Let a,b,c be real numbers such that a+b+c<0 and the quadratic equation ax2+bx+c=0 has imaginary roots. Then
A
a>0,c<0
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B
a<0,c>0
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C
a>0,c>0
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D
a<0,c<0
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Solution
The correct option is Da<0,c<0 ax2+bx+c=0 has imaginary roots ⇒f(x)=ax2+bx+c does not intersect x-axis for any real x. Thus, its graph is either an upward opening parabola lying completely above the x-axis or its a downward opening parabola lying completely below the x-axis.
Since, f(1)=a+b+c<0.
So, it lies completely below the x-axis. ⇒a<0
Also D<0 ⇒b2−4ac<0 ⇒b2<4ac ⇒a and c will have the same sign.