The value of - so that the geometric mean of x and y- where x - y is x -2- y -2- x -1- y -1- isA- -2-3B- -1-3C- -5-27D- 1-6

The correct option is C 32The G.M between x and y = √(xy) Now, x^α+2+y^α+2x^α+1+y^α+1=√(xy) ⇒ y×(xy)^α+2+1(xy)^α+1+1 = √(xy) ⇒ nbsp;(xy)^α+2+1(xy)^α+1+1 = √ ...

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Byju's Answer

Standard XII

Mathematics

Insertion of GP's between 2 Numbers

The value of ...

Question

The value of $α$ so that the geometric mean of $x$ and $y$ , where $x \neq y$ is $\frac{x^{α + 2} + y^{α + 2}}{x^{α + 1} + y^{α + 1}}$ , is

- \frac{2}{3}

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- \frac{1}{4}

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- \frac{3}{2}

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\frac{7}{6}

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Solution

The correct option is C $- \frac{3}{2}$
The $G . M$ between $x$ and $y$
$= \sqrt{x y}$
Now,
$\frac{x^{α + 2} + y^{α + 2}}{x^{α + 1} + y^{α + 1}} = \sqrt{x y} \Rightarrow y \times \frac{{(\frac{x}{y})}^{α + 2} + 1}{{(\frac{x}{y})}^{α + 1} + 1} = \sqrt{x y} \Rightarrow \frac{{(\frac{x}{y})}^{α + 2} + 1}{{(\frac{x}{y})}^{α + 1} + 1} = \sqrt{\frac{x}{y}}$
Assuming $t = \frac{x}{y}$ , we get
$\Rightarrow \frac{t^{α + 2} + 1}{t^{α + 1} + 1} = \sqrt{t} \Rightarrow t^{α + 2} + 1 - t^{α + 3 / 2} - t^{1 / 2} = 0 \Rightarrow (t^{α + 3 / 2} - 1) (t^{1 / 2} - 1) = 0 \Rightarrow t^{α + 3 / 2} = 1 or t = 1 \Rightarrow α = - \frac{3}{2} or t = 1$
When $t = 1$ , we get
$x = y$

Hence, $α = - \frac{3}{2}$

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The value of α so that the geometric mean of x and y, where x≠y is xα+2+yα+2xα+1+yα+1, is

The value of $α$ so that the geometric mean of $x$ and $y$ , where $x \neq y$ is $\frac{x^{α + 2} + y^{α + 2}}{x^{α + 1} + y^{α + 1}}$ , is