\( \def\pm{{ ‰}} \def\pmf{{ ‰ \phantom.}} \def\pmm{{ ‰ \! ‰}} \def\pmmf{{ ‰ \! ‰ \phantom\%}} \DeclareMathOperator{\antilog}{antilog} \DeclareMathOperator{\arcsec}{arcsec} \DeclareMathOperator{\arccsc}{arccsc} \DeclareMathOperator{\sech}{sech} \DeclareMathOperator{\csch}{csch} \DeclareMathOperator{\arsinh}{arsinh} \DeclareMathOperator{\arcosh}{arcosh} \DeclareMathOperator{\arsech}{arsech} \DeclareMathOperator{\arcsch}{arcsch} \)
Lawrence, Kansas, was settled in the year 1854. The original group of settlers, sponsored by the New England Emigrant Aid Company, are said to have eaten their first meal there on August 1 (which in shorthand would be 8/1/54). Using one copy each of the digits 1, 4, 5, and 8, and any standard operations, create each of the positive integers. All four numbers must be used, but no others. Your solutions will be assigned an exquisiteness level.
Use the online submissions page to get your Integermania solutions posted here! This problem is now in semi-retired status, so you may submit an unlimited number of solutions each month.
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| 1201 (3.6) $\dfrac{5! - 4!}{8\%} + 1$ Steve Wilson, 6/26 Lawrence, KS |
1202 (3.4) $\dfrac{5!}{.1} + \dfrac84$ Steve Wilson, 11/25 Lawrence, KS |
1203 (3.6) $\dfrac{5!}{.1} + \dfrac{4!}{8}$ Steve Wilson, 11/25 Lawrence, KS |
1204 (3.4) $\dfrac{5!}{.1} + 8 - 4$ Steve Wilson, 11/25 Lawrence, KS |
1205 (2.4) $\dfrac{1}{8\%\%} - 45$ Steve Wilson, 11/25 Lawrence, KS |
1206 (2.6) $\dfrac{5}{.\overline{4}\%} + 81$ Steve Wilson, 2/25 Lawrence, KS |
1207 (4.6) $5! \times (\antilog 4)\pm + 8 - 1$ Steve Wilson, 6/26 Lawrence, KS |
1208 (2.6) $\dfrac{1 - .4}{5\%\%} + 8$ Steve Wilson, 6/26 Lawrence, KS |
1209 (4.6) $5! \times (\antilog 4)\pm + 8 + 1$ Steve Wilson, 6/26 Lawrence, KS |
1210 (3.4) $5! \times 8 + \dfrac{1}{4\pmf}$ Steve Wilson, 2/25 Lawrence, KS |
|
| 1211 (4.2) $\dfrac{8}{\left(\sqrt{.\overline{4}}\right)\%} + \sqrt{5! + 1}$ Steve Wilson, 6/26 Lawrence, KS |
1212 (3.4) $\dfrac{5!}{.1} + 8 + 4$ Steve Wilson, 11/25 Lawrence, KS |
1213 (3.8) $\dfrac{4}{\left(\sqrt{.\overline{1}}\right)\%} + 8 + 5$ Steve Wilson, 6/26 Lawrence, KS |
1214 (4.0) $\sqrt{\dfrac{8}{.\overline{5}\%\pmf}} + 14$ Steve Wilson, 6/26 Lawrence, KS |
1215 (3.8) $\dfrac{8}{\left(\sqrt{.\overline{4}}\right)\%} + 15$ Steve Wilson, 6/26 Lawrence, KS |
1216 (3.6) $\dfrac{5!}{.1} + 8 \times \sqrt{4}$ Steve Wilson, 11/25 Lawrence, KS |
1217 (2.6) $\dfrac{5 - .1}{.4\%} - 8$ Steve Wilson, 6/26 Lawrence, KS |
1218 (3.8) $\dfrac{5!}{.1} + \dfrac{8}{.\overline{4}}$ Steve Wilson, 6/26 Lawrence, KS |
1220 (3.4) $(5 + 1)! + \dfrac{4}{8\pmf}$ Steve Wilson, 2/25 Lawrence, KS |
||
| 1221 (3.6) $\dfrac{1}{8\%\%} - 4! - 5$ Steve Wilson, 6/26 Lawrence, KS |
1223 (3.0) $\dfrac{5 - .1 - .8\%}{.4\%}$ Steve Wilson, 6/26 Lawrence, KS |
1224 (3.6) $\dfrac{5!}{.1} + (8 - 4)!$ Steve Wilson, 11/25 Lawrence, KS |
1225 (2.8) $\dfrac{5 - .1}{(.8 - .4)\%}$ Steve Wilson, 6/26 Lawrence, KS |
1226 (3.6) $\dfrac{1^5}{8\%\%} - 4!$ Steve Wilson, 6/26 Lawrence, KS |
1227 (4.8) $\dfrac{(\antilog 5)\%}{.8} - 4! + 1$ Steve Wilson, 6/26 Lawrence, KS |
1228 (3.6) $\dfrac{5! + \sqrt{4}}{.1} + 8$ Steve Wilson, 6/26 Lawrence, KS |
1229 (2.6) $\dfrac{5 - 8\%}{.4\%} - 1$ Steve Wilson, 6/26 Lawrence, KS |
1230 (2.4) $\dfrac{1}{8\%\%} - 4 \times 5$ Steve Wilson, 11/25 Lawrence, KS |
||
| 1231 (2.6) $\dfrac{5 - 8\%}{.4\%} + 1$ Steve Wilson, 6/26 Lawrence, KS |
1232 (2.0) $154 \times 8$ Steve Wilson, 11/25 Lawrence, KS |
1233 (2.6) $\dfrac{5 - .1}{.4\%} + 8$ Steve Wilson, 6/26 Lawrence, KS |
1234 (3.6) $\dfrac{1}{8\%\%} - \sqrt[.5]{4}$ Steve Wilson, 6/26 Lawrence, KS |
1235 (4.2) $\dfrac{\antilog 4}{8} - 15$ Steve Wilson, 6/26 Lawrence, KS |
1236 (4.6) $\dfrac{(\antilog 5)\%}{.8} - 14$ Steve Wilson, 6/26 Lawrence, KS |
1237 (4.8) $\dfrac{\antilog 4}{8}$ $\phantom. - \log((\antilog 15)\%)$ Steve Wilson, 7/26 Lawrence, KS |
