Factoring is harder than multiplying because it's not as mechanical. Many times it involves guesses or trial-and-error. Also, it can be tougher because sometimes things cancel when multiplying. For example, If you were asked to multiply (x+2)(x2-2x+4), you would get x3+8
for example, follow these steps:
Break down every term into prime factors. ...
Look for factors that appear in every single term to determine the GCF. ...
Factor the GCF out from every term in front of parentheses, and leave the remnants inside the parentheses. ...
Answers & Comments
Answer:
factoring by general polynomials
because if you find the factors of the last term you will have to find the factors and it's so hard for me
Step-by-step explanation:
Answer:
Factoring is harder than multiplying because it's not as mechanical. Many times it involves guesses or trial-and-error. Also, it can be tougher because sometimes things cancel when multiplying. For example, If you were asked to multiply (x+2)(x2-2x+4), you would get x3+8
for example, follow these steps:
Step-by-step explanation: