Factor neagitave 27h minus 6 using the GCF
To factor the expression -27h - 6 using the greatest common factor (GCF), we need to find the largest common factor of both terms.
Step 1: Identify the GCF of -27h and -6. The GCF is the largest number that divides both terms evenly. In this case, both terms are divisible by 3.
Step 2: Divide each term by the GCF.
-27h / 3 = -9h
-6 / 3 = -2
Step 3: Write the factored form using the GCF outside parentheses and the divided terms inside the parentheses.
GCF: 3
Factored form:
-27h - 6 = 3(-9h - 2)
Therefore, the factorization of -27h - 6 using the GCF is 3(-9h - 2).
To factor the expression -27h - 6 using the greatest common factor (GCF), we first need to find the GCF of the two terms, -27h and -6.
Step 1: Find the GCF of -27h and -6
To find the GCF, we need to identify the greatest common factor that can evenly divide both terms. In this case, both terms have a common factor of 3.
Step 2: Divide both terms by the GCF
Dividing -27h by 3 gives us -9h, and dividing -6 by 3 gives us -2.
Step 3: Write the factored expression
Now, we can write the factored expression using the GCF:
-27h - 6 = 3(-9h - 2)
Therefore, the factored form of -27h - 6, using the GCF, is 3(-9h - 2).
To factor the expression -27h - 6 using the Greatest Common Factor (GCF), we first need to find the GCF of the two terms.
The GCF of -27h and -6 is 3. Therefore, we can factor out 3 from both terms:
-27h - 6 = 3(-9h - 2)
So, the factored form of -27h - 6 is 3(-9h - 2).