If that's + 32x, the answer is x(5x - 8)(5x - 4)
The possibilities are infinite. One set: 1. 2xy 2. 2x2y 3. 2x4y
Common Apex
If you've factored out the trinomials and want to find the greatest common factor (GCF) of the remaining terms, you can look for common factors among the coefficients and variables in each term. Let's say you have factored the trinomial � � 2 � � � ax 2 +bx+c into the form � ( � − � ) ( � − � ) a(x−r)(x−s), where � r and � s are the roots or solutions of the trinomial. Now, let's consider the factored form of the trinomial along with any additional terms you have: � ( � − � ) ( � − � ) additional terms a(x−r)(x−s)+additional terms To find the GCF, you'll look for common factors in the coefficients and variables. The GCF will be the product of the common factors. For example, if the remaining terms are 2 � − 4 2x−4, you can factor a 2 from both terms: 2 ( � − � ) ( � − � ) 2 ( � − 2 ) 2(x−r)(x−s)+2(x−2) Now, the GCF is 2 2 because it is the common factor in both terms. If you have specific trinomials or terms you'd like help factoring, feel free to provide them, and I can guide you through the process
First of all, there can't be two different things that are both "greatest". You only get one. 3 is a factor of 36, and 3 is also a factor of itself. So it must be the greatest common factor of 3 and 36. If there was a greater factor common to both 3 and 36, it would have to be greater than 3.
To get the Greates Common Factor (GCF) of 30 and 105 we need to factor each value first and then we choose all the copies of factors and multiply them:30: 2 3 5 105: 3 5 7 GCF: 3 5The Greates Common Factor (GCF) is: 3 x 5 = 15
if I'm not mistaken... 25x3-60x2+32x right? if that's the case, factor out all commond factors: x(25x2-60x+32) then factor out the trinomial inside: x(5x-4)(5x-8) then that would be the final answer...:D
The possibilities are infinite. One set: 1. 2xy 2. 2x2y 3. 2x4y
find a greatest common factor or GCFin factoring a trinomial with a leading coefficient other than 1 the first step is to look for a COMMON factor in each term
Common Apex
The first common factor is 1. The next (and only other common factor, their highest common factor) is 2.
The first common factor of any set of integers is 1.
first you must factor the equation... (x - 7)(x + 2) x = 7 and -2 Your factors are 7 and -2
Factor out the Greatest Common Factor.
1. When factoring first always look for a GCF (greatest common factor). If each term has a greatest common factor, factor it out in from using parenthesis first. This problem does not have a GCF. 2. Next, since this is a trinomial, many times we can factor it down using backwards FOIL (First, Outter, Inner, Last). 3. To do this always put down two sets of parenthesis. (we do this because we are looking to factor into two binomials) ( )( ) 4. Next we complete the fist term in each set of parenthesis. The first term is simply going to be the variable we are using in the problem. In this problem the variable is q. (q )(q ) 5. Then find the factors of the last term (+12) in which the sum is equal to the coefficient of the middle term (-7). These factors are -3 and -4. 6. Complete the factoring by putting these factors into the second part of the parenthesis. (q - 3)(q - 4) * If you want to make sure you are correct, multiply you answer out and see if you get the same trinomial you started with.
If you've factored out the trinomials and want to find the greatest common factor (GCF) of the remaining terms, you can look for common factors among the coefficients and variables in each term. Let's say you have factored the trinomial � � 2 � � � ax 2 +bx+c into the form � ( � − � ) ( � − � ) a(x−r)(x−s), where � r and � s are the roots or solutions of the trinomial. Now, let's consider the factored form of the trinomial along with any additional terms you have: � ( � − � ) ( � − � ) additional terms a(x−r)(x−s)+additional terms To find the GCF, you'll look for common factors in the coefficients and variables. The GCF will be the product of the common factors. For example, if the remaining terms are 2 � − 4 2x−4, you can factor a 2 from both terms: 2 ( � − � ) ( � − � ) 2 ( � − 2 ) 2(x−r)(x−s)+2(x−2) Now, the GCF is 2 2 because it is the common factor in both terms. If you have specific trinomials or terms you'd like help factoring, feel free to provide them, and I can guide you through the process
(x + 1) and (x + 2) are monomial factors of the polynomial x2 + 3x + 2. (x + 1) and (x + 3) are monomial factors of the polynomial x2 + 4x + 3. (x + 1) is a common monomial factor of the polynomials (x2 + 3x + 2) and (x2 + 4x + 3)
If the coefficient of the highest power of a variable of interest is negative.