How do you use the factor theorem to determine whether x+4 is a factor of #2x^3 + x^2 - 25x + 12#?

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Answer 1 · 2018-07-22T16:38:18

See below:

Let's say we have a function #f(x)#:

If #f(c)=0#, then #x-c# is a factor of #f(x)#.

We want to see if #x+4# is a factor, so we can essentially evaluate #f(-4)#. If we get zero, it is a factor. If we don't, it isn't.

Let's evaluate this function at #x=-4#:

#2(-4)^3+(-4)^2-25(-4)+12=0#

We do indeed get zero, which means #x+4# is a factor of our polynomial.

Hope this helps!