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Question

For a>0, let the curves C1:y2=ax and C2x2=ay intersect at origin and a point .

Let the line x=b(0<b<a) intersect the chord and the x-axis at points and , respectively.

If the line x=b bisects the area bounded by the curves, C1 and C2 , and the area of ΔOQR=12, then ‘a’ satisfies the equation


A

x612x3+4=0

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B

x612x34=0

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C

x6+6x34=0

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D

x66x3+4=0

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Solution

The correct option is A

x612x3+4=0


Explanation for the correct option:

Draw the graph of the given equations:

Given, ΔOQR=12

12×b×b=12

b=1

Now, According to the question

01ax-x2adx=120aax-x2adx

23a-13a=a26

2a-1a=a22

4a-2a=a2

4aa-2=a3

4aa=2+a3

4aa2=2+a32

16a3=4+a6+4a3

a6-12a3+4=0

Hence, Option ‘A’ is Correct.


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