is
=33(Number of divisors of 33)/2
=334/2
=332
Related Topics:
FAQs on Divisors of 33
Answer: The divisors of 33 are 1, 3, 11, and 33.
Answer: The prime divisors of 33 are 3 and 11.
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