If x2+b1x+c1=0 and x2+b2x+c2=0 are the two quadratic equations such that b1b2=2(c1+c2) and b1,b2,c1,c2∈R, then
A
at least one equation has real roots
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B
Both the equations will have real roots
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C
Both the equations will have imaginary roots
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D
at least one equation has imaginary roots
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Solution
The correct option is A at least one equation has real roots Let D1 and D2 be discriminants of x2+b1x+c1=0 and x2+b2x+c2=0, respectively. Then, D1+D2=b21−4c1+b22−4c2 =(b21+b22)−4(c1+c2) =b21+b22−2b1b2 =(b1−b2)2≥0 ⇒ At least one of D1,D2 is non-negative.
Hence, at least one of the equations has real roots.