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
A
−23
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B
−14
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C
−32
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D
76
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Solution
The correct option is C−32 The G.M between x and y =√xy
Now, xα+2+yα+2xα+1+yα+1=√xy⇒y×(xy)α+2+1(xy)α+1+1=√xy⇒(xy)α+2+1(xy)α+1+1=√xy
Assuming t=xy, we get ⇒tα+2+1tα+1+1=√t⇒tα+2+1−tα+3/2−t1/2=0⇒(tα+3/2−1)(t1/2−1)=0⇒tα+3/2=1 or t=1⇒α=−32 or t=1
When t=1, we get x=y