Factors of 35 are 1, 5, 7, 35. Including 1 and 35 itself, there are 4 distinct factors for 35.

The prime factors of 35 are 5, 7, and its factor pairs are (1, 35), (5, 7). We've put this below in a table for easy sharing.

Factors of 35
Factors of 35: 1, 5, 7, 35
Prime Factors of 35: 5, 7
Factor Pairs of 35: (1, 35), (5, 7)

How to calculate factors?

To be a factor of 35, a number must divide 35 exactly, leaving no remainder. In other words, when 35 is divided by this number, the quotient is a whole number. These factors, also known as divisors, define the structure of 35 and are key in understanding its mathematical properties.

Below, we outline how to calculate the factorization of 35 using four methods: basic factorization, prime factorization, the division method, or using GCD and LCM. We also include a detailed analysis of factor pairs and a factor tree to illustrate the breakdown.

Method 1: Basic Factorization

Basic Factorization is a method to find the factors of a number by systematically testing each whole number from 2 up to the number itself to see which ones divides with zero remainder (evenly). The process is somewhat time consuming if a number is high, that's why you should master divisibility rules, to make the process faster.

Here's the breakdown for 35:

DivisorIs it a factor of 35?Verification
1Yes, 1 is a factor of every number.1 × 35 = 35
2No, 35 is not an even number so it's not divisible by 2.-
3No, the sum of its digits (8) is not divisible by 3.-
4No, the last two digits (35) do not form a number divisible by 4.-
5Yes, 35 ends with 0 or 5, so it's divisible by 5.5 × 7 = 35
6No, 35 is not divisible by both 2 and 3.-
7Yes, 35 divided by 7 equals 5 with no remainder.7 × 5 = 35
8No, the last three digits (35) do not form a number divisible by 8.-
9No, the sum of its digits (8) is not divisible by 9.-
10No, last digit is 5, so not divisible by 10.-
11No, the difference between sums of alternating digits (2) is not divisible by 11.-
12No, 35 is not divisible by both 3 and 4.-
...continue with all the other numbers.

Method 2: Prime Factorization

Prime numbers are natural numbers greater than 1 that have no positive divisors other than 1 and themselves. This means a prime number cannot be formed by multiplying two smaller natural numbers. For example:

  • 2 is a prime number because its only divisors are 1 and 2.
  • 3 is prime for the same reason—it can only be divided evenly by 1 and 3.
  • 4 is not prime because it can be divided by 1, 2, and 4.
  • 5, 7, 11, and 13 are also prime numbers.

Prime numbers are fundamental in mathematics because they are the "building blocks" of whole numbers. Any natural number greater than 1 can be expressed as a product of prime numbers, which is known as its prime factorization.

How to do prime factorization of 35

You start by dividing 35 to each prime number, multiple times, until the remainder is 0. Then you move on to the next prime number. To save time, you should test with up to \( \sqrt35 \)

The prime factors of 35 are 5, 7.
Prime NumberIs it a factor of 35?Verification
2No, 35 is not divisible by 2.-
3No, 35 is not divisible by 3.-
5Yes, 35 is divisible by 5.35 ÷ 5 = 7, R0
5No, the result 7 is not divisible by 5.-
77 is a prime number.7 is prime.

Method 3: Division Method

The Division Method is a systematic approach to finding all the factors of a 35 by performing successive divisions. This method involves dividing 35 by every integer from 1 up to 35 and identifying the numbers that divide exactly without leaving a remainder. In the table below we've ommitted the numbers that don't divide 35, and only kept those that do:

DivisorVerification
135 ÷ 1 = 35
535 ÷ 5 = 7
735 ÷ 7 = 5
3535 ÷ 35 = 1

Using the division method, we calculated that factors of 35 are 1, 5, 7, 35.

Factor Tree of 35

The factor tree of 35 shows the step-by-step breakdown of 35 into its prime factors. Each branch of the tree represents a division of 35 into two factors until all resulting factors are prime numbers. This visual representation helps identify the building blocks of 35 and highlights the structure of its prime factorization.

The factor tree for 35
35 
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57

Factor Pairs of 35 (Visualization)

Factor pairs of 35 are sets of two numbers that, when multiplied together, result in 35. Factor pairs are symmetric and mirror around the square root of 35, such as (1, 35) and (35, 1), and can be both positive and negative pairs as long as their product equals 35.

Factor pairs of 35:
Negative factor pairsPositive factor pairs
(-1, -35)(1, 35)
(-5, -7)(5, 7)

All factor pairs of 35 are (1, 35), (5, 7), (-1, -35), (-5, -7).

Why Should I Care About Factors of 35?

Turns out, factors aren’t just about boring math equations—they’re like secret superpowers hiding inside numbers! Knowing them can help you split things up, share with friends, or even spot hidden patterns. Want to know how? Check out these real-life examples that show just how cool factors really are:

  • Organizing Books: You have 35 books and want to organize them in equal stacks. If you make 5 stacks, there will be 7 books per stack because 5 × 7 = 35.
  • Baking Cookies: You baked 35 cookies and want to pack them in boxes. If each box holds 5 cookies, you’ll need 7 boxes because 5 × 7 = 35.
  • Crafting Ornaments: You have 35 ornaments to craft. If each person makes 1 ornaments, you’ll need 35 people to complete all the crafts because 1 × 35 = 35.
  • Organizing a Garage Sale: You have 35 items to sell at a garage sale. If each table can display 5 items, you’ll need 7 tables because 5 × 7 = 35.
  • Organizing a Charity Run: You have 35 runners for a charity event. If you divide them into 1 teams, each team will have 35 runners because 1 × 35 = 35.

Factors of 35, calculated with the MathBlog factoring calculator