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Using the equation \( \left(K=e^{-\Delta G} G^{\top} / R T\right) \), the reaction spontaneity can be interpreted in terms of the value of \( \Delta G^{\circ} \) is/are
(a) If \( \Delta G^{\ominus}0 \), then \( -\Delta G, \theta / R T \) is positive, and \( e^{-\Delta G} \theta / R T1 \) making \( K1 \), which implies a spontaneous reaction or the reaction which proceeds in the forward direction to such an extent that the products are present predominantly.
(b) If \( \Delta G G^{\ominus}0 \), then \( -\Delta G, / R T \) is negative, and \( e^{-\Delta G} \Theta / R T \) \( 1 \) making \( k1 \), which implies a non-spontaneous reaction or a reaction which proceeds in the forward direction to such a small degree that only a veryminute quantity of product is formed.
(c) Both (a) and (b)
(d) None of the above
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