1238 (3.8) $\dfrac{1}{8\%\%} - 4! \times .5$ Steve Wilson, 6/26 Lawrence, KS |
1239 (4.8) $\cot\arctan(8\%\%)$ $\phantom. - 15 + 4$ Steve Wilson, 6/26 Lawrence, KS |
1240 (3.4) $\dfrac{5! + 8 - 4}{.1}$ Steve Wilson, 6/26 Lawrence, KS |
|
| 1241 (2.4) $\dfrac{5}{.4\%} - 8 - 1$ Steve Wilson, 11/25 Lawrence, KS |
1242 (2.4) $\dfrac{5}{.4\%} - 8 \times 1$ Steve Wilson, 11/25 Lawrence, KS |
1243 (2.4) $\dfrac{5}{.4\%} - 8 + 1$ Steve Wilson, 11/25 Lawrence, KS |
1244 (3.6) $\dfrac{5}{4\pmf} - (\sqrt{8 + 1})!$ Steve Wilson, 6/26 Lawrence, KS |
1245 (3.4) $\dfrac{1^4}{8\%\%} - 5$ Steve Wilson, 6/26 Lawrence, KS |
1246 (3.4) $\dfrac{1^5}{8\%\%} - 4$ Steve Wilson, 6/26 Lawrence, KS |
1247 (2.8) $\dfrac{5 - .8\%}{.4\%} - 1$ Steve Wilson, 11/25 Lawrence, KS |
1248 (2.6) $\dfrac{1}{8\%\%} - 5 \times .4$ Steve Wilson, 11/25 Lawrence, KS |
1249 (2.4) $\dfrac{1}{8\%\%} - 5 + 4$ Steve Wilson, 11/25 Lawrence, KS |
1250 (2.4) $\dfrac{1}{8\%\%} \times (5 - 4)$ Steve Wilson, 11/25 Lawrence, KS |
|
| 1251 (2.4) $\dfrac{1}{8\%\%} + 5 - 4$ Steve Wilson, 11/25 Lawrence, KS |
1252 (2.6) $\dfrac{1}{8\%\%} + 5 \times .4$ Steve Wilson, 11/25 Lawrence, KS |
1253 (2.8) $\dfrac{5 + .8\%}{.4\%} + 1$ Steve Wilson, 11/25 Lawrence, KS |
1254 (3.4) $\dfrac{1^5}{8\%\%} + 4$ Steve Wilson, 6/26 Lawrence, KS |
1255 (3.2) $\dfrac{(8 - 1)!}{4} - 5$ Steve Wilson, 6/26 Lawrence, KS |
1256 (3.6) $\dfrac{5}{4\pmf} + (\sqrt{8 + 1})!$ Steve Wilson, 6/26 Lawrence, KS |
1257 (2.4) $\dfrac{5}{.4\%} + 8 - 1$ Steve Wilson, 11/25 Lawrence, KS |
1258 (2.4) $\dfrac{5}{.4\%} + 8 \times 1$ Steve Wilson, 11/25 Lawrence, KS |
1259 (2.4) $\dfrac{5}{.4\%} + 8 + 1$ Steve Wilson, 11/25 Lawrence, KS |
1260 (2.0) $84 \times 15$ J.P. Gitau, 12/21 Lawrence, KS |
|
| 1261 (3.4) $\dfrac{8!}{\sqrt{4^5}} + 1$ Steve Wilson, 6/26 Lawrence, KS |
1262 (3.8) $\dfrac{1}{8\%\%} + 4! \times .5$ Steve Wilson, 6/26 Lawrence, KS |
1263 (4.8) $\dfrac{8!}{\sqrt{4^5}} - \log(1\pm)$ Steve Wilson, 7/26 Lawrence, KS |
1264 (3.6) $\dfrac{5!}{.1} + \sqrt{8^4}$ Steve Wilson, 6/26 Lawrence, KS |
1265 (3.2) $\dfrac{(8 - 1)!}{4} + 5$ Steve Wilson, 6/26 Lawrence, KS |
1266 (3.6) $\dfrac{1}{8\%\%} + \sqrt[.5]{4}$ Steve Wilson, 6/26 Lawrence, KS |
1267 (2.2) $\dfrac{51}{4\%} - 8$ Steve Wilson, 6/26 Lawrence, KS |
1268 (2.4) $\dfrac{5}{.4\%} + 18$ Steve Wilson, 11/25 Lawrence, KS |
1269 (2.6) $\dfrac{5 + 8\%}{.4\%} - 1$ Steve Wilson, 11/25 Lawrence, KS |
1270 (2.4) $\dfrac{1}{8\%\%} + 4 \times 5$ Steve Wilson, 11/25 Lawrence, KS |
|
| 1271 (2.6) $\dfrac{5 + 8\%}{.4\%} + 1$ Steve Wilson, 11/25 Lawrence, KS |
1272 (4.8) $4! \times (58 + \log(1\%\pm))$ Steve Wilson, 6/26 Lawrence, KS |
1273 (2.8) $\dfrac{5.1 - .8\%}{.4\%}$ Steve Wilson, 6/26 Lawrence, KS |
1274 (3.6) $\dfrac{1^5}{8\%\%} + 4!$ Steve Wilson, 6/26 Lawrence, KS |
1275 (2.2) $\dfrac{51}{(8 - 4)\%}$ Steve Wilson, 6/26 Lawrence, KS |
1276 (3.4) $\dfrac{8 + 5}{1\%} - 4!$ Steve Wilson, 6/26 Lawrence, KS |
1277 (2.8) $\dfrac{5.1 + .8\%}{.4\%}$ Steve Wilson, 6/26 Lawrence, KS |
1278 (3.6) $\dfrac{5! + 8}{.1} - \sqrt{4}$ Steve Wilson, 6/26 Lawrence, KS |
1279 (3.6) $\dfrac{1}{8\%\%} + 4! + 5$ Steve Wilson, 6/26 Lawrence, KS |
1280 (3.4) $\dfrac{5 \times 4! + 8}{.1}$ Steve Wilson, 11/25 Lawrence, KS |
|
| 1281 (4.6) $(\log((\antilog 8)\%))^4 - 15$ Steve Wilson, 6/26 Lawrence, KS |
1282 (3.6) $\dfrac{5! + 8}{.1} + \sqrt{4}$ Steve Wilson, 6/26 Lawrence, KS |
1283 (2.2) $\dfrac{51}{4\%} + 8$ Steve Wilson, 6/26 Lawrence, KS |
1284 (3.4) $\dfrac{5!}{.1} + 84$ Steve Wilson, 11/25 Lawrence, KS |
1285 (3.8) $\dfrac{4}{\left(\sqrt{.\overline{1}}\right)\%} + 85$ Steve Wilson, 6/26 Lawrence, KS |
1286 (4.4) $(8 - 5)!^4 - \antilog 1$ Steve Wilson, 6/26 Lawrence, KS |
1287 (4.8) $(\log((\antilog 5)\%))!^4$ $\phantom. - 8 - 1$ Steve Wilson, 6/26 Lawrence, KS |
1288 (3.0) $(5 + 1)^4 - 8$ Steve Wilson, 6/26 Lawrence, KS |
