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Question

Assertion :If a>0 and b2−ac+c<0,then domain of the function f(x)=√ax2+2bx+c is R Reason: If b2−ac<0,then ax2+2bx+c=0 has imaginary roots.

A
Both Assertion and Reason are correct and Reason is the correct explanation for Assertion
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B
Both Assertion and Reason are correct but Reason is not the correct explanation for Assertion
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C
Assertion is correct but Reason is incorrect
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D
Both Assertion and Reason are incorrect
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Solution

The correct option is B Both Assertion and Reason are correct but Reason is not the correct explanation for Assertion
If a>0, then graph of y=ax2+2bx+c is concave upward.

Also if b2ac<0, then the graph always lies above x -axis.

Hence, ax2+2bx+c>0 for all real values of x. Thus, domain of function f(x)=ax2+2bx+c is R

If b2ac<0, then ax2+2bx+c=0 has imaginary roots.

Then the graph of y=ax2+2bx+c never cuts x -axis, or y is either always positive or always negative.

Hence, both the statements are correct but statement 2 is not correct explanation of statement 1

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