If a, b, c are in GP, then the equations ax2+2bx+c=0 and dx2+2ex+f=0 have a common root, if da,eb,fc are in
A
AP
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B
GP
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C
HP
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D
None of these
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Solution
The correct option is A AP Since, a, b, c are in GP ⇒b2=ac
Given, ax2+2bx+c=0 ⇒ax2+2√acx+c=0 ⇒(√ax+√c)2=0⇒x=−√ca
Since, ax2+2bx+c=0 and dx2+2ex+f=0 have common root ∴x=−√ca must satisfy dx2+2ex+f=0 ⇒d.ca−2e√ca+f=0 ⇒da−2e√ac+fc=0 ⇒2eb=da+fc[∵b2=ac]
Hence, da,eb,fc are in an AP