1289 (4.8) $(\log((\antilog 5)\%))!^4$ $\phantom. - 8 + 1$ Steve Wilson, 6/26 Lawrence, KS |
1290 (3.4) $\dfrac{(8 - 1)! + 5!}{4}$ Steve Wilson, 6/26 Lawrence, KS |
|
| 1291 (4.6) $(\sec\arctan\sqrt{5})^8 - 4 - 1$ Steve Wilson, 6/26 Lawrence, KS |
1292 (4.6) $(\sec\arctan\sqrt{5})^8 - 4 \times 1$ Steve Wilson, 6/26 Lawrence, KS |
1293 (4.6) $(\sec\arctan\sqrt{5})^8 - 4 + 1$ Steve Wilson, 6/26 Lawrence, KS |
1294 (4.8) $(\sec\arctan\sqrt{5})^8$ $\phantom. - 1 \times \sqrt{4}$ Steve Wilson, 6/26 Lawrence, KS |
1295 (2.2) $\dfrac{518}{.4}$ Steve Wilson, 6/26 Lawrence, KS |
1296 (2.2) $\dfrac{8 + 5}{1\%} - 4$ Steve Wilson, 6/26 Lawrence, KS |
1297 (3.2) $(8 - 5)!^4 + 1$ Steve Wilson, 6/26 Lawrence, KS |
1298 (3.4) $\dfrac{8 + 5}{1\%} - \sqrt{4}$ Steve Wilson, 6/26 Lawrence, KS |
1299 (4.0) $8! \times \sqrt{.\overline{1}\%} - 45$ Steve Wilson, 7/26 Lawrence, KS |
1300 (2.8) $\dfrac{4 - .1}{(.8 - .5)\%}$ Steve Wilson, 6/26 Lawrence, KS |
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| 1301 (4.6) $(\sec\arctan\sqrt{5})^8 + 4 + 1$ Steve Wilson, 6/26 Lawrence, KS |
1302 (3.4) $\dfrac{8 + 5}{1\%} + \sqrt{4}$ Steve Wilson, 6/26 Lawrence, KS |
1303 (4.8) $(\log((\antilog 5)\%))!^4$ $\phantom. + 8 - 1$ Steve Wilson, 6/26 Lawrence, KS |
1304 (2.2) $\dfrac{8 + 5}{1\%} + 4$ Steve Wilson, 6/26 Lawrence, KS |
1305 (2.6) $\dfrac{5.8}{.\overline{4}\%} \times 1$ Steve Wilson, 6/26 Lawrence, KS |
1306 (2.6) $\dfrac{5.8}{.\overline{4}\%} + 1$ Steve Wilson, 6/26 Lawrence, KS |
1307 (3.8) $\dfrac{8!\% + 5!}{.4} - 1$ Steve Wilson, 6/26 Lawrence, KS |
1308 (3.8) $\dfrac{8!\% + 5!}{.4} \times 1$ Steve Wilson, 6/26 Lawrence, KS |
1309 (3.8) $\dfrac{8!\% + 5!}{.4} + 1$ Steve Wilson, 6/26 Lawrence, KS |
1310 (3.8) $\dfrac{\dfrac{5!}{.\overline{8}} - 4}{.1}$ Steve Wilson, 6/26 Lawrence, KS |
|
| 1312 (4.2) $8! \times \sqrt{.\overline{1}\%} - \sqrt{4^5}$ Steve Wilson, 7/26 Lawrence, KS |
1313 (4.4) $(\antilog\sqrt{4} + 1)$ $\phantom. \times (8 + 5)$ Steve Wilson, 6/26 Lawrence, KS |
1314 (4.2) $8! \times \sqrt{.\overline{1}\%} - \dfrac{5!}{4}$ Steve Wilson, 7/26 Lawrence, KS |
1315 (4.2) $8! \times \sqrt{.\overline{1}\%} - 4! - 5$ Steve Wilson, 7/26 Lawrence, KS |
1319 (4.2) $8! \times \sqrt{.\overline{1}\%} - \sqrt{5^4}$ Steve Wilson, 7/26 Lawrence, KS |
1320 (2.4) $\dfrac{8 - 1.4}{.5\%}$ Steve Wilson, 6/26 Lawrence, KS |
|||||
| 1322 (3.2) $\dfrac{1}{8\%\%} + \dfrac{.4}{.\overline{5}\%}$ Steve Wilson, 6/26 Lawrence, KS |
1324 (3.4) $\dfrac{8 + 5}{1\%} + 4!$ Steve Wilson, 6/26 Lawrence, KS |
1325 (3.4) $\dfrac{5! - 14}{8\%}$ Steve Wilson, 6/26 Lawrence, KS |
1326 (4.0) $\dfrac{5!}{.1 \times .\overline{8}} - 4!$ Steve Wilson, 7/26 Lawrence, KS |
1327 (4.2) $\dfrac{5!\%}{.\overline{8}\pmf} - 4! + 1$ Steve Wilson, 7/26 Lawrence, KS |
1328 (4.2) $8! \times \sqrt{.\overline{1}\%} - \sqrt[.5]{4}$ Steve Wilson, 7/26 Lawrence, KS |
1329 (4.8) $\dfrac{5}{4\pmf} + \log((\antilog 81)\%)$ Steve Wilson, 7/26 Lawrence, KS |
1330 (2.6) $\dfrac{5}{.4\%} + \dfrac{8}{.1}$ Steve Wilson, 11/25 Lawrence, KS |
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| 1331 (2.4) $\dfrac{5}{.4\%} + 81$ Steve Wilson, 11/25 Lawrence, KS |
1332 (2.6) $\dfrac{8.4 - 1}{.\overline{5}\%}$ Steve Wilson, 6/26 Lawrence, KS |
1334 (3.2) $58 \times (4! - 1)$ Steve Wilson, 6/26 Lawrence, KS |
1335 (4.0) $8! \times \sqrt{.\overline{1}\%} - 5 - 4$ Steve Wilson, 7/26 Lawrence, KS |
1336 (4.2) $8! \times \sqrt{.\overline{1}\%} - \dfrac{4}{.5}$ Steve Wilson, 7/26 Lawrence, KS |
1337 (4.2) $8! \times \sqrt{.\overline{1}\%} - 5 - \sqrt{4}$ Steve Wilson, 7/26 Lawrence, KS |
1338 (4.4) $8! \times \sqrt{.\overline{1}\%} - (5 - \sqrt{4})!$ Steve Wilson, 7/26 Lawrence, KS |
1339 (4.4) $8! \times \sqrt{.\overline{1}\%} - \sqrt{\sqrt{5^4}}$ Steve Wilson, 7/26 Lawrence, KS |
1340 (2.2) $\dfrac{8 + 5.4}{1\%}$ Steve Wilson, 6/26 Lawrence, KS |
