If α and β are the zeros of the quadratic polynomial f(x) = x² − p(x + 1) − c, show that (α + 1)(β + 1) = 1 − c
Video Explanation
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Proof
Given polynomial:
f(x) = x² − p(x + 1) − c
Simplifying the polynomial:
f(x) = x² − px − p − c
Let α and β be the zeros of the given polynomial.
Step 1: Find α + β and αβ
Comparing f(x) = x² − px − (p + c) with ax² + bx + c:
a = 1, b = −p, c = −(p + c)
α + β = −b/a = p
αβ = c/a = −(p + c)
Step 2: Find (α + 1)(β + 1)
(α + 1)(β + 1)
= αβ + α + β + 1
= −(p + c) + p + 1
= 1 − c
Hence Proved
(α + 1)(β + 1) = 1 − c
Conclusion
Thus, using the relationship between zeros and coefficients of the quadratic polynomial, the given result is proved.