If 1,log9(31−x+2)log3(4.3x−1) are in A.P., then x equals
A
log34
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B
1+log34
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C
1−log34
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D
log43
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Solution
The correct option is C1−log34 1,log9(31−x+2),log3(4.3x−1)areinA.P.⇒2log9(31−x+2)=1+log3(4.3x−1)log3(31−x+2)=log33+log3(4.3x−1)log3(31−x+2)=log3[3(4.3x−1)]31−x+2=3(4.3x−1)(Put3x=t)3t+2=12t−3or12t2−5t−3=0; Hence t=−13,34⇒3x=34→x=log3(34)orx=log33−log34⇒x=1−log34