alpha, Beta, gamma are the zeroes of cubic polynomial x3 – 6×2 + p(x – 1) + 5. If alpha, beta, gamma are in A.P., then find theproduct of all the zeroes. I need steps alsoIrrelevant answers will be reported! About the author Gianna
Solution: Given – f(x) = x³ – 6x² + p(x – 1) + 5 α, β and γ are the zeros of f(x). Also, α, β and γ are in in A.P. We have to find out the product of Zeros. → f(x) = x³ – 6x² + px + (5 – p) As α,β and γ are in A.P., → β – α = γ – β → 2β = α + γ – (i) We know that, → Sum of zeros of a cubic polynomial = -b/a Where, b = Coefficient of x². a = Coefficient of x³. Here, → a = 1 → b = -6 → c = p → d = 5 – p So, → Sum of roots = -b/a → Sum = 6 So, → α + β + γ = 6 From (i), → 3β = 6 → β = 2 Therefore, → f(β) = (2)³ – 6 × (2)² + p × (2 – 1) + 5 → f(β) = 8 – 24 + p + 5 → f(β) = p – 11 As β is a zero, → f(β) = 0 → p – 11 = 0 → p = 11 So, → d (Constant term in f(x)) = 5 – 11 = -6 Therefore, → Product of zeros = -d/a = -(-6)/1 = 6 Answer: Product of zeros (αβγ) = 6. Reply
Solution:
Given –
We have to find out the product of Zeros.
→ f(x) = x³ – 6x² + px + (5 – p)
As α,β and γ are in A.P.,
→ β – α = γ – β
→ 2β = α + γ – (i)
We know that,
→ Sum of zeros of a cubic polynomial = -b/a
Where,
Here,
→ a = 1
→ b = -6
→ c = p
→ d = 5 – p
So,
→ Sum of roots = -b/a
→ Sum = 6
So,
→ α + β + γ = 6
From (i),
→ 3β = 6
→ β = 2
Therefore,
→ f(β) = (2)³ – 6 × (2)² + p × (2 – 1) + 5
→ f(β) = 8 – 24 + p + 5
→ f(β) = p – 11
As β is a zero,
→ f(β) = 0
→ p – 11 = 0
→ p = 11
So,
→ d (Constant term in f(x)) = 5 – 11 = -6
Therefore,
→ Product of zeros = -d/a
= -(-6)/1
= 6
Answer: