The value(s) of a for which two curves y...

The value(s) of a for which two curves `y=ax^(2)+ax+(1)/(24)andx=ay^(2)+ay+(1)/(24)` touch each other is/are

`(2)/(3)`

`(1)/(3)`

`(3)/(2)`

`(1)/(2)`

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The correct Answer is:

A, C

1,3 The two curves are symmetric about the line y=x.
Hence, they touch each other on y=x.
So, the point of contact is `(alpha,alpha)`.
From any of the equations, we get
`alpha=aalpha^(2)+aalpha+(1)/(24)`
`or24aalpha^(2)+24alpha(a-1)+1=0`
This equation should have Identical roots.
`rArrD=0`
`rArr(24)^(2)(a-1)^(2)-4(24a)=0`
`rArr6a^(2)-13a+6=0`
`rArr(2a-3)(3a-2)=0`
`rArra=3//2,2//3`

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