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| 1341 (4.2) $8! \times \sqrt{.\overline{1}\%} - 5 + \sqrt{4}$ Steve Wilson, 7/26 Lawrence, KS |
1342 (3.2) $\dfrac{8 - .1 - .\overline{4}}{.\overline{5}\%}$ Steve Wilson, 6/26 Lawrence, KS |
1343 (4.0) $8! \times \sqrt{.\overline{1}\%} - 5 + 4$ Steve Wilson, 7/26 Lawrence, KS |
1344 (3.4) $\dfrac{8!}{15 \times \sqrt{4}}$ Steve Wilson, 6/26 Lawrence, KS |
1345 (4.0) $\dfrac{\sqrt{5! + 1} - 4!\%}{8\pmf}$ Steve Wilson, 6/26 Lawrence, KS |
1346 (3.8) $\dfrac{5!}{.1 \times .\overline{8}} - 4$ Steve Wilson, 6/26 Lawrence, KS |
1347 (4.0) $\dfrac{5!\%}{.\overline{8}\pmf} - 4 + 1$ Steve Wilson, 7/26 Lawrence, KS |
1348 (3.2) $\dfrac{8 - .\overline{1} - .4}{.\overline{5}\%}$ Steve Wilson, 6/26 Lawrence, KS |
1349 (4.0) $\dfrac{5!\%}{.\overline{8}\pmf} - 1^4$ Steve Wilson, 7/26 Lawrence, KS |
1350 (3.8) $\dfrac{5 \times 4!}{.1 \times .\overline{8}}$ Steve Wilson, 6/26 Lawrence, KS |
|
| 1351 (3.8) $\dfrac{\sqrt{5! + 1}}{8\pmf} - 4!$ Steve Wilson, 6/26 Lawrence, KS |
1352 (3.6) $\dfrac{8 - 1 - 4!\%}{5\pmf}$ Steve Wilson, 7/26 Lawrence, KS |
1353 (4.0) $\dfrac{5!\%}{.\overline{8}\pmf} + 4 - 1$ Steve Wilson, 7/26 Lawrence, KS |
1354 (3.8) $\dfrac{5!}{.1 \times .\overline{8}} + 4$ Steve Wilson, 6/26 Lawrence, KS |
1355 (4.0) $\dfrac{5!\%}{.\overline{8}\pmf} + 4 + 1$ Steve Wilson, 7/26 Lawrence, KS |
1356 (4.4) $8! \times \sqrt{.\overline{1}\%} + 4! \times .5$ Steve Wilson, 7/26 Lawrence, KS |
1357 (4.8) $\cosh(4 \times \arcsch\sqrt{8\%})$ $\phantom. + 5 + 1$ Steve Wilson, 7/26 Lawrence, KS |
1358 (3.8) $\dfrac{45}{\sqrt{.\overline{1}\%}} + 8$ Steve Wilson, 6/26 Lawrence, KS |
1359 (3.0) $\dfrac{8 - .\overline{4}}{.\overline{5}\%} - 1$ Steve Wilson, 6/26 Lawrence, KS |
1360 (3.0) $\dfrac{8 - .\overline{4}}{.\overline{5}\%} \times 1$ Steve Wilson, 6/26 Lawrence, KS |
|
| 1361 (3.0) $\dfrac{8 - .\overline{4}}{.\overline{5}\%} + 1$ Steve Wilson, 6/26 Lawrence, KS |
1363 (4.2) $8! \times \sqrt{.\overline{1}\%} + 4! - 5$ Steve Wilson, 7/26 Lawrence, KS |
1364 (4.0) $8! \times \sqrt{.\overline{1}\%} + 5 \times 4$ Steve Wilson, 7/26 Lawrence, KS |
1366 (4.8) $\cosh(4 \times \arcsch\sqrt{8\%})$ $\phantom. + 15$ Steve Wilson, 7/26 Lawrence, KS |
1367 (2.8) $\dfrac{8 - .4}{.\overline{5}\%} - 1$ Steve Wilson, 6/26 Lawrence, KS |
1368 (2.8) $\dfrac{8 - .4}{.\overline{5}\%} \times 1$ Steve Wilson, 6/26 Lawrence, KS |
1369 (2.8) $\dfrac{8 - .4}{.\overline{5}\%} + 1$ Steve Wilson, 6/26 Lawrence, KS |
1370 (3.8) $\dfrac{\sqrt{5! + 1} - 4\%}{8\pmf}$ Steve Wilson, 6/26 Lawrence, KS |
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| 1371 (3.6) $\dfrac{\sqrt{5! + 1}}{8\pmf} - 4$ Steve Wilson, 6/26 Lawrence, KS |
1372 (4.0) $\dfrac{\sqrt{5! + 1} - 4!\pmf}{8\pmf}$ Steve Wilson, 7/26 Lawrence, KS |
1373 (3.8) $\dfrac{\sqrt{5! + 1}}{8\pmf} - \sqrt{4}$ Steve Wilson, 6/26 Lawrence, KS |
1374 (4.0) $\dfrac{5!}{.1 \times .\overline{8}} + 4!$ Steve Wilson, 7/26 Lawrence, KS |
1375 (3.6) $\dfrac{\sqrt{5! + 1^4}}{8\pmf}$ Steve Wilson, 6/26 Lawrence, KS |
1376 (3.4) $\dfrac{8 - 1}{5\pmf} - 4!$ Steve Wilson, 6/26 Lawrence, KS |
1377 (3.8) $\dfrac{\sqrt{5! + 1}}{8\pmf} + \sqrt{4}$ Steve Wilson, 6/26 Lawrence, KS |
1378 (3.0) $\dfrac{8.1 - .\overline{4}}{.\overline{5}\%}$ Steve Wilson, 6/26 Lawrence, KS |
1379 (3.6) $\dfrac{\sqrt{5! + 1}}{8\pmf} + 4$ Steve Wilson, 6/26 Lawrence, KS |
1380 (3.4) $\dfrac{(8 - 1)!}{4} + 5!$ Steve Wilson, 6/26 Lawrence, KS |
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| 1382 (4.4) $58 \times 4! - \antilog 1$ Steve Wilson, 7/26 Lawrence, KS |
1386 (2.8) $\dfrac{8.1 - .4}{.\overline{5}\%}$ Steve Wilson, 6/26 Lawrence, KS |
1387 (4.8) $58 \times 4! + \log(1\%\pm)$ Steve Wilson, 7/26 Lawrence, KS |
1388 (3.0) $\dfrac{8.\overline{1} - .4}{.\overline{5}\%}$ Steve Wilson, 6/26 Lawrence, KS |
1389 (4.0) $8! \times \sqrt{.\overline{1}\%} + 45$ Steve Wilson, 7/26 Lawrence, KS |
