Integermania - Ralph's Birthyear

$ \def\pm{{ ‰}} \def\pmf{{ ‰ \phantom.}} \def\pmm{{ ‰ \! ‰}} \def\pmmf{{ ‰ \! ‰ \phantom\%}} \DeclareMathOperator {\antilog} {antilog} \DeclareMathOperator {\arcsec} {arcsec} \DeclareMathOperator {\sech} {sech} \DeclareMathOperator {\arsinh} {arsinh} \DeclareMathOperator {\arcosh} {arcosh} $

Integermania!

Ralph's Birthyear

Integermaniac master Ralph Jeffords was born in 1948. Using one copy each of the digits 1, 4, 8, and 9, 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.

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801 (3.4) $\dfrac{8}{1\%} + 4 - \sqrt{9}$ Steve Wilson, 5/22 Lawrence, KS	802 (3.6) $\dfrac{8}{.1 - 9\%} + \sqrt{4}$ Steve Wilson, 5/22 Lawrence, KS	803 (2.6) $\dfrac{8}{1\%} + 4 - .\overline{9}$ Steve Wilson, 5/22 Lawrence, KS	804 (2.4) $\dfrac{8}{.1 - 9\%} + 4$ Steve Wilson, 5/22 Lawrence, KS	805 (2.0) $814 - 9$ Steve Wilson, 5/22 Lawrence, KS	806 (2.6) $\dfrac{8.1}{.\overline{9}\%} - 4$ Steve Wilson, 5/22 Lawrence, KS	807 (3.4) $\dfrac{8}{1\%} + 4 + \sqrt{9}$ Steve Wilson, 5/22 Lawrence, KS	808 (2.8) $\dfrac{.9}{.\overline{1}\%} - \dfrac84$ Steve Wilson, 5/22 Lawrence, KS	809 (3.6) $\dfrac{8}{1\%} + \sqrt{ \sqrt{9^4}}$ Steve Wilson, 5/22 Lawrence, KS	810 (3.2) $\dfrac{9^{8/4}}{.1}$ Xueqin Xie, 7/12 Lawrence, KS
811 (3.2) $814 - \sqrt{9}$ Hannah Maleki, 9/15 Overland Park, KS	812 (2.8) $\dfrac{.9}{.\overline{1}\%} + \dfrac84$ Steve Wilson, 5/22 Lawrence, KS	813 (2.2) $\dfrac{8}{1\%} + 9 + 4$ Steve Wilson, 5/22 Lawrence, KS	814 (2.4) $814 \times .\overline{9}$ Steve Wilson, 5/22 Lawrence, KS	815 (2.0) $819 - 4$ Lawrence Ombasa, 4/16 Overland Park, KS	816 (2.2) $\dfrac{9}{1\%} - 84$ Steve Wilson, 5/22 Lawrence, KS	817 (3.2) $819 - \sqrt{4}$ Steve Wilson, 5/22 Lawrence, KS	818 (3.4) $\dfrac{8}{1\%} + 9 \times \sqrt{4}$ Steve Wilson, 5/22 Lawrence, KS	819 (3.4) $\sqrt{\sqrt{819^4}}$ Steve Wilson, 5/22 Lawrence, KS	820 (3.0) $\dfrac{9^4 - 1}{8}$ Chelsea Kiddle, 8/12 Leawood, KS
821 (3.2) $819 + \sqrt{4}$ Steve Wilson, 5/22 Lawrence, KS	822 (2.8) $\dfrac{.9}{.\overline{1}\%} + 8 + 4$ Steve Wilson, 5/22 Lawrence, KS	823 (2.0) $819 + 4$ Chris Harris, 6/12 Overland Park, KS	824 (2.8) $\dfrac{9 - .8}{.\overline{1}\%} + 4$ Steve Wilson, 5/22 Lawrence, KS	825 (2.6) $\dfrac{8 + \dfrac14}{.\overline{9}\%}$ Steve Wilson, 5/22 Lawrence, KS	826 (3.6) $\dfrac{8 + \sqrt{9\%}}{1\%} - 4$ Steve Wilson, 5/22 Lawrence, KS	827 (3.6) $\dfrac{8}{1\%} + 4! + \sqrt{9}$ Steve Wilson, 5/22 Lawrence, KS	828 (3.8) $\dfrac{8 + \sqrt{9\%}}{1\%} - \sqrt{4}$ Steve Wilson, 5/22 Lawrence, KS	829 (3.6) $\dfrac{8 + \sqrt{4\%}}{1\%} + 9$ Steve Wilson, 5/22 Lawrence, KS	830 (2.6) $\dfrac{84 - .\overline{9}}{.1}$ Steve Wilson, 5/22 Lawrence, KS
