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Question

If the roots of the equation 10x3nx254x27=0 are in harmonic progression, then the value of n is

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Solution

10x3nx254x27=0 has roots in H.P.
Putting x=1t
27t3+54t2+nt10=0(1)
So the roots are in A.P.
Let the roots be ad,a,a+d
Sum of roots
ad+a+a+d=54273a=2a=23
As a is one of the root of the equation (1), putting a=23 in the equation (1), we get
27×(827)+54×(49)+n×(23)10=08+242n310=02n3=6n=9

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