What is a prime factor?

A prime factor is a factor of a number that is also a prime number.

How do you find prime factors using a factor tree?

To use a factor tree, write the number at the top, then break it down into factors, circling the prime numbers and reducing non-prime numbers further until all factors are prime.

Can you give an example of prime factorization using a factor tree?

For example, to prime factorize 220, you can split it into 2 and 110, then 110 into 10 and 11, and finally 10 into 2 and 5, giving 2, 2, 5, and 11 as prime factors.

Does the order of factorization affect the final prime factors?

No, the order of factorization does not affect the final set of prime factors; different paths will lead to the same primes.

What is the final prime factorization of the number 220?

The prime factorization of 220 is 2^2 * 5 * 11.

What is the purpose of circling numbers in the factor tree?

Circling numbers in the factor tree indicates that they are prime factors and need no further division.

What does expressing a number as a product of its prime factors mean?

It means finding prime numbers that multiply together to give the original number.

What is the prime factorization of 112 using a factor tree?

The prime factorization of 112 is 2^4 * 7.

What does the term 'prime factorization' refer to?

Prime factorization refers to the process of breaking down a number into a product of its prime factors.

Is the method applicable to any number?

Yes, the factor tree method can be applied to any number to determine its prime factors.

How to Use Prime Factor Trees to find Prime Factors #5

00:06:01

https://www.youtube.com/watch?v=FL4MPqfbFbw

Zusammenfassung

TLDRThe video provides a detailed explanation of what prime factors are and how to find them using a process known as a factor tree. A prime factor is defined as a factor of a number that is a prime number itself. To express a number as a product of its prime factors, you can use factor trees, which involve breaking the number down into smaller factors until all factors are prime. For instance, the video discusses finding prime factors of the number 12, which are 2 and 3, via multiplication that results in 12 as 2*2*3. For more complex numbers like 220, a factor tree can help decompose it into 2, 2, 5, and 11. The order of factorization doesn’t matter, as any correct method will lead to the same set of prime factors. The video also covers the concept of prime factorization in which every number is expressed as a product of its prime factors, such as 112, which is 2^4 * 7.

Mitbringsel

🔢 Prime factors are factors that are also prime numbers.
🧮 Factor trees help break down numbers into prime factors.
📚 Use prime factorization to express numbers as a product of prime factors.
🔄 The order in which you factorize doesn’t change the prime factors obtained.
🔍 Factor trees involve splitting numbers into factors and circling the primes.
✏️ Example: 220 breaks down into 2, 2, 5, and 11 - that's 2² * 5 * 11.
✏️ Example: 112 breaks down into 2⁴ * 7 using a factor tree.
💡 Each step in factorization should result in prime factors for simplicity.
📐 Understanding factorization is key for solving prime factor-related math problems.
📘 The process demonstrated is useful for exam questions about prime factors.

Zeitleiste

00:00:00 - 00:06:01
The video introduces the concept of prime factors and explains how to find them using factor trees. A prime factor is a factor of a number that is also a prime number. For example, the number 12 has factors 1, 2, 3, 4, 6, and 12, but only 2 and 3 are prime factors. The video explains that in exams, you'll often need to express a number as a product of its prime factors, which involves finding a set of prime factors that multiply to give the original number. To express 12 as a product of its prime factors, it needs to be written as 2 times 2 times 3, which equals 12."

Mind Map

Häufig gestellte Fragen

What is a prime factor?
A prime factor is a factor of a number that is also a prime number.
How do you find prime factors using a factor tree?
To use a factor tree, write the number at the top, then break it down into factors, circling the prime numbers and reducing non-prime numbers further until all factors are prime.
Can you give an example of prime factorization using a factor tree?
For example, to prime factorize 220, you can split it into 2 and 110, then 110 into 10 and 11, and finally 10 into 2 and 5, giving 2, 2, 5, and 11 as prime factors.
Does the order of factorization affect the final prime factors?
No, the order of factorization does not affect the final set of prime factors; different paths will lead to the same primes.
What is the final prime factorization of the number 220?
The prime factorization of 220 is 2^2 * 5 * 11.
What is the purpose of circling numbers in the factor tree?
Circling numbers in the factor tree indicates that they are prime factors and need no further division.
What does expressing a number as a product of its prime factors mean?
It means finding prime numbers that multiply together to give the original number.
What is the prime factorization of 112 using a factor tree?
The prime factorization of 112 is 2^4 * 7.
What does the term 'prime factorization' refer to?
Prime factorization refers to the process of breaking down a number into a product of its prime factors.
Is the method applicable to any number?
Yes, the factor tree method can be applied to any number to determine its prime factors.

Weitere Video-Zusammenfassungen anzeigen

Erhalten Sie sofortigen Zugang zu kostenlosen YouTube-Videozusammenfassungen, die von AI unterstützt werden!

