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Divisibilityhard
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Suppose n>1n > 1n>1 is an integer such that 3n−2n3^n - 2^n3n−2n is a power of a prime (i.e., 3n−2n=pk3^n - 2^n = p^k3n−2n=pk for some prime ppp and integer k≥1k \ge 1k≥1). Which of the following statements must be true?