831 (2.2) $\dfrac{84}{.1} - 9$ Steve Wilson, 5/22 Lawrence, KS	832 (2.0) $841 - 9$ Steve Wilson, 5/22 Lawrence, KS	833 (3.4) $\dfrac{8}{1\%} + 4! + 9$ Steve Wilson, 5/22 Lawrence, KS	834 (3.6) $\dfrac{84}{.1} - (\sqrt{9})!$ Steve Wilson, 5/22 Lawrence, KS	835 (3.4) $841 - (\sqrt{9})!$ Steve Wilson, 5/22 Lawrence, KS	836 (2.2) $\dfrac{8}{1\%} + 9 \times 4$ Steve Wilson, 5/22 Lawrence, KS	837 (2.4) $\dfrac{89 + 4}{.\overline{1}}$ Steve Wilson, 5/22 Lawrence, KS	838 (2.4) $\dfrac{94}{.\overline{1}} - 8$ Steve Wilson, 5/22 Lawrence, KS	839 (2.6) $\dfrac{84}{.1} - .\overline{9}$ Steve Wilson, 5/22 Lawrence, KS	840 (2.0) $84 \times (9 + 1)$ Steve Wilson, 5/22 Lawrence, KS
841 (2.4) $841 \times .\overline{9}$ Steve Wilson, 5/22 Lawrence, KS	842 (2.2) $841.\overline{9}$ Steve Wilson, 5/22 Lawrence, KS	843 (3.2) $819 + 4!$ Parker Thomsen, 2/15 Lenexa, KS	844 (3.2) $841 + \sqrt{9}$ Steve Wilson, 5/22 Lawrence, KS	845 (3.6) $\dfrac{9 + 8 - .1}{(\sqrt{4})\%}$ Steve Wilson, 5/22 Lawrence, KS	846 (2.0) $94 \times (8 + 1)$ Steve Wilson, 5/22 Lawrence, KS	847 (3.4) $841 + (\sqrt{9})!$ Steve Wilson, 5/22 Lawrence, KS	848 (2.0) $849 - 1$ Steve Wilson, 5/22 Lawrence, KS	849 (2.0) $849 \times 1$ Steve Wilson, 5/22 Lawrence, KS	850 (2.0) $849 + 1$ Steve Wilson, 5/22 Lawrence, KS
851 (3.4) $\dfrac{9 + 8}{(\sqrt{4})\%} + 1$ Steve Wilson, 5/22 Lawrence, KS	852 (2.2) $\dfrac{9}{1\%} - 48$ Steve Wilson, 5/22 Lawrence, KS	853 (4.6) $849 - \log(1\%\%)$ Steve Wilson, 4/23 Lawrence, KS	854 (2.4) $\dfrac{94}{.\overline{1}} + 8$ Steve Wilson, 5/22 Lawrence, KS	855 (2.6) $\dfrac{4 \times 1.9}{.\overline{8}\%}$ Steve Wilson, 5/22 Lawrence, KS	856 (4.0) $\dfrac{.8 + (\sqrt{9})!\%}{1\pmf} - 4$ Steve Wilson, 4/23 Lawrence, KS	857 (4.6) $849 - \log(1\%\pmm)$ Steve Wilson, 4/23 Lawrence, KS	858 (2.8) $\dfrac{.9}{.\overline{1}\%} + 48$ Steve Wilson, 5/22 Lawrence, KS	859 (3.6) $\dfrac{9!}{8!\%} - 41$ Steve Wilson, 4/23 Lawrence, KS	860 (2.2) $\dfrac{94 - 8}{.1}$ Steve Wilson, 5/22 Lawrence, KS