Untertitel

Automatisches Blättern:

00:00:00
[Music]
00:00:04
in today's video we're looking at what
00:00:07
prime factors are
00:00:09
and also how we can find them using
00:00:11
factor trees
00:00:14
all we mean by a prime factor
00:00:16
is a factor that's also a prime number
00:00:23
so if we took the number 12
00:00:25
which has the factors 1 2 3
00:00:29
4 6 and 12
00:00:32
2 and 3 would be considered prime
00:00:35
factors
00:00:36
because they're both prime numbers
00:00:38
and factors of 12.
00:00:44
when you get questions about this sort
00:00:45
of topic in the exam
00:00:47
they'll normally ask you to write a
00:00:49
number as a product of its prime factors
00:00:54
and what they mean by this is that they
00:00:56
want you to find a set of prime factors
00:01:00
that multiply together to give that
00:01:02
number
00:01:04
so if we were asked to write 12 as a
00:01:07
product of its prime factors
00:01:10
we'd need to come up with a set of
00:01:12
numbers that multiply together to make
00:01:14
twelve
00:01:16
we already know that two and three are
00:01:19
prime factors of twelve
00:01:21
but we can't just write two times three
00:01:24
because two times three is six not
00:01:27
twelve
00:01:29
instead we'd have to do two times two
00:01:32
times three
00:01:33
which are still all prime numbers
00:01:36
but now do multiply to give us twelve
00:01:42
if you want to find the prime factors of
00:01:44
more complicated numbers though
00:01:47
like you might need to in the exam
00:01:49
you'll need to use a method called a
00:01:50
factor tree
00:01:52
to understand how these things work
00:01:55
let's imagine we were asked to write 220
00:01:58
as a product of its prime factors
00:02:01
the first step is to write the number
00:02:04
whose prime factors you're trying to
00:02:06
find
00:02:07
so 220 at the very top of the page
00:02:10
then we can start to factorize it by
00:02:13
splitting it up into a factor
00:02:15
for example here we might do 110 and 2.
00:02:20
if one of these is a prime number and
00:02:23
hence a prime factor like two is
00:02:26
then we can circle it
00:02:28
and leave it alone for now
00:02:30
but if it's not a prime number like 110
00:02:34
then we have to factorize it again
00:02:37
into say 11 and 10.
00:02:40
11 is a prime number
00:02:42
so we circle that
00:02:44
and then split the 10 into 5 and 2
00:02:48
which also both prime numbers
00:02:50
so we can circle them both
00:02:53
now that we've finished factorizing it
00:02:56
we can write out all our prime factors
00:02:59
so 2
00:03:00
2
00:03:01
5 and 11.
00:03:04
and it's normally best to put them in
00:03:05
ascending order like this
00:03:07
which just means from smallest to
00:03:09
biggest
00:03:11
so basically we found that 220
00:03:15
equals 2 times two times five times
00:03:18
eleven
00:03:20
and as two occurs twice we should
00:03:23
rewrite it as two squared times five
00:03:26
times eleven
00:03:31
now one thing to clarify here is that it
00:03:33
doesn't actually matter which way you
00:03:35
factorize it
00:03:37
you will always end up with the same
00:03:39
prime factors
00:03:41
for example we could have split the 220
00:03:44
into 10 and 22
00:03:47
then split the 10 into 5 and 2
00:03:51
and split the 22
00:03:53
into 2 and 11.
00:03:56
we'd still have ended up with 2 2 5 and
00:04:00
11 as our prime factors
00:04:04
so don't worry about which way you
00:04:06
factorize it
00:04:07
as long as each time you're making a
00:04:09
correct factor
00:04:11
then you'll end up with the same answer
00:04:13
at the end
00:04:17
let's try one more where we're asked to
00:04:19
express 112 as a product of its prime
00:04:22
factors
00:04:24
the word express basically just means
00:04:27
write or show
00:04:28
so we're doing exactly the same thing as
00:04:31
we were in the previous questions
00:04:34
to start we put 112 at the top
00:04:37
and then we just split it into a factor
00:04:40
and the easiest pair if it's an even
00:04:42
number will generally be two
00:04:45
and whatever else you need
00:04:48
in this case 56
00:04:50
so we can circle the two
00:04:52
and then split the 56 into two and 28
00:04:57
then the 28 can go into 2 and 14
00:05:01
and finally the 14 can go into 2 and 7.
00:05:06
so we can express 112
00:05:08
as two times two times two times two
00:05:12
times seven
00:05:14
and then we can rewrite it as two to the
00:05:16
power of four times seven
00:05:20
one last thing to mention is that this
00:05:22
whole process we've been covering in
00:05:24
this video is sometimes called prime
00:05:27
factorization
00:05:28
which just means to rewrite a number as
00:05:31
a product of its prime factors
00:05:35
so in this last question we basically
00:05:38
did the prime factorization of 112.
00:05:46
anyway that's everything for this video
00:05:48
so hope you enjoyed it and found it
00:05:50
useful in some way and cheers for
00:05:52
watching