We present the first polylogarithmic-round algorithm for sampling a random spanning tree in the (Broadcast) Congested Clique model. For any constant c>0, our algorithm outputs a sample from a distribution whose total variation distance from the uniform spanning tree distribution is at most O(n−c) in at most c⋅logO(1)(n) rounds. The exponent hidden in logO(1)(n) is an absolute constant independent of c and n. This is an exponential improvement over the previous best algorithm of Pemmaraju, Roy, and Sobel (PODC 2025) for the Congested Clique model.