If α and β are the zeros of f(x) = x² − 5x + 4, find the value of (1/α + 1/β − 2αβ)
Video Explanation
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Solution
Given polynomial:
f(x) = x² − 5x + 4
Step 1: Find α + β and αβ
Comparing f(x) = x² − 5x + 4 with ax² + bx + c:
a = 1, b = −5, c = 4
α + β = −b/a = 5
αβ = c/a = 4
Step 2: Find (1/α + 1/β)
1/α + 1/β = (α + β)/αβ
= 5/4
Step 3: Find the Required Value
1/α + 1/β − 2αβ
= 5/4 − 2 × 4
= 5/4 − 8
= (5 − 32)/4
= −27/4
Final Answer
The required value is −27/4.
Conclusion
Thus, using the relationship between zeros and coefficients of the quadratic polynomial, the value of the given expression is correctly obtained.