To find the greatest common factor (GCF) of 15q+6, we need to find the largest factor that divides evenly into both terms.
First, let's factorize both terms individually:
15q can be factored as 3*q*5.
6 can be factorized as 3*2.
Now, let's identify the common factors to find the GCF:
The common factor of 15q and 6 is 3.
Therefore, the GCF of 15q+6 is 3.
Find the GCF of 15q+6
13 answers
Find the GCF of 8dā20
To find the greatest common factor (GCF) of 8dā20, we need to find the largest factor that divides evenly into both terms.
First, let's factorize both terms individually:
8d can be factored as 2*d*4.
20 can be factorized as 2*2*5.
Now, let's identify the common factors to find the GCF:
The common factor of 8d and 20 is 2.
Therefore, the GCF of 8dā20 is 2.
First, let's factorize both terms individually:
8d can be factored as 2*d*4.
20 can be factorized as 2*2*5.
Now, let's identify the common factors to find the GCF:
The common factor of 8d and 20 is 2.
Therefore, the GCF of 8dā20 is 2.
Find the GCF of 45g+30h
To find the greatest common factor (GCF) of 45g+30h, we need to find the largest factor that divides evenly into both terms.
First, let's factorize both terms individually:
45g can be factored as 3*3*5*g.
30h can be factored as 2*3*5*h.
Now, let's identify the common factors to find the GCF:
The common factors of 45g and 30h are 3 and 5.
Therefore, the GCF of 45g+30h is 3*5 = 15.
First, let's factorize both terms individually:
45g can be factored as 3*3*5*g.
30h can be factored as 2*3*5*h.
Now, let's identify the common factors to find the GCF:
The common factors of 45g and 30h are 3 and 5.
Therefore, the GCF of 45g+30h is 3*5 = 15.
Factor 9z + 18 using the GCF.
To factor 9z + 18 using the greatest common factor (GCF), we need to identify the largest factor that divides evenly into both terms.
First, let's find the GCF of 9z and 18.
9z can be factored as 3 * 3 * z.
18 can be factored as 2 * 3 * 3.
The common factors between 9z and 18 are 3 and 3.
Now, let's factor out the GCF:
9z + 18 = 3 * 3 * z + 3 * 2 * 3.
Factoring out the common factor of 3, we get:
9z + 18 = 3 * (3z + 2 * 3).
Simplifying further:
9z + 18 = 3(3z + 6).
Therefore, the factored form of 9z + 18 is 3(3z + 6).
First, let's find the GCF of 9z and 18.
9z can be factored as 3 * 3 * z.
18 can be factored as 2 * 3 * 3.
The common factors between 9z and 18 are 3 and 3.
Now, let's factor out the GCF:
9z + 18 = 3 * 3 * z + 3 * 2 * 3.
Factoring out the common factor of 3, we get:
9z + 18 = 3 * (3z + 2 * 3).
Simplifying further:
9z + 18 = 3(3z + 6).
Therefore, the factored form of 9z + 18 is 3(3z + 6).
Factor 16d ā 12 using the GCF
To factor 16d - 12 using the greatest common factor (GCF), we need to identify the largest factor that divides evenly into both terms.
First, let's find the GCF of 16d and 12.
16d can be factored as 2 * 2 * 2 * 2 * d.
12 can be factored as 2 * 2 * 3.
The common factors between 16d and 12 are 2 and 2.
Now, let's factor out the GCF:
16d - 12 = 2 * 2 * 2 * 2 * d - 2 * 2 * 3.
Factoring out the common factors of 2 and 2, we get:
16d - 12 = 2 * 2 * (2 * d - 3).
Therefore, the factored form of 16d - 12 is 4(2d - 3).
First, let's find the GCF of 16d and 12.
16d can be factored as 2 * 2 * 2 * 2 * d.
12 can be factored as 2 * 2 * 3.
The common factors between 16d and 12 are 2 and 2.
Now, let's factor out the GCF:
16d - 12 = 2 * 2 * 2 * 2 * d - 2 * 2 * 3.
Factoring out the common factors of 2 and 2, we get:
16d - 12 = 2 * 2 * (2 * d - 3).
Therefore, the factored form of 16d - 12 is 4(2d - 3).
Find the GCF of 8dā20
To find the greatest common factor (GCF) of 8dā20, we need to find the largest factor that divides evenly into both terms.
First, let's factorize both terms individually:
8d can be factored as 2 * 2 * d.
20 can be factorized as 2 * 2 * 5.
Now, let's identify the common factors to find the GCF:
The common factor of 8d and 20 is 2 * 2, which is 4.
Therefore, the GCF of 8dā20 is 4.
First, let's factorize both terms individually:
8d can be factored as 2 * 2 * d.
20 can be factorized as 2 * 2 * 5.
Now, let's identify the common factors to find the GCF:
The common factor of 8d and 20 is 2 * 2, which is 4.
Therefore, the GCF of 8dā20 is 4.
Factor 9z + 18 using the GCF.
To factor 9z + 18 using the greatest common factor (GCF), we need to identify the largest factor that divides evenly into both terms.
First, let's find the GCF of 9z and 18.
9z can be factored as 3 * 3 * z.
18 can be factored as 2 * 3 * 3.
The common factors between 9z and 18 are 3 and 3.
Now, let's factor out the GCF:
9z + 18 = 3 * 3 * z + 3 * 2 * 3.
Factoring out the common factor of 3, we get:
9z + 18 = 3 * (3z + 2 * 3).
Simplifying further:
9z + 18 = 3(3z + 6).
Therefore, the factored form of 9z + 18 is 3(3z + 6).
First, let's find the GCF of 9z and 18.
9z can be factored as 3 * 3 * z.
18 can be factored as 2 * 3 * 3.
The common factors between 9z and 18 are 3 and 3.
Now, let's factor out the GCF:
9z + 18 = 3 * 3 * z + 3 * 2 * 3.
Factoring out the common factor of 3, we get:
9z + 18 = 3 * (3z + 2 * 3).
Simplifying further:
9z + 18 = 3(3z + 6).
Therefore, the factored form of 9z + 18 is 3(3z + 6).