861 (4.8) $\dfrac{\log((\antilog 9)\%)}{8\pmf} - 14$ Steve Wilson, 11/25 Lawrence, KS	862 (4.2) $\dfrac{.8 + (\sqrt{9})!\%}{1\pmf} + \sqrt{4}$ Steve Wilson, 4/23 Lawrence, KS	863 (4.8) $(\log((\antilog 8)\%))^{\sqrt{9}}$ $\phantom. \times 4 - 1$ Steve Wilson, 11/25 Lawrence, KS	864 (2.8) $\dfrac{9 - 8 - 4\%}{.\overline{1}\%}$ Steve Wilson, 5/22 Lawrence, KS	865 (3.6) $\dfrac{8 + 1\pmf}{9\pmf} - 4!$ Steve Wilson, 5/22 Lawrence, KS	866 (3.4) $\dfrac{89}{.1} - 4!$ Steve Wilson, 5/22 Lawrence, KS	867 (3.2) $891 - 4!$ Steve Wilson, 5/22 Lawrence, KS	868 (2.2) $\dfrac{9}{1\%} - 8 \times 4$ Steve Wilson, 5/22 Lawrence, KS	869 (4.8) $819 + \cot\arctan((\sqrt{4})\%)$ Steve Wilson, 11/25 Lawrence, KS	870 (3.6) $\dfrac{9}{1\%} - \dfrac{4!}{.8}$ Steve Wilson, 5/22 Lawrence, KS
871 (3.6) $\dfrac{(\sqrt{9})! + 1}{8\pmf} - 4$ Steve Wilson, 4/23 Lawrence, KS	872 (3.6) $\dfrac{9 - \sqrt{4\%}}{1\%} - 8$ Steve Wilson, 5/22 Lawrence, KS	873 (3.6) $\dfrac{(\sqrt{9})! + 1}{8\pmf} - \sqrt{4}$ Steve Wilson, 4/23 Lawrence, KS	874 (3.4) $\dfrac{9 - \sqrt{4}}{8\pmf} - 1$ Steve Wilson, 4/23 Lawrence, KS	875 (2.6) $\dfrac{ \dfrac{1}{8\%} - 9}{.4\%}$ Steve Wilson, 5/22 Lawrence, KS	876 (3.4) $\dfrac{9}{1\%} - (8 - 4)!$ Steve Wilson, 5/22 Lawrence, KS	877 (3.8) $\dfrac{9!}{8!\%} - 4! + 1$ Steve Wilson, 4/23 Lawrence, KS	878 (2.4) $\dfrac{98}{.\overline{1}} - 4$ Steve Wilson, 5/22 Lawrence, KS	879 (3.6) $\dfrac{(\sqrt{9})! + 1}{8\pmf} + 4$ Steve Wilson, 4/23 Lawrence, KS	880 (2.4) $\dfrac{9}{1\%} - \dfrac{8}{.4}$ Steve Wilson, 5/22 Lawrence, KS
881 (3.4) $\dfrac{8}{1\%} + \sqrt{9^4}$ Steve Wilson, 5/22 Lawrence, KS	882 (2.0) $18 \times 49$ Dominic Clemente, 7/12 Lawrence, KS	883 (4.6) $\dfrac{9}{1\%} - 8 \times \cosh\ln 4$ Steve Wilson, 4/23 Lawrence, KS	884 (3.4) $\dfrac{9}{1\%} - 8 \times \sqrt{4}$ Steve Wilson, 5/22 Lawrence, KS	885 (2.8) $\dfrac{8 + .1\%}{.9\%} - 4$ Steve Wilson, 5/22 Lawrence, KS	886 (2.2) $\dfrac{89}{.1} - 4$ Steve Wilson, 5/22 Lawrence, KS	887 (2.0) $891 - 4$ Andrew Haar, 6/12 Silver Lake, KS	888 (2.2) $\dfrac{9}{1\%} - 8 - 4$ Steve Wilson, 5/22 Lawrence, KS	889 (3.2) $891 - \sqrt{4}$ Steve Wilson, 5/22 Lawrence, KS	890 (3.4) $\dfrac{9}{1\%} - 8 - \sqrt{4}$ Steve Wilson, 5/22 Lawrence, KS
891 (3.4) $\sqrt{ \sqrt{891^4}}$ Steve Wilson, 5/22 Lawrence, KS	892 (3.2) $\dfrac{9}{1^4 \%} - 8$ Steve Wilson, 5/22 Lawrence, KS	893 (2.0) $894 - 1$ Steve Wilson, 5/22 Lawrence, KS	894 (2.0) $894 \times 1$ Ben Kerkhoff, 6/12 Lawrence, KS	895 (2.0) $891 + 4$ Archit Patel, 5/12 Shawnee, KS	896 (2.2) $\dfrac{9}{1\%} - 8 + 4$ Steve Wilson, 5/22 Lawrence, KS	897 (3.4) $\dfrac{9}{1\%} - \dfrac{4!}{8}$ Steve Wilson, 5/22 Lawrence, KS	898 (2.2) $\dfrac{9}{1\%} - \dfrac84$ Steve Wilson, 5/22 Lawrence, KS	899 (3.6) $\dfrac{9 - (8 + \sqrt{4})\pmf}{1\%}$ Steve Wilson, 5/22 Lawrence, KS	900 (2.2) $\dfrac{9}{\left( \dfrac84 - 1 \right) \%}$ Steve Wilson, 5/22 Lawrence, KS
