If and are the roots of the equation , then the value of is equal to:
- A
- B
- C
- D
If and are the roots of the equation , then the value of is equal to:
Correct answer:A
Standard Method
Given: and are roots of .
Find: .
From the quadratic equation,
Using the identity,
So,
Next, using the identity for cubes,
Thus,
Hence,
The solution working gives , which does not appear in the options. The solution nevertheless states the correct answer as . Since the listed answer and option set identify A, the correct option is A, while noting this discrepancy in the source.
Using sum and product of roots
Given: Roots of are and .
Find: .
By Vieta's formulas,
Now compute the square sum first:
For the cube sum,
Substituting the values,
Therefore,
So the algebra shown in the source leads to , but the provided source answer marks , corresponding to option A.
Using only and forgetting to add . This gives , which matches one option but does not equal the full expression. Always evaluate both parts before concluding.
Applying Vieta's formulas with the wrong sign for . For , the product is , not . Use carefully.
Using an incorrect identity for . The correct relation is or equivalently . Do not omit the factor .
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