Answer:
A: ±{1/12, 1/6, 1/4, 1/3, 1/2, 3/4, 1, 3/2, 3}
B: quotient from division by 3x+1: 4x² -8x +3; remainder: 0
Explanation:
You want the possible rational roots of g(x) = 12x³ -20x² +x +3, and you want to use synthetic division to show that -1/3 is a zero.
5A) Rational roots theorem
The rational roots theorem tells you that possible rational roots will be of the form ...
±{divisor of the constant}/{divisor of the leading coefficient}
You have listed the divisors of each. The possible rational roots are the unique rational numbers that result:
±{1/12, 1/6, 1/4, 1/3, 1/2, 3/4, 1, 3/2, 3}
5B) Synthetic division
To show that -1/3 is a zero, we can divide g(x) by (x +1/3) and look for a remainder of 0.
The synthetic division calculator we use to do this (first attachment) treats this as division by (3x+1), effectively, 3(x +1/3). The division by 3 is done first, so the dividend becomes 4x³ -20/3x² +1/3x +1. Then the synthetic division of that by x+1/3 is carried out.
The quotient is 4x² -8x +3, and the remainder is zero. The zero remainder shows that -1/3 is a zero of g(x).
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Additional comment
The quadratic factor of g(x), namely 4x² -8x +3, can be further factored as ...
(4x -2)(4x -6)/4 = (2x -1)(2x -3)
This shows the other zeros of g(x) are 1/2 and 3/2, values on the list in part A. This is confirmed by the graph in the second attachment.