901 (3.6) $\dfrac{9 + (8 + \sqrt{4})\pmf}{1\%}$ Steve Wilson, 5/22 Lawrence, KS	902 (2.2) $\dfrac{9}{1\%} + \dfrac84$ Steve Wilson, 5/22 Lawrence, KS	903 (3.4) $\dfrac{9}{1\%} + \dfrac{4!}{8}$ Steve Wilson, 5/22 Lawrence, KS	904 (2.2) $\dfrac{81}{9\%} + 4$ Steve Wilson, 5/22 Lawrence, KS	905 (2.4) $\dfrac{9}{1\%} + \dfrac{.4}{8}$ Steve Wilson, 5/22 Lawrence, KS	906 (2.0) $914 - 8$ Steve Wilson, 5/22 Lawrence, KS	907 (4.8) $\dfrac{9}{1\%} + 4 + \sec\arctan\sqrt{8}$ Steve Wilson, 4/23 Lawrence, KS	908 (3.2) $\dfrac{9}{1^4 \%} + 8$ Steve Wilson, 5/22 Lawrence, KS	909 (3.4) $\dfrac{18}{(\sqrt{4})\%} + 9$ Steve Wilson, 4/23 Lawrence, KS	910 (3.4) $\dfrac{9}{1\%} + 8 + \sqrt{4}$ Steve Wilson, 5/22 Lawrence, KS
911 (4.6) $914 - \sec\arctan\sqrt{8}$ Steve Wilson, 4/23 Lawrence, KS	912 (2.0) $19 \times 48$ Dominic Clemente, 7/12 Lawrence, KS	913 (3.6) $\dfrac{8 + 1 \pmf}{9 \pmf} + 4!$ Steve Wilson, 5/22 Lawrence, KS	914 (2.0) $918 - 4$ Steve Wilson, 5/22 Lawrence, KS	915 (3.2) $891 + 4!$ Parker Thomsen, 2/15 Lenexa, KS	916 (2.8) $\dfrac{.\overline{9}}{.1\%} - 84$ Steve Wilson, 5/22 Lawrence, KS	917 (3.6) $\dfrac{8!\%}{.4} - 91$ Steve Wilson, 4/23 Lawrence, KS	918 (2.4) $\dfrac{98 + 4}{.\overline{1}}$ Steve Wilson, 5/22 Lawrence, KS	919 (4.8) $918 + \ln\sqrt{\sqrt{\exp 4}}$ Steve Wilson, 4/23 Lawrence, KS	920 (2.4) $\dfrac{9}{1\%} + \dfrac{8}{.4}$ Steve Wilson, 5/22 Lawrence, KS
921 (4.8) $918 + \coth\ln\sqrt{\sqrt{4}}$ Steve Wilson, 4/23 Lawrence, KS	922 (2.0) $918 + 4$ Chris Harris, 6/12 Overland Park, KS	923 (3.8) $\dfrac{9!}{8!\%} + 4! - 1$ Steve Wilson, 4/23 Lawrence, KS	924 (3.4) $\dfrac{81}{9\%} + 4!$ Steve Wilson, 5/22 Lawrence, KS	925 (3.8) $\dfrac{9!}{8!\%} + 4! + 1$ Steve Wilson, 4/23 Lawrence, KS	926 (3.4) $\sqrt{\sqrt[.1]{4}} - 98$ Steve Wilson, 4/23 Lawrence, KS	927 (4.0) $\dfrac{8!\%}{.4} - \dfrac{9}{.\overline{1}}$ Steve Wilson, 4/23 Lawrence, KS	928 (3.6) $\dfrac{9 + \sqrt{4\%}}{1\%} + 8$ Steve Wilson, 4/23 Lawrence, KS	929 (3.8) $\sqrt[\sqrt{.\overline{1}}]{9} + \dfrac{8}{4\%}$ Steve Wilson, 4/23 Lawrence, KS	930 (2.2) $\dfrac{89 + 4}{.1}$ Steve Wilson, 5/22 Lawrence, KS