1390 (3.8) $\dfrac{\dfrac{5!}{.\overline{8}} + 4}{.1}$ Steve Wilson, 6/26 Lawrence, KS |
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| 1391 (3.2) $58 \times 4! - 1$ Steve Wilson, 6/26 Lawrence, KS |
1392 (2.6) $\dfrac{8 - 1 - 4\%}{.5\%}$ Steve Wilson, 7/26 Lawrence, KS |
1393 (3.2) $58 \times 4! + 1$ Steve Wilson, 6/26 Lawrence, KS |
1394 (4.6) $58 \times 4! - \log(1\%)$ Steve Wilson, 7/26 Lawrence, KS |
1395 (3.8) $\dfrac{5! + 4}{.1 \times .\overline{8}}$ Steve Wilson, 6/26 Lawrence, KS |
1396 (2.4) $\dfrac{8 - 1}{.5\%} - 4$ Steve Wilson, 6/26 Lawrence, KS |
1397 (4.8) $58 \times 4! - \log(1\%\pm)$ Steve Wilson, 7/26 Lawrence, KS |
1398 (3.4) $\dfrac{8 - 1}{5\pmf} - \sqrt{4}$ Steve Wilson, 6/26 Lawrence, KS |
1399 (2.6) $\dfrac{8}{.\overline{5}\%} - 41$ Steve Wilson, 6/26 Lawrence, KS |
1400 (2.2) $\dfrac{84}{(5 + 1)\%}$ Steve Wilson, 6/26 Lawrence, KS |
|
| 1401 (3.6) $\dfrac{8!}{5! \times 4!} + 1$ Steve Wilson, 7/26 Lawrence, KS |
1402 (3.4) $\dfrac{8 - 1}{5\pmf} + \sqrt{4}$ Steve Wilson, 6/26 Lawrence, KS |
1404 (2.4) $\dfrac{8 - 1}{.5\%} + 4$ Steve Wilson, 6/26 Lawrence, KS |
1405 (4.0) $\dfrac{\sqrt{5! + 1} + 4!\%}{8\pmf}$ Steve Wilson, 6/26 Lawrence, KS |
1408 (2.6) $\dfrac{8 - 1 + 4\%}{.5\%}$ Steve Wilson, 7/26 Lawrence, KS |
1410 (4.6) $\dfrac{8 - 1}{5\pmf} + (\antilog 4)\pm$ Steve Wilson, 6/26 Lawrence, KS |
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| 1413 (4.8) $\log((\antilog((58 + 1)$ $\phantom. \times 4!))\pm)$ Steve Wilson, 7/26 Lawrence, KS |
1414 (4.8) $\log((\antilog((58 + 1)$ $\phantom. \times 4!))\%)$ Steve Wilson, 7/26 Lawrence, KS |
1415 (2.8) $\dfrac{8}{.\overline{5}\%} - \dfrac{1}{4\%}$ Steve Wilson, 6/26 Lawrence, KS |
1416 (3.2) $(58 + 1) \times 4!$ Steve Wilson, 6/26 Lawrence, KS |
1417 (3.8) $\dfrac{8}{.\overline{5}\%} - 4! + 1$ Steve Wilson, 7/26 Lawrence, KS |
1418 (2.8) $\dfrac{8 - .1}{.\overline{5}\%} - 4$ Steve Wilson, 6/26 Lawrence, KS |
1420 (4.0) $\dfrac{8}{.\overline{5}\%} - \dfrac{\sqrt{4}}{.1}$ Steve Wilson, 7/26 Lawrence, KS |
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| 1422 (4.2) $\dfrac{8 - \sqrt{\sqrt{(.1)^4}}}{.\overline{5}\%}$ Steve Wilson, 7/26 Lawrence, KS |
1423 (4.8) $\log\left(\left(\antilog\left(\dfrac{58 - 1}{4\%}\right)\right.\right.$ $\left.\left.\phantom{\dfrac88}\right)\%\right)$ Steve Wilson, 7/26 Lawrence, KS |
1424 (3.4) $((5 + 1)! - 8) \times \sqrt{4}$ Steve Wilson, 6/26 Lawrence, KS |
1425 (2.2) $\dfrac{58 - 1}{4\%}$ Steve Wilson, 6/26 Lawrence, KS |
1426 (2.6) $\dfrac{8}{.\overline{5}\%} - 14$ Steve Wilson, 6/26 Lawrence, KS |
1430 (4.4) $\dfrac{8}{.\overline{5}\%} - \sqrt{\sqrt{.1^{-4}}}$ Steve Wilson, 7/26 Lawrence, KS |
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| 1432 (3.4) $(5 + 1)! \times \sqrt{4} - 8$ Steve Wilson, 6/26 Lawrence, KS |
1434 (3.8) $\dfrac{8}{.\overline{5}\%} - (4 - 1)!$ Steve Wilson, 6/26 Lawrence, KS |
1435 (2.6) $\dfrac{8}{.\overline{5}\%} - 4 - 1$ Steve Wilson, 6/26 Lawrence, KS |
1436 (2.6) $\dfrac{8}{.\overline{5}\%} - 4 \times 1$ Steve Wilson, 6/26 Lawrence, KS |
1437 (2.6) $\dfrac{8}{.\overline{5}\%} - 4 + 1$ Steve Wilson, 6/26 Lawrence, KS |
1438 (3.8) $\dfrac{8}{.\overline{5}\%} - 1 \times \sqrt{4}$ Steve Wilson, 6/26 Lawrence, KS |
1439 (3.6) $\dfrac{8}{.\overline{5}\%} - 1^4$ Steve Wilson, 6/26 Lawrence, KS |
1440 (2.2) $\dfrac{18 \times 4}{5\%}$ Steve Wilson, 6/26 Lawrence, KS |
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| 1441 (3.6) $\dfrac{8}{.\overline{5}\%} + 1^4$ Steve Wilson, 6/26 Lawrence, KS |
1442 (3.8) $\dfrac{8}{.\overline{5}\%} + 1 \times \sqrt{4}$ Steve Wilson, 6/26 Lawrence, KS |
1443 (2.6) $\dfrac{8}{.\overline{5}\%} + 4 - 1$ Steve Wilson, 6/26 Lawrence, KS |
1444 (2.6) $\dfrac{8}{.\overline{5}\%} + 4 \times 1$ Steve Wilson, 6/26 Lawrence, KS |
1445 (2.6) $\dfrac{8}{.\overline{5}\%} + 4 + 1$ Steve Wilson, 6/26 Lawrence, KS |
