Let - and - be two real numbers such that - - - - 1and - - - 1- LetPn - -n - -n- Pn-1 - 11 and Pn-1 - 29 for some integer n- 1Then- the value of Pn2 is-

Step 1: Finding α^n+1 and β^n+1Sum of roots of x^2 – x – 1 = 0 ...(i)⇒α+ β = 1Product of roots ⇒ ɑ β = – 1Since α be the root of (i)⇒α^2 –α – 1 = 0 0e ...

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Standard XII

Mathematics

Evaluation of a Determinant

Let α and β b...

Question

Let $α$ and $β$ be two real numbers such that $α + β = 1$ and $α β = - 1$ . Let $P_{n} = {(α)}^{n} + {(β)}^{n}, P_{n - 1} = 11$ and $P_{n + 1} = 29$ for some integer $n \geq 1$ Then, the value of ${P_{n}}^{2}$ is______________.

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Solution

Step 1: Finding $α^{n + 1}$ and $β^{n + 1}$
Sum of roots of $x^{2} - x - 1 = 0 . . . (i)$
$\Rightarrow α$ $+ β = 1$
Product of roots
$\Rightarrow ɑ β = - 1$
Since $α$ be the root of $(i)$
$\Rightarrow α^{2} - α - 1 = 0 \Rightarrow α^{2} = α + 1 \Rightarrow α^{2} = α^{1} + α^{0} \Rightarrow α^{1 + 1} = α^{1} + α^{1 - 1} \Rightarrow α^{n + 1} = α^{n} + α^{n - 1} . . . (i i)$
Similarly $β^{n + 1} = β^{n} + β^{n - 1} . . . (i i i)$
Step 2: Finding the value of ${P_{n}}^{2}$
Adding equations $(i i)$ and $(i i i)$
$\Rightarrow α^{n + 1} + β^{n + 1} = {(α)}^{n} + {(β)}^{n} + [{(α)}^{n + 1} + {(β)}^{n + 1}] \Rightarrow P_{n + 1} = P_{n} + P_{n - 1} [∵ P_{n} = {(α)}^{n} + {(β)}^{n}] \Rightarrow 29 = P_{n} + 11 [∵ P_{n - 1} = 11 & P_{n + 1} = 29] \Rightarrow P_{n} = 29 - 11 \Rightarrow P_{n} = 18 \Rightarrow {P_{n}}^{2} = 324$
Hence, the value of ${P_{n}}^{2} = 324$ .

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Let α and β be two real numbers such that α+β=1and αβ=–1. LetPn=(α)n+(β)n,Pn-1=11 and Pn+1=29 for some integer n≥1Then, the value of Pn2 is______________.

Let $α$ and $β$ be two real numbers such that $α + β = 1$ and $α β = - 1$ . Let $P_{n} = {(α)}^{n} + {(β)}^{n}, P_{n - 1} = 11$ and $P_{n + 1} = 29$ for some integer $n \geq 1$ Then, the value of ${P_{n}}^{2}$ is______________.