The expression an-1-bn-1-an-bnis -a- b- 0- is where a and b are unequal non-zero numbers

Let a^n+1+b^n+1/a^n+b^n= a+b/2 ⇒ 2a^n+1+2b^n+1 = a^n+1+b^n+1+ab^n+ba^n ⇒ a^n+1 a^nb+b^n+1 ab^n=0 ⇒ (a b)(a^n b^n)=0 ⇒ a^n= b^n, it is possible for unequal numb ...

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Standard XIII

Mathematics

Geometric Mean

The expressio...

Question

The expression $\frac{a^{n + 1} + b^{n + 1}}{a^{n} + b^{n}} i s [a \neq b \neq 0]$ is (where a and b are unequal non-zero numbers)

A.M. between a and b if n = -1

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G.M. between a and b

= - \frac{1}{2}

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H.M. between a and b if n = 0

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all are correct

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Solution

The correct option is B G.M. between a and b $= - \frac{1}{2}$
$L e t \frac{a^{n + 1} + b^{n + 1}}{a^{n} + b^{n}} = \frac{a + b}{2} \Rightarrow 2 a^{n + 1} + 2 b^{n + 1} = a^{n + 1} + b^{n + 1} + a b^{n} + b a^{n} \Rightarrow a^{n + 1} - a^{n} b + b^{n + 1} - a b^{n} = 0 \Rightarrow (a - b) (a^{n} - b^{n}) = 0 \Rightarrow a^{n} = b^{n}, it is possible for unequal numbers a and b if n = 0 L e t \frac{a^{n + 1} + b^{n + 1}}{a^{n} + b^{n}} = \sqrt{a b} \Rightarrow a^{n + 1} + b^{n + 1} = a^{n + \frac{1}{2}} b^{\frac{1}{2}} + a^{\frac{1}{2}} b^{n + \frac{1}{2}} (a^{n + \frac{1}{2}} - b^{n + \frac{1}{2}}) (\sqrt{a} - \sqrt{b}) = 0 \Rightarrow a^{n + \frac{1}{2}} - b^{n + \frac{1}{2}} = 0, which holds true if n + \frac{1}{2} = 0 \Rightarrow n = - \frac{1}{2} L e t \frac{a^{n + 1} + b^{n + 1}}{a^{n} + b^{n}} = \frac{2 a b}{a + b} \Rightarrow a^{n + 2} + a^{n + 1} b + a b^{n + 1} + b^{n + 2} = 2 a^{n + 1} b + 2 a b^{n + 1} \Rightarrow (a - b) (a^{n + 1} - b^{n + 1}) = 0 \Rightarrow a^{n + 1} - b^{n + 1} = 0 \Rightarrow n = - 1$

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The expression an+1+bn+1an+bnis [a≠b≠0] is (where a and b are unequal non-zero numbers)

The expression $\frac{a^{n + 1} + b^{n + 1}}{a^{n} + b^{n}} i s [a \neq b \neq 0]$ is (where a and b are unequal non-zero numbers)