1446 (3.8) $\dfrac{8}{.\overline{5}\%} + (4 - 1)!$ Steve Wilson, 6/26 Lawrence, KS |
1447 (4.6) $\dfrac{58}{4\%} + \log(1\pm)$ Steve Wilson, 6/26 Lawrence, KS |
1448 (3.4) $(5 + 1)! \times \sqrt{4} + 8$ Steve Wilson, 6/26 Lawrence, KS |
1449 (2.2) $\dfrac{58}{4\%} - 1$ Steve Wilson, 6/26 Lawrence, KS |
1450 (2.2) $\dfrac{58}{4\%} \times 1$ Steve Wilson, 6/26 Lawrence, KS |
|
| 1451 (2.2) $\dfrac{58}{4\%} + 1$ Steve Wilson, 6/26 Lawrence, KS |
1452 (3.8) $\dfrac{5}{\left(\sqrt{.\overline{1}}\right)\%} - 48$ Steve Wilson, 6/26 Lawrence, KS |
1453 (4.6) $\dfrac{58}{4\%} - \log(1\pm)$ Steve Wilson, 6/26 Lawrence, KS |
1454 (2.6) $\dfrac{8}{.\overline{5}\%} + 14$ Steve Wilson, 6/26 Lawrence, KS |
1455 (3.8) $\dfrac{14}{.\overline{8}\%} - 5!$ Steve Wilson, 6/26 Lawrence, KS |
1456 (3.4) $((5 + 1)! + 8) \times \sqrt{4}$ Steve Wilson, 6/26 Lawrence, KS |
1458 (2.0) $1458$ Satchel Koch, 1/22 Lawrence, KS |
1459 (3.4) $\dfrac{5!}{8\%} - 41$ Steve Wilson, 6/26 Lawrence, KS |
1460 (3.6) $\dfrac{5!}{8\%} - \dfrac{4}{.1}$ Steve Wilson, 6/26 Lawrence, KS |
||
| 1462 (2.6) $\dfrac{8.1}{.\overline{5}\%} + 4$ Steve Wilson, 6/26 Lawrence, KS |
1463 (3.8) $\dfrac{8}{.\overline{5}\%} + 4! - 1$ Steve Wilson, 7/26 Lawrence, KS |
1464 (3.8) $\dfrac{5!}{8\%} - \dfrac{4}{.\overline{1}}$ Steve Wilson, 6/26 Lawrence, KS |
1465 (2.8) $\dfrac{8}{.\overline{5}\%} + \dfrac{1}{4\%}$ Steve Wilson, 6/26 Lawrence, KS |
1466 (4.8) $\dfrac{5!}{8\%} - 4! - \antilog 1$ Steve Wilson, 6/26 Lawrence, KS |
1468 (3.8) $\dfrac{5}{\left(\sqrt{.\overline{1}}\right)\%} - 8 \times 4$ Steve Wilson, 6/26 Lawrence, KS |
1470 (4.2) $\dfrac{5}{\left(\sqrt{.\overline{1}}\right)\%} - \dfrac{4!}{.8}$ Steve Wilson, 6/26 Lawrence, KS |
||||
| 1472 (4.8) $\log\left(\left(\antilog\left(\dfrac{51 + 8}{4\%}\right)\right.\right.$ $\left.\left.\phantom{\dfrac88}\right)\pm\right)$ Steve Wilson, 7/26 Lawrence, KS |
1473 (4.8) $\log\left(\left(\antilog\left(\dfrac{51 + 8}{4\%}\right)\right.\right.$ $\left.\left.\phantom{\dfrac88}\right)\%\right)$ Steve Wilson, 7/26 Lawrence, KS |
1474 (3.6) $\dfrac{5! - \sqrt{4}}{8\%} - 1$ Steve Wilson, 6/26 Lawrence, KS |
1475 (2.2) $\dfrac{51 + 8}{4\%}$ Steve Wilson, 6/26 Lawrence, KS |
1476 (3.6) $\dfrac{5!}{8\%} - 4! \times 1$ Steve Wilson, 6/26 Lawrence, KS |
1477 (3.6) $\dfrac{5!}{8\%} - 4! + 1$ Steve Wilson, 6/26 Lawrence, KS |
1478 (4.8) $\log\left(\left(\antilog\left(\dfrac{8.4 - 1}{5\pmf}\right)\right.\right.$ $\left.\left.\phantom{\dfrac88}\right)\%\right)$ Steve Wilson, 7/26 Lawrence, KS |
1479 (4.8) $\log((\antilog 1485)\pmm)$ Steve Wilson, 7/26 Lawrence, KS |
1480 (2.4) $\dfrac{8.4 - 1}{.5\%}$ Steve Wilson, 6/26 Lawrence, KS |
||
| 1481 (2.6) $\dfrac{8}{.\overline{5}\%} + 41$ Steve Wilson, 6/26 Lawrence, KS |
1482 (3.8) $\dfrac{8.1}{.\overline{5}\%} + 4!$ Steve Wilson, 6/26 Lawrence, KS |
1483 (4.6) $\log((\antilog 1485)\%)$ Steve Wilson, 7/26 Lawrence, KS |
1484 (4.0) $\dfrac{5}{\left(\sqrt{.\overline{1}}\right)\%} - 8 \times \sqrt{4}$ Steve Wilson, 6/26 Lawrence, KS |
1485 (2.0) $1485$ Jonathan Frank, 3/24 Rye, NY |
1486 (3.4) $\dfrac{5!}{8\%} - 14$ Steve Wilson, 6/26 Lawrence, KS |
1487 (3.8) $\dfrac{1}{\left(\sqrt{.\overline{4}}\right)\pmf} - 8 - 5$ Steve Wilson, 6/26 Lawrence, KS |
1488 (3.8) $\dfrac{5}{\left(\sqrt{.\overline{1}}\right)\%} - 8 - 4$ Steve Wilson, 6/26 Lawrence, KS |
1489 (4.8) $\log\left(\left(\antilog\left(\dfrac{5 + 1}{4\pmf}\right)\right.\right.$ $\left.\left.\phantom{\dfrac88}\right)\pm\right) - 8$ Steve Wilson, 7/26 Lawrence, KS |
1490 (4.0) $\dfrac{5}{\left(\sqrt{.\overline{1}}\right)\%} - 8 - \sqrt{4}$ Steve Wilson, 6/26 Lawrence, KS |
|
| 1491 (4.0) $\dfrac{5! - ((4 - 1)!)!\pmf}{8\%}$ Steve Wilson, 7/26 Lawrence, KS |
1492 (2.4) $\dfrac{5 + 1}{.4\%} - 8$ Steve Wilson, 2/25 Lawrence, KS |
1493 (4.8) $\dfrac{5!}{8\%} - 4 + \log(1\pm)$ Steve Wilson, 7/26 Lawrence, KS |
