Question The function $$ f(x)=3 x^{3}-2 x^{2}-3 x+2 $$ has at least one integer root. Use the integer root theorem to find that root, then proceed to find all complex roots. (Note: roots may be integer, rational, irrational, and/or complex.) Answer Attempt 3 out of 10 There are three roots $$ \vee $$ :

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1. **List the possible integer roots:**  
   By the Integer Root Theorem, any integer root of  
   $$
   f(x)=3x^3-2x^2-3x+2
   $$  
   must be a divisor of the constant term $$2$$. Thus, the possible candidates are  
   $$
   \pm1,\quad \pm2.
   $$

2. **Test the candidate $$x=1$$:**  
   Substitute $$x=1$$ into $$f(x)$$:
   $$
   f(1)=3(1)^3-2(1)^2-3(1)+2=3-2-3+2=0.
   $$  
   So, $$x=1$$ is a root.

3. **Factor the polynomial:**  
   Since $$x=1$$ is a root, factor out $$(x-1)$$ from $$f(x)$$.  
   Use synthetic division with the coefficients $$3, -2, -3, 2$$:
   - Bring down $$3$$.
   - Multiply by $$1$$: $$3$$ and add to $$-2$$ to get $$1$$.
   - Multiply $$1$$ by $$1$$: $$1$$ and add to $$-3$$ to get $$-2$$.
   - Multiply $$-2$$ by $$1$$: $$-2$$ and add to $$2$$ to get $$0$$.  
     
   The quotient polynomial is  
   $$
   3x^2+x-2.
   $$  
   Thus,  
   $$
   f(x)=(x-1)(3x^2+x-2).
   $$

4. **Factor the quadratic polynomial:**  
   Factor $$3x^2+x-2$$ by splitting the middle term. Find two numbers that multiply to $$3(-2)=-6$$ and add to $$1$$. These numbers are $$3$$ and $$-2$$.  
   Rewrite the quadratic:
   $$
   3x^2+3x-2x-2,
   $$
   and factor by grouping:
   $$
   = 3x(x+1)-2(x+1)
   = (x+1)(3x-2).
   $$

5. **Determine all roots:**  
   The complete factorization of the polynomial is:
   $$
   f(x)=(x-1)(x+1)(3x-2).
   $$  
   Setting each factor equal to zero:
   - $$x-1=0$$ gives $$x=1$$ (integer root).
   - $$x+1=0$$ gives $$x=-1$$.
   - $$3x-2=0$$ gives $$x=\frac{2}{3}$$.

6. **Final answer:**  
   The function has three roots:
   
   $$
   x = 1,\quad x = -1,\quad x = \frac{2}{3}.
   $$
The function $$ f(x) = 3x^3 - 2x^2 - 3x + 2 $$ has roots at $$ x = 1 $$, $$ x = -1 $$, and $$ x = \frac{2}{3} $$.

Question
The function has at least one integer root.
Use the integer root theorem to find that root, then proceed to find all
complex roots. (Note: roots may be integer, rational, irrational, and/or
complex.)
Answer Attempt 3 out of 10
There are three roots :

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Question The function has at least one integer root. Use the integer root theorem to find that root, then proceed to find all complex roots. (Note: roots may be integer, rational, irrational, and/or complex.) Answer Attempt 3 out of 10 There are three roots :