Question

Questions:
1. How did you find the GCF of the numerical coefficients of each term?
2. How did you find the GCF of the variables in each term?
3. What did you do to the obtained GCF of the numerical coefficients and the GCF of the
variables?
4. How did you find the remaining factors?
5. Did you have any difficulty in finding the GCF of the terms?
6. Did you have any difficulty in finding the remaining factor/s of polynomials after GCF is
obtained? If so, why? If none,l what helped you factors those expressions correctly?ll​

Answer 1

Answer:

1.You can do this by following these three steps: Break down the coefficient of each of your polynomial's terms into its prime factorization. Select all the numbers that appear in each coefficient's prime factorization. Multiply those selected numbers together; this is the numerical portion of your polynomial's GCF.

2.You can also determine the GCF if you have both numbers and variables. Factorize the numbers and identify all common factors. To get the GCF multiply all common factors. You can use the greatest common factor to simplify fractions

6."no. finding the gcf made it easier for me to find the remaining factors of polynomials. other polynomials involves big numbers that are difficult to factor out, but with finding the gcf of the numbers, i was able to narrow down the number of possibilities. hence, factoring polynomials became easier for me."

Answer 2

Answer:

6. No

Step-by-step explanation:

You can find answers to all your questions with the help of the content below.

In science, Greatest Common Factor (GCF) was characterize as a bigger number that can separated into at least two numbers.

Tracking down Greatest Common Factor

1. Recognize and list down all factors of at least two numbers,
2. You can utilize tree outline in working on numbers,
3. List down the all their factors as indivisible (prime) numbers,
4. Multiply their common factor to get their GCF

Tracking down the GCF of Polynomials

For Coefficient

1. You can utilize tree outline to get the indivisible number elements of the steady coefficient
2. List down every one of the indivisible number variables
3. Multiply their common factor to track down  their GCF

For Variables

1. Separate the variables like $x^{2}y^{5}$into $(x^{2} )(y^{5} )$
2. You can recognize the factor by its power like $x^{2}$ and $x^{3}$, the GCF is $x^{2}$ (the least degree is now the most elevated normal variable).

6)"No. locating the gcf made it simpler for me to discover the remaining factors of polynomials. different polynomials entails large numbers which are hard to issue out, however with locating the gcf of the numbers, I used to be capable of slim down the number of possibilities. hence, factoring polynomials have become simpler for me."

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