931 (4.6) $941 - (\sqrt{\antilog 8})\pm$ Steve Wilson, 11/25 Lawrence, KS	932 (2.2) $\dfrac{9}{1\%} + 8 \times 4$ Steve Wilson, 5/22 Lawrence, KS	933 (2.0) $941 - 8$ Steve Wilson, 5/22 Lawrence, KS	934 (4.2) $\sqrt{ \sqrt[.1]{4}} - \dfrac{9!\%}{8!\pmf}$ Steve Wilson, 4/23 Lawrence, KS	935 (3.4) $\sqrt{\sqrt[.1]{4}} - 89$ Steve Wilson, 4/23 Lawrence, KS	936 (2.4) $(9 + 4) \times \dfrac{8}{.\overline{1}}$ Steve Wilson, 5/22 Lawrence, KS	937 (4.6) $941 - \ln\sqrt{\exp 8}$ Steve Wilson, 4/23 Lawrence, KS	938 (4.2) $948 - \antilog 1$ Steve Wilson, 5/26 Lawrence, KS	939 (4.8) $948 - \cot\arctan(.\overline{1})$ Steve Wilson, 4/23 Lawrence, KS	940 (2.2) $\dfrac{98 - 4}{.1}$ Steve Wilson, 5/22 Lawrence, KS
941 (3.6) $\sqrt{\sqrt{\sqrt{941^8}}}$ Steve Wilson, 5/22 Lawrence, KS	942 (3.2) $918 + 4!$ Steve Wilson, 5/22 Lawrence, KS	943 (4.6) $948 + \log(1\%\pm)$ Steve Wilson, 4/23 Lawrence, KS	944 (4.0) $\dfrac{.\overline{9} - 8\%}{1\pmf} + 4!$ Steve Wilson, 4/23 Lawrence, KS	945 (2.6) $\dfrac{84}{(9 - .\overline{1})\%}$ Steve Wilson, 5/22 Lawrence, KS	946 (4.4) $948 + \log(1\%)$ Steve Wilson, 4/23 Lawrence, KS	947 (2.0) $948 - 1$ Steve Wilson, 5/22 Lawrence, KS	948 (2.0) $948 \times 1$ Steve Wilson, 5/22 Lawrence, KS	949 (2.0) $948 + 1$ Steve Wilson, 5/22 Lawrence, KS	950 (2.2) $19 \times \dfrac{4}{8\%}$ Steve Wilson, 5/22 Lawrence, KS
951 (3.2) $8 \times (4 + 1)! - 9$ Steve Wilson, 5/22 Lawrence, KS	952 (2.8) $\dfrac{.\overline{9}}{.1\%} - 48$ Steve Wilson, 5/22 Lawrence, KS	953 (4.6) $948 - \log(1\%\pm)$ Steve Wilson, 4/23 Lawrence, KS	954 (3.6) $8 \times (4 + 1)! - (\sqrt{9})!$ Steve Wilson, 5/22 Lawrence, KS	955 (4.8) $948 + \log(1\%\%\pm)$ Steve Wilson, 4/23 Lawrence, KS	956 (3.4) $\dfrac{98}{.1} - 4!$ Steve Wilson, 5/22 Lawrence, KS	957 (3.2) $981 - 4!$ Steve Wilson, 5/22 Lawrence, KS	958 (4.2) $948 + \antilog 1$ Steve Wilson, 5/26 Lawrence, KS	959 (3.4) $8 \times 4.\overline{9}! - 1$ Steve Wilson, 4/23 Lawrence, KS	960 (2.6) $\dfrac{9 - 8 - 4\%}{.1\%}$ Steve Wilson, 5/22 Lawrence, KS
961 (3.4) $8 \times 4.\overline{9}! + 1$ Steve Wilson, 4/23 Lawrence, KS	962 (4.6) $8 \times (9 - 4)! - \log(1\%)$ Steve Wilson, 11/25 Lawrence, KS	963 (3.4) $8 \times (4 + 1)! + \sqrt{9}$ Steve Wilson, 5/22 Lawrence, KS	964 (3.4) $\dfrac{9}{1\%} + \sqrt{8^4}$ Steve Wilson, 5/22 Lawrence, KS	965 (4.8) $8 \times (9 - 4)! - \log(1\%\pm)$ Steve Wilson, 11/25 Lawrence, KS	966 (3.6) $8 \times (4 + 1)! + (\sqrt{9})!$ Steve Wilson, 5/22 Lawrence, KS	967 (4.8) $8 \times (4 + 1)!$ $\phantom. + \log((\antilog 9)\%)$ Steve Wilson, 11/25 Lawrence, KS	968 (2.8) $\dfrac{.\overline{9}}{.1\%} - 4 \times 8$ Steve Wilson, 5/22 Lawrence, KS	969 (3.2) $8 \times (4 + 1)! + 9$ Steve Wilson, 5/22 Lawrence, KS	970 (4.0) $\dfrac{.\overline{9}}{1\pmf} - \dfrac{4!}{.8}$ Steve Wilson, 4/23 Lawrence, KS
