Let α,β (α > β) be the roots of the quadratic equation x2 – x – 4 = 0. If Pn = αn - βn, n ∈ N, then P15P16−P14P16−P152+P14P15P13P14 is equal to…………

x2 – x – 4 = 0 Pn=αn−βn ?=P15P16−P14P16−P152+P14P15P13P14 =(P15−P14)(P16−P15)P13P14 =4P13⋅4P14P13⋅P14=16 Pn = αn - βn =αn−1⋅α−βn−1⋅β =αn−1(α2−4)−βn−1(β−4) Pn=αn+1−βn+1−4(αn−1−βn−1) Pn=Pn+1−4Pn−1⇒Pn+1−Pn=4Pn−1

Let α,β (α > β) be the roots of the quadratic equation x²– x – 4 = 0. If P_n = αⁿ - βⁿ, n $\in$ N, then $\frac{P_{15} P_{16} - P_{14} P_{16} - P_{15}^{2} + P_{14} P_{15}}{P_{13} P_{14}}$ is equal to…………

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Payal Gupta | Contributor-Level 10

7 months ago

x² – x – 4 = 0

$P_{n} = α^{n} - β^{n}$

$? = \frac{P_{15} P_{16} - P_{14} P_{16} - P_{15}^{2} + P_{14} P_{15}}{P_{13} P_{14}}$

$= \frac{(P_{15} - P_{14}) (P_{16} - P_{15})}{P_{13} P_{14}}$

$= \frac{4 P_{13} \cdot 4 P_{14}}{P_{13} \cdot P_{14}} = 16$

P_n = αⁿ - βⁿ

$= α^{n - 1} \cdot α - β^{n - 1} \cdot β$

$= α^{n - 1} (α^{2} - 4) - β^{n - 1} (β - 4)$

$P_{n} = α^{n + 1} - β^{n + 1} - 4 (α^{n - 1} - β^{n - 1})$

$P_{n} = P_{n + 1} - 4 P_{n - 1} \Rightarrow P_{n + 1} - P_{n} = 4 P_{n - 1}$

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