Let ABCD be a square of side length 2 un...

Let ABCD be a square of side length 2 units. `C_(2)` is the circle through vertices A, B, C, D and `C_(1)` is the circle touching all the sides of the square ABCD. L is a line through A
A line M through A is drawn parallel to BD. Point S moves such that its distances from the line BD and the vertex A are equal. If locus of S cuts. M at `T_(2)` and `T_(3)` and AC at `T_(1)`, then area of `DeltaT_(1)T_(2)T_(3)` is

`(1)/(2)` sq. unit

`(2)/(3)` sq. unit

1 sq. unit

2 sq. unit

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