%3 N0 if N1 mul N2 sub N3 equ N4 fac N4->N0 N4->N1 N4->N2 N4->N3 N4->N4 N5 main N5->N4 N6 10 N7 @ N7->N4 N7->N6 N8 @ N8->N3 N8->N6 N9 0 N10 @ N10->N8 N10->N9 N11 @ N11->N0 N11->N10 N12 1 N13 @ N13->N11 N13->N12 N14 @ N14->N1 N14->N6 N15 @ N15->N2 N15->N6 N16 1 N17 @ N17->N15 N17->N16 N18 @ N18->N4 N18->N17 N19 @ N19->N14 N19->N18 N20 @ N20->N13 N20->N19 N21 1 N22 @ N22->N3 N22->N17 N23 0 N24 @ N24->N22 N24->N23 N25 @ N25->N0 N25->N24 N26 1 N27 @ N27->N25 N27->N26 N28 @ N28->N1 N28->N17 N29 @ N29->N2 N29->N17 N30 1 N31 @ N31->N29 N31->N30 N32 @ N32->N4 N32->N31 N33 @ N33->N28 N33->N32 N34 @ N34->N27 N34->N33 N35 9 N36 1 N37 9 N38 @ N38->N3 N38->N31 N39 0 N40 @ N40->N38 N40->N39 N41 @ N41->N0 N41->N40 N42 1 N43 @ N43->N41 N43->N42 N44 @ N44->N1 N44->N31 N45 @ N45->N2 N45->N31 N46 1 N47 @ N47->N45 N47->N46 N48 @ N48->N4 N48->N47 N49 @ N49->N44 N49->N48 N50 @ N50->N43 N50->N49 N51 9 N52 8 N53 1 N54 9 N55 8 N56 @ N56->N3 N56->N47 N57 0 N58 @ N58->N56 N58->N57 N59 @ N59->N0 N59->N58 N60 1 N61 @ N61->N59 N61->N60 N62 @ N62->N1 N62->N47 N63 @ N63->N2 N63->N47 N64 1 N65 @ N65->N63 N65->N64 N66 @ N66->N4 N66->N65 N67 @ N67->N62 N67->N66 N68 @ N68->N61 N68->N67 N69 9 N70 8 N71 7 N72 1 N73 9 N74 8 N75 7 N76 @ N76->N3 N76->N65 N77 0 N78 @ N78->N76 N78->N77 N79 @ N79->N0 N79->N78 N80 1 N81 @ N81->N79 N81->N80 N82 @ N82->N1 N82->N65 N83 @ N83->N2 N83->N65 N84 1 N85 @ N85->N83 N85->N84 N86 @ N86->N4 N86->N85 N87 @ N87->N82 N87->N86 N88 @ N88->N81 N88->N87 N89 9 N90 8 N91 7 N92 6 N93 1 N94 9 N95 8 N96 7 N97 6 N98 @ N98->N3 N98->N85 N99 0 N100 @ N100->N98 N100->N99 N101 @ N101->N0 N101->N100 N102 1 N103 @ N103->N101 N103->N102 N104 @ N104->N1 N104->N85 N105 @ N105->N2 N105->N85 N106 1 N107 @ N107->N105 N107->N106 N108 @ N108->N4 N108->N107 N109 @ N109->N104 N109->N108 N110 @ N110->N103 N110->N109 N111 9 N112 8 N113 7 N114 6 N115 5 N116 1 N117 9 N118 8 N119 7 N120 6 N121 5 N122 @ N122->N3 N122->N107 N123 0 N124 @ N124->N122 N124->N123 N125 @ N125->N0 N125->N124 N126 1 N127 @ N127->N125 N127->N126 N128 @ N128->N1 N128->N107 N129 @ N129->N2 N129->N107 N130 1 N131 @ N131->N129 N131->N130 N132 @ N132->N4 N132->N131 N133 @ N133->N128 N133->N132 N134 @ N134->N127 N134->N133 N135 9 N136 8 N137 7 N138 6 N139 5 N140 4 N141 1 N142 9 N143 8 N144 7 N145 6 N146 5 N147 4 N148 @ N148->N3 N148->N131 N149 0 N150 @ N150->N148 N150->N149 N151 @ N151->N0 N151->N150 N152 1 N153 @ N153->N151 N153->N152 N154 @ N154->N1 N154->N131 N155 @ N155->N2 N155->N131 N156 1 N157 @ N157->N155 N157->N156 N158 @ N158->N4 N158->N157 N159 @ N159->N154 N159->N158 N160 @ N160->N153 N160->N159 N161 9 N162 8 N163 7 N164 6 N165 5 N166 4 N167 3 N168 1 N169 9 N170 8 N171 7 N172 6 N173 5 N174 4 N175 3 N176 @ N176->N3 N176->N157 N177 0 N178 @ N178->N176 N178->N177 N179 @ N179->N0 N179->N178 N180 1 N181 @ N181->N179 N181->N180 N182 @ N182->N1 N182->N157 N183 @ N183->N2 N183->N157 N184 1 N185 @ N185->N183 N185->N184 N186 @ N186->N4 N186->N185 N187 @ N187->N182 N187->N186 N188 @ N188->N181 N188->N187 N189 9 N190 8 N191 7 N192 6 N193 5 N194 4 N195 3 N196 2 N197 1 N198 9 N199 8 N200 7 N201 6 N202 5 N203 4 N204 3 N205 2 N206 @ N206->N3 N206->N185 N207 0 N208 @ N208->N206 N208->N207 N209 @ N209->N0 N209->N208 N210 1 N211 @ N211->N209 N211->N210 N212 @ N212->N1 N212->N185 N213 @ N213->N2 N213->N185 N214 1 N215 @ N215->N213 N215->N214 N216 @ N216->N4 N216->N215 N217 @ N217->N212 N217->N216 N218 @ N218->N211 N218->N217 N219 9 N220 8 N221 7 N222 6 N223 5 N224 4 N225 3 N226 2 N227 1 N228 1 N229 9 N230 8 N231 7 N232 6 N233 5 N234 4 N235 3 N236 2 N237 1 N238 @ N238->N3 N238->N215 N239 0 N240 @ N240->N238 N240->N239 N241 @ N241->N0 N241->N240 N242 1 N243 @ N243->N241 N243->N242 N244 @ N244->N1 N244->N215 N245 @ N245->N2 N245->N215 N246 1 N247 @ N247->N245 N247->N246 N248 @ N248->N4 N248->N247 N249 @ N249->N244 N249->N248 N250 @ N250->N243 N250->N249 N251 9 N252 8 N253 7 N254 6 N255 5 N256 4 N257 3 N258 2 N259 1 N260 0 N261 0 N262 1 N263 2 N264 6 N265 24 N266 120 N267 720 N268 5040 N269 40320 N270 362880 N271 3628800 stack stack stack->N271