Multiplication of Polynomials by Binomials

Key Questions

  • Answer:

    It's a rule.

    Explanation:

    It's a rule commonly used in factoring, meaning to start by multiplying the two first variables first, then outer, then inner, then last.
    Ex:
    If the things being multiplied is (x+1) by (x-2), you would multiply "x" and "x" first.
    #x*x=x^2#
    #x*-2=-2x#
    #1*x=x#
    #1*-2=-2#
    The final answer would be: #x^2-x-2#

  • The distribution property says that #a*(b+c)=a*b+a*c#

    With more polynomials it gets a bit harder. I'll do it the long way:

    #(a+b)*(c+d)=(a+b)*c+(a+b)*d#

    We have distributed the second binomial, and we now distribute the first binomial (twice):

    #(a+b)*c+(a+b)*d=a*c+b*c+a*d+b*d#

    With larger polynomials the 'book-keeping' may become a bit tedious, and most trained people take shortcuts.

    If you have more than two polynomials, best method is to do them step by step, two at a time:

    #(a+b)(c+d)*(e+f)#

    #=(ac+ad+bc+bd)(e+f) # (see above)

    #=ace+acf+ade+adf+bce+bcf+bde+bdf#

    Last check: 2-term times 2-term = 4 terms
    4-terms times 2-term = 8-terms.
    In practical examples, you will be able to add like terms (like the numbers, #x#'s #x^2#'s, etc.
    (there are no like terms in this example)

Questions