The product of all the rational roots of the equation , is equal to:
- A
- B
- C
- D
The product of all the rational roots of the equation , is equal to:
Correct answer:A
Standard Method
Given:
Find: The product of all rational roots.
First simplify
So the equation becomes
Let
Then
Substituting into the equation,
Factor the quadratic:
Hence,
For ,
Its roots are
which are irrational.
For ,
So the rational roots are and .
Their product is
Therefore, the product of all rational roots is . The correct option is A.
Using Substitution Carefully
Given:
Find: Product of all rational roots.
A useful substitution is
Also,
Since
we get
Now substitute into the original equation:
So,
If , then
The discriminant is
which is not a perfect square, so these roots are irrational.
If , then
Thus the rational roots are and .
Therefore,
So the required product is .
Taking but substituting incorrectly. Since , we must write , not any other expression.
Including all roots in the product without checking whether they are rational. The equation from gives irrational roots, so only the roots from must be used.
Expanding the full quartic directly and getting lost in algebra. The substitution reduces the equation to a quadratic in , which is the efficient and reliable method.
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