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If $x^2-ax+b=0$ and $x^2-cx+d=0$ have a common root, then show that $ab,bc,ad $ are in an arithmetic progression

When I use the relationship for the common root for qudratic equations, i end up with $(c-a)(ad-bc)=(b-d)^2$. By solving this i cannot obtain $2bc=ab+ad$. Is there any more thing to concern? Or the question is wrong(some data missing)?

  • $x^2-1$ and $x^2-3x+2$ have a common root ($x=1$) but $0,-3,0$ are not in arithmetic progression. – mercio Nov 06 '16 at 19:02

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