If one of the zeros of a quadratic polynomial of the form x² + ax + b is the negative of the other, then find the correct statement
Video Explanation
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Given
Quadratic polynomial: f(x) = x² + ax + b
One zero is the negative of the other.
To Find
The correct statement about the polynomial.
Solution
Let the zeroes of the polynomial be:
α and −α
Step 1: Use the Sum of Zeroes
Sum of zeroes = α + (−α) = 0
But for the polynomial x² + ax + b:
Sum of zeroes = −a
So,
−a = 0
⇒ a = 0
Hence, the polynomial has no linear term.
Step 2: Use the Product of Zeroes
Product of zeroes = α(−α) = −α²
But for the polynomial:
Product of zeroes = b
So,
b = −α²
Since α² > 0, we get:
b < 0
Final Answer
The polynomial has no linear term and the constant term is negative.
Correct Option
(a) has no linear term and constant term is negative
Conclusion
Hence, if one zero of the quadratic polynomial x² + ax + b is the negative of the other, then the polynomial has no linear term and its constant term is negative.