If the zeroes of the quadratic polynomial ax² + bx + c (c ≠ 0) are equal, then find the correct statement
Video Explanation
Watch the video explanation below:
Given
Quadratic polynomial: f(x) = ax² + bx + c, c ≠ 0
The zeroes of the polynomial are equal.
To Find
The correct relationship between the coefficients.
Solution
Step 1: Condition for Equal Zeroes
For a quadratic polynomial ax² + bx + c, the zeroes are equal if:
b² − 4ac = 0
Step 2: Rearrange the Condition
b² = 4ac
Since b² is always positive or zero,
the product ac must be positive.
Step 3: Analyse the Sign of a and c
If ac is positive, then:
- a and c have the same sign
Given that c ≠ 0, this condition is valid.
Final Answer
The correct statement is:
c and a have the same sign
Correct Option
(c) c and a have the same sign
Conclusion
Hence, if the zeroes of the quadratic polynomial ax² + bx + c (c ≠ 0) are equal, then the coefficients a and c must have the same sign.