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Question

Let a, b, c be non-zero real numbers such that
10(1+cos8x)(ax2+bx+c)dx=20(1+cos8x)(ax2+bx+c)dx
Then the quadratic equation ax2+bx+c=0 has [IIT 1981; CEE 1993]


A

No root in (0, 2)

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B

At least one root in (0, 2)

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C

A double root in (0, 2)

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D

None of these

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Solution

The correct option is B

At least one root in (0, 2)


We have 20f(x)dx=10f(x)dx+21f(x)dx
where f(x)=(ax2+bx+c)(1+cos8x)
If f(x)>0(<0)/xϵ(1,2)then21f(x)dx>0(<0)
Thus f(x)=(1+cos8x)(ax2+bx+c) must be
positive for some value of x in [1,2] and must be
negative for some value of x in [1,2]. As (1+cos8x)1
it follows that if g(x)=ax2+bx+c, then there exist
some α,βϵ(1,2) such that g(α)>0 and g(β)<0.
Since g is continuous on R, therefore there exist
some c between α and β such that g(c)=0.
Thus ax2+bx+c=0 has at least one root in (1,2) and hence in (0,2).


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