If one of the zeroes of the quadratic polynomial (k − 1)x² + kx + 1 is −3, find the value of k
Video Explanation
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Given
Polynomial: f(x) = (k − 1)x² + kx + 1
One zero of the polynomial = −3
To Find
The value of k.
Solution
Since −3 is a zero of the polynomial, by the Factor Theorem:
f(−3) = 0
Step 1: Substitute x = −3
f(−3) = (k − 1)(−3)² + k(−3) + 1
= 9(k − 1) − 3k + 1
= 9k − 9 − 3k + 1
= 6k − 8
Step 2: Solve for k
6k − 8 = 0
6k = 8
k = 4/3
Final Answer
k = 4/3
Conclusion
Hence, if one of the zeroes of the quadratic polynomial (k − 1)x² + kx + 1 is −3, then the value of k is 4/3.