Answer:
All the possible zeroes of the polynomial: f(x) = are ±1 , ±2 , ±4 , ± , ± , ± by using rational zeroes theorem.
Step-by-step explanation:
Rational zeroes theorem gives the possible roots of polynomial f(x) by taking ratio of p and q where p is a factor of constant term and q is a factor of the leading coefficient.
The polynomial f(x) =
Find all factors (p) of the constant term.
Here we are looking for the factors of 4, which are:
±1 , ±2 and ±4
Now find all factors (q) of the coefficient of the leading term
we are looking for the factors of 3, which are:
±1 and ±3
List all possible combinations of ± as the possible zeros of the polynomial.
Thus, we have ±1 , ±2 , ±4 , ± , ± , ± as the possible zeros of the polynomial
Simplify the list to remove and repeated elements.
All the possible zeroes of the polynomial: f(x) = are ±1 , ±2 , ±4 , ± , ± , ±
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