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briefly explain the process by which you would determine whether or not x-6 a factor of 3x^3-16x^2-72
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briefly explain the process by which you would determine whether or not x-6 a factor of 3x^3-16x^2-72

User Charlene
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2 Answers

1 vote
x-6=0,x=6
put x=6 in the given eq.
3 x^(3) -16 x^(2) -72=3( 6^(3) )-16( 6^(2) )-72 =3(216)-16(36)-72
=648-576-72
=648-648
=0
hence x-6 is a factor of the given polynomial
User Mustafagonul
by
8.2k points
1 vote
Using the remainder theorem, substitute 6 in for any x in the equation and it will equal the remainder if it has been divided by (x-6). If the remainder is zero, then it would have divided evenly...making it a factor. If it equals anything but zero then it would not be a factor
User Bartosz Bilicki
by
8.1k points
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