Let and be the roots of , and and be the roots of . If and , then is equal to
- A
- B
- C
- D
Let and be the roots of , and and be the roots of . If and , then is equal to
Correct answer:C
Standard Method
Given: are roots of and are roots of .
Find: The value of where and .
For the first quadratic, since are roots of
we get the recurrence relation
Putting ,
So,
Hence,
Now for the second quadratic, since are roots of
we have
Then
Using and ,
Therefore,
Now adding both parts,
Therefore, the correct option is C.
Using recurrence relations of power sums
Given: for roots of , and for roots of .
Find: .
If is a root of , then
and the sequence of power sums satisfies
for .
Applying this to ,
At ,
Thus,
Next, for ,
So,
Now,
Therefore,
Finally,
So the expression is , hence the correct option is C.
Using the wrong recurrence sign for . For , the correct relation is . A sign error changes the first term completely. Derive the recurrence directly from the quadratic before substituting values.
Expanding incorrectly. The correct factorization is . If the common power is taken wrongly, the simplification to is lost. Factor out the highest common power carefully.
Using instead of . This comes from misreading the constant term in . Rewrite the quadratic as first, then substitute.
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