1494 (2.8) $\dfrac{8.4 - .1}{.\overline{5}\%}$ Steve Wilson, 6/26 Lawrence, KS |
1495 (3.4) $\dfrac{5!}{8\%} - 4 - 1$ Steve Wilson, 6/26 Lawrence, KS |
1496 (3.4) $\dfrac{5!}{8\%} - 4 \times 1$ Steve Wilson, 6/26 Lawrence, KS |
1497 (3.4) $\dfrac{5!}{8\%} - 4 + 1$ Steve Wilson, 6/26 Lawrence, KS |
1498 (3.6) $\dfrac{5!}{8\%} - 1 \times \sqrt{4}$ Steve Wilson, 6/26 Lawrence, KS |
1499 (3.4) $\dfrac{5!}{8\%} - 1^4$ Steve Wilson, 6/26 Lawrence, KS |
1500 (2.6) $\dfrac{5 + 1}{(.8 - .4)\%}$ Steve Wilson, 6/26 Lawrence, KS |
|
| 1501 (3.4) $\dfrac{5!}{8\%} + 1^4$ Steve Wilson, 6/26 Lawrence, KS |
1502 (3.0) $\dfrac{8.\overline{4} - .1}{.\overline{5}\%}$ Steve Wilson, 6/26 Lawrence, KS |
1503 (3.4) $\dfrac{5!}{8\%} + 4 - 1$ Steve Wilson, 6/26 Lawrence, KS |
1504 (3.4) $\dfrac{5!}{8\%} + 4 \times 1$ Steve Wilson, 6/26 Lawrence, KS |
1505 (3.4) $\dfrac{5!}{8\%} + 4 + 1$ Steve Wilson, 6/26 Lawrence, KS |
1506 (3.6) $\dfrac{5!}{8\%} + (4 - 1)!$ Steve Wilson, 6/26 Lawrence, KS |
1507 (4.8) $\dfrac{5!}{8\%} + 4 - \log(1\pm)$ Steve Wilson, 7/26 Lawrence, KS |
1508 (2.4) $\dfrac{5 + 1}{.4\%} + 8$ Steve Wilson, 2/25 Lawrence, KS |
1509 (4.0) $\dfrac{5! + ((4 - 1)!)!\pmf}{8\%}$ Steve Wilson, 7/26 Lawrence, KS |
1510 (4.0) $\dfrac{5}{\left(\sqrt{.\overline{1}}\right)\%} + 8 + \sqrt{4}$ Steve Wilson, 6/26 Lawrence, KS |
|
| 1511 (2.6) $\dfrac{8.4}{.\overline{5}\%} - 1$ Steve Wilson, 6/26 Lawrence, KS |
1512 (2.6) $\dfrac{8.4}{.\overline{5}\%} \times 1$ Steve Wilson, 6/26 Lawrence, KS |
1513 (2.6) $\dfrac{8.4}{.\overline{5}\%} + 1$ Steve Wilson, 6/26 Lawrence, KS |
1514 (3.4) $\dfrac{5!}{8\%} + 14$ Steve Wilson, 6/26 Lawrence, KS |
1515 (4.2) $\dfrac{5!}{8\%} + \dfrac{1}{\sqrt{.\overline{4}\%}}$ Steve Wilson, 7/26 Lawrence, KS |
1516 (4.0) $\dfrac{5}{\left(\sqrt{.\overline{1}}\right)\%} + 8 \times \sqrt{4}$ Steve Wilson, 6/26 Lawrence, KS |
1517 (4.8) $\dfrac{8 - .4}{5\pmf} + \log(1\pm)$ Steve Wilson, 7/26 Lawrence, KS |
1518 (2.6) $\dfrac{8 - .41}{.5\%}$ Steve Wilson, 6/26 Lawrence, KS |
1519 (2.6) $\dfrac{8 - .4}{.5\%} - 1$ Steve Wilson, 6/26 Lawrence, KS |
1520 (2.6) $\dfrac{8 - .4}{.5\%} \times 1$ Steve Wilson, 6/26 Lawrence, KS |
|
| 1521 (2.6) $\dfrac{8 - .4}{.5\%} + 1$ Steve Wilson, 6/26 Lawrence, KS |
1522 (2.8) $\dfrac{8 - .4 + 1\%}{.5\%}$ Steve Wilson, 6/26 Lawrence, KS |
1523 (3.6) $\dfrac{5!}{8\%} + 4! - 1$ Steve Wilson, 6/26 Lawrence, KS |
1524 (3.6) $\dfrac{5!}{8\%} + 4! \times 1$ Steve Wilson, 6/26 Lawrence, KS |
1525 (3.6) $\dfrac{5!}{8\%} + 4! + 1$ Steve Wilson, 6/26 Lawrence, KS |
1526 (3.6) $\dfrac{5! + \sqrt{4}}{8\%} + 1$ Steve Wilson, 6/26 Lawrence, KS |
1528 (4.0) $(5\%)^{-4}\% - \dfrac{8}{.\overline{1}}$ Steve Wilson, 7/26 Lawrence, KS |
1530 (2.6) $\dfrac{1.8 + 5}{.\overline{4}\%}$ Steve Wilson, 6/26 Lawrence, KS |
|||
| 1532 (3.0) $\dfrac{8.4 + .\overline{1}}{.\overline{5}\%}$ Steve Wilson, 6/26 Lawrence, KS |
1534 (4.8) $\dfrac{5!}{8\%} + 4! + \antilog 1$ Steve Wilson, 6/26 Lawrence, KS |
1536 (3.8) $\dfrac{5!}{8\%} + \dfrac{4}{.\overline{1}}$ Steve Wilson, 6/26 Lawrence, KS |
1537 (4.8) $\log((\antilog((4! - 5)$ $\phantom. \times 81))\%)$ Steve Wilson, 7/26 Lawrence, KS |
1538 (3.0) $\dfrac{8.1 + .\overline{4}}{.\overline{5}\%}$ Steve Wilson, 6/26 Lawrence, KS |
1539 (3.2) $(4! - 5) \times 81$ Steve Wilson, 6/26 Lawrence, KS |
1540 (2.2) $\dfrac{81 - 4}{5\%}$ Steve Wilson, 2/25 Lawrence, KS |
||||
| 1541 (3.4) $\dfrac{5!}{8\%} + 41$ Steve Wilson, 6/26 Lawrence, KS |
1542 (4.8) $\log((\antilog 1548)\pmm)$ Steve Wilson, 7/26 Lawrence, KS |
1543 (4.8) $\log((\antilog 1548)\%\pm)$ Steve Wilson, 7/26 Lawrence, KS |
1544 (4.8) $\log((\antilog 1548)\%\%)$ Steve Wilson, 7/26 Lawrence, KS |
1545 (4.6) $\log((\antilog 1548)\pm)$ Steve Wilson, 6/26 Lawrence, KS |
1546 (4.6) $\log((\antilog 1548)\%)$ Steve Wilson, 6/26 Lawrence, KS |
1547 (4.8) $\dfrac{5! + 4}{8\%} + \log(1\pm)$ Steve Wilson, 7/26 Lawrence, KS |
