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Let \( f: \vdash - 10,101 \rightarrow R , \) where \( f ( \alpha ) = \sin x + \left[ \frac { x ^ { 2 } } { 4 } \right] \) be an odd function, and \( L \). I denotest the greatest integer function Then set of values of parameter 'a' is \( ( - 10,10 ) - 10 \) (0, 10 \( [ 100 , \infty ) \)

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