A372259 Numbers k which have a factorization k = f_1*f_2*...*f_r where f_i >= 1 and the digits of {k, f_1, f_2, ..., f_r} together give 0,1,...,9 exactly once.
4830, 6970, 7056, 7096, 7290, 7690, 7830, 8370, 8596, 8652, 8790, 8970, 9076, 9360, 9370, 9380, 9670, 9706, 9720, 9730, 9870, 10752, 12780, 14760, 14820, 15628, 15678, 16038, 16704, 17082, 17820, 17920, 18720, 19084, 19240, 20457, 20574, 20754, 21658, 24056, 24507, 25803, 26180, 26910, 27504, 28156, 28651, 30296, 30576, 30752, 31920, 32760, 32890, 34902, 36508, 47320, 58401, 65128, 65821
Offset: 1
Examples
The complete list of terms: 4830 = 1*2*5*7*69 6970 = 1*2*3485 7056 = 1*3*24*98 = 1*3*8*294 7096 = 1*2*3548 7290 = 1*3*5*486 7690 = 1*2*3845 7830 = 1*6*29*45 8370 = 1*2*9*465 8596 = 2*14*307 8652 = 1*4*7*309 8790 = 2*3*1465 8970 = 1*26*345 9076 = 1*2*4538 9360 = 1*5*24*78 = 2*4*15*78 9370 = 1*2*4685 9380 = 2*5*14*67 9670 = 1*2*4835 9706 = 1*2*4853 9720 = 1*3*5*648 9730 = 1*2*4865 9870 = 2*3*1645 10752 = 3*4*896 12780 = 4*5*639 14760 = 5*9*328 14820 = 5*39*76 15628 = 4*3907 15678 = 39*402 16038 = 54*297 = 27*594 16704 = 9*32*58 17082 = 3*5694 17820 = 45*396 = 36*495 17920 = 8*35*64 18720 = 4*5*936 19084 = 52*367 19240 = 8*37*65 20457 = 3*6819 20574 = 6*9*381 20754 = 3*6918 21658 = 7*3094 24056 = 8*31*97 24507 = 3*8169 25803 = 9*47*61 26180 = 4*7*935 26910 = 78*345 27504 = 3*9168 28156 = 4*7039 28651 = 7*4093 30296 = 7*8*541 30576 = 8*42*91 30752 = 4*8*961 31920 = 5*76*84 32760 = 8*45*91 32890 = 46*715 34902 = 6*5817 36508 = 4*9127 47320 = 8*65*91 58401 = 63*927 65128 = 7*9304 65821 = 7*9403
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