1548 (2.0) $1548$ Satchel Koch, 1/22 Lawrence, KS |
1549 (3.4) $\dfrac{5! + 4}{8\%} - 1$ Steve Wilson, 6/26 Lawrence, KS |
1550 (3.4) $\dfrac{5! + 4}{8\%} \times 1$ Steve Wilson, 6/26 Lawrence, KS |
|
| 1551 (3.4) $\dfrac{5! + 4}{8\%} + 1$ Steve Wilson, 6/26 Lawrence, KS |
1552 (4.8) $\dfrac{5! + 4}{8\%} - \log(1\%)$ Steve Wilson, 7/26 Lawrence, KS |
1553 (4.8) $\dfrac{5! + 4}{8\%} - \log(1\pm)$ Steve Wilson, 7/26 Lawrence, KS |
1555 (4.8) $\dfrac{8}{\ln\sqrt{\exp(1\%)}} - 45$ Steve Wilson, 7/26 Lawrence, KS |
1556 (3.6) $\dfrac{8 - .1}{5\pmf} - 4!$ Steve Wilson, 6/26 Lawrence, KS |
1557 (4.8) $\log\left(\left(\antilog\left(\dfrac{8}{5\pmf}\right)\right)\right.$ $\left.\phantom{\dfrac88}\%\right) - 41$ Steve Wilson, 7/26 Lawrence, KS |
1558 (3.8) $\dfrac{1}{\left(\sqrt{.\overline{4}}\right)\pmf} + 58$ Steve Wilson, 6/26 Lawrence, KS |
1559 (2.4) $\dfrac{8}{.5\%} - 41$ Steve Wilson, 6/26 Lawrence, KS |
1560 (2.6) $\dfrac{8}{.5\%} - \dfrac{4}{.1}$ Steve Wilson, 6/26 Lawrence, KS |
||
| 1561 (3.6) $\dfrac{8!}{4!} - 5! + 1$ Steve Wilson, 6/26 Lawrence, KS |
1562 (4.8) $\dfrac{8}{5\pmf}$ $\phantom. - \log((\antilog 41)\pm)$ Steve Wilson, 7/26 Lawrence, KS |
1564 (2.8) $\dfrac{8}{.5\%} - \dfrac{4}{.\overline{1}}$ Steve Wilson, 6/26 Lawrence, KS |
1566 (4.6) $\dfrac{8}{5\pmf} - 4! - \antilog 1$ Steve Wilson, 6/26 Lawrence, KS |
1568 (4.6) $\log((\antilog 51)\%)$ $\phantom. \times 8 \times 4$ Steve Wilson, 7/26 Lawrence, KS |
1570 (2.6) $\dfrac{8 - 1}{.\overline{4}\%} - 5$ Steve Wilson, 6/26 Lawrence, KS |
|||||
| 1572 (2.6) $\dfrac{8 - .14}{.5\%}$ Steve Wilson, 7/26 Lawrence, KS |
1573 (4.8) $\dfrac{8}{5\pmf} - 4! + \log(1\pm)$ Steve Wilson, 7/26 Lawrence, KS |
1574 (4.8) $\dfrac{8}{5\pmf} - 4! + \log(1\%)$ Steve Wilson, 7/26 Lawrence, KS |
1575 (2.6) $\dfrac{15 - 8}{.\overline{4}\%}$ Steve Wilson, 6/26 Lawrence, KS |
1576 (3.4) $\dfrac{8}{5\pmf} - 4! \times 1$ Steve Wilson, 6/26 Lawrence, KS |
1577 (3.4) $\dfrac{8}{5\pmf} - 4! + 1$ Steve Wilson, 6/26 Lawrence, KS |
1578 (3.6) $\dfrac{8 - .1}{5\pmf} - \sqrt{4}$ Steve Wilson, 6/26 Lawrence, KS |
1579 (4.8) $\dfrac{8}{5\pmf} - 4! - \log(1\pm)$ Steve Wilson, 7/26 Lawrence, KS |
1580 (2.6) $\dfrac{8 - 1}{.\overline{4}\%} + 5$ Steve Wilson, 6/26 Lawrence, KS |
||
| 1581 (4.6) $\log((\antilog 1584)\pm)$ Steve Wilson, 7/26 Lawrence, KS |
1582 (3.6) $\dfrac{8 - .1}{5\pmf} + \sqrt{4}$ Steve Wilson, 6/26 Lawrence, KS |
1583 (4.8) $\log\left(\left(\antilog\left(\dfrac{8}{5\pmf}\right)\right)\right.$ $\left.\phantom{\dfrac88}\pm\right) - 14$ Steve Wilson, 7/26 Lawrence, KS |
1584 (2.0) $1584$ Jonathan Frank, 3/24 Rye, NY |
1585 (3.8) $\dfrac{1}{\left(\sqrt{.\overline{4}}\right)\pmf} + 85$ Steve Wilson, 6/26 Lawrence, KS |
1586 (2.4) $\dfrac{8}{.5\%} - 14$ Steve Wilson, 6/26 Lawrence, KS |
1588 (2.8) $\dfrac{8 - .1 + 4\%}{.5\%}$ Steve Wilson, 7/26 Lawrence, KS |
1589 (4.8) $\dfrac{8}{5\pmf}$ $\phantom. - \log((\antilog 14)\pm)$ Steve Wilson, 7/26 Lawrence, KS |
1590 (3.4) $\left(\dfrac{8}{1\%} - 5\right) \times \sqrt{4}$ Steve Wilson, 6/26 Lawrence, KS |
||
| 1592 (2.6) $\dfrac{8 - 4\%}{.5\%} - 1$ Steve Wilson, 7/26 Lawrence, KS |
1592 (2.6) $\dfrac{8 - 4\%}{.5\%} \times 1$ Steve Wilson, 7/26 Lawrence, KS |
1592 (2.6) $\dfrac{8 - 4\%}{.5\%} + 1$ Steve Wilson, 7/26 Lawrence, KS |
1594 (2.6) $\dfrac{8 - 1\%}{.5\%} - 4$ Steve Wilson, 7/26 Lawrence, KS |
1595 (2.4) $\dfrac{8}{.5\%} - 4 - 1$ Steve Wilson, 6/26 Lawrence, KS |
1596 (2.4) $\dfrac{8}{.5\%} - 4 \times 1$ Steve Wilson, 6/26 Lawrence, KS |
1597 (2.4) $\dfrac{8}{.5\%} - 4 + 1$ Steve Wilson, 6/26 Lawrence, KS |
1598 (2.6) $\dfrac{8 + 1\%}{.5\%} - 4$ Steve Wilson, 7/26 Lawrence, KS |
1599 (3.2) $\dfrac{8}{5\pmf} - 1^4$ Steve Wilson, 6/26 Lawrence, KS |
1600 (2.2) $\dfrac{8 \times 5 \times 4}{.1}$ Steve Wilson, 6/26 Lawrence, KS |
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