If one zero of the polynomial f(x) = (k² + 4)x² + 13x + 4k is the reciprocal of the other, find the value of k
Video Explanation
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Given
f(x) = (k² + 4)x² + 13x + 4k
Let the zeroes of the polynomial be α and β.
It is given that one zero is the reciprocal of the other.
To Find
The value of k.
Concept Used
If one zero is the reciprocal of the other, then:
αβ = 1
For a quadratic polynomial ax² + bx + c:
αβ = c/a
Solution
Comparing f(x) = (k² + 4)x² + 13x + 4k with ax² + bx + c,
a = k² + 4, b = 13, c = 4k
Step 1: Use the Condition αβ = 1
αβ = c/a
⇒ 4k / (k² + 4) = 1
Step 2: Solve for k
4k = k² + 4
k² − 4k + 4 = 0
(k − 2)² = 0
⇒ k = 2
Final Answer
k = 2
Conclusion
Hence, if one zero of the polynomial f(x) = (k² + 4)x² + 13x + 4k is the reciprocal of the other, then the value of k is 2.