971 (4.8) $((\antilog 8)\%$ $\phantom. - \antilog 4)\pm - 19$ Steve Wilson, 11/25 Lawrence, KS	972 (2.4) $(8 + 4) \times \dfrac{9}{.\overline{1}}$ Steve Wilson, 5/22 Lawrence, KS	973 (4.8) $(\antilog 8)\%\pm$ $\phantom. - (4 - 1)^{\sqrt{9}}$ Steve Wilson, 11/25 Lawrence, KS	974 (4.2) $984 - \antilog 1$ Steve Wilson, 5/26 Lawrence, KS	975 (4.2) $\dfrac{9 - 1 + \sqrt{.\overline{4}}}{.\overline{8}\%}$ Steve Wilson, 4/23 Lawrence, KS	976 (2.2) $\dfrac{98}{.1} - 4$ Steve Wilson, 5/22 Lawrence, KS	977 (2.0) $981 - 4$ Steve Wilson, 5/22 Lawrence, KS	978 (3.4) $\dfrac{98}{.1} - \sqrt{4}$ Steve Wilson, 5/22 Lawrence, KS	979 (3.2) $981 - \sqrt{4}$ Steve Wilson, 5/22 Lawrence, KS	980 (3.4) $\dfrac{9.8}{1^4 \%}$ Steve Wilson, 5/22 Lawrence, KS
981 (3.4) $\sqrt{\sqrt{981^4}}$ Steve Wilson, 5/22 Lawrence, KS	982 (3.4) $\dfrac{98}{.1} + \sqrt{4}$ Steve Wilson, 5/22 Lawrence, KS	983 (2.0) $984 - 1$ Hee Do Yoon, 4/12 Overland Park, KS	984 (2.0) $984 \times 1$ Archit Patel, 5/12 Shawnee, KS	985 (2.0) $984 + 1$ Archit Patel, 4/12 Shawnee, KS	986 (4.4) $\left(\sqrt{(.\overline{9}\%)^{-8}}\right)\%\pm - 14$ Steve Wilson, 4/23 Lawrence, KS	987 (3.8) $(.1^{-8})\%\pm - 9 - 4$ Steve Wilson, 4/23 Lawrence, KS	988 (2.8) $\dfrac{.\overline{9}}{.1\%} - 8 - 4$ Steve Wilson, 5/22 Lawrence, KS	989 (3.6) $\dfrac{8!\%}{.4} - 19$ Steve Wilson, 4/23 Lawrence, KS	990 (2.8) $\dfrac{\dfrac84 - .9}{.\overline{1}\%}$ Steve Wilson, 5/22 Lawrence, KS
991 (3.4) $\dfrac{8 + \sqrt{4}}{1\%} - 9$ Steve Wilson, 5/22 Lawrence, KS	992 (3.4) $\dfrac{4 - 1}{(\sqrt{9})\pmf} - 8$ Steve Wilson, 4/23 Lawrence, KS	993 (4.0) $(.1)^{-8}\%\pm - 4 - \sqrt{9}$ Steve Wilson, 5/26 Lawrence, KS	994 (3.8) $\dfrac{.\overline{9}}{1\pmf} - 8 + \sqrt{4}$ Steve Wilson, 5/22 Lawrence, KS	995 (2.6) $\dfrac{9 - 1 - 4\%}{.8\%}$ Steve Wilson, 5/22 Lawrence, KS	996 (2.4) $\dfrac{8 + 1}{.9\%} - 4$ Steve Wilson, 5/22 Lawrence, KS	997 (3.8) $\dfrac{.\overline{9}}{1\pmf} - \dfrac{4!}{8}$ Steve Wilson, 5/22 Lawrence, KS	998 (2.8) $\dfrac{.\overline{9}}{.1\%} - \dfrac84$ Steve Wilson, 5/22 Lawrence, KS	999 (3.6) $\dfrac{8!\%}{.4} - 9 \times 1$ Steve Wilson, 4/23 Lawrence, KS	1000 (2.6) $1.\overline{9} \times \dfrac{4}{.8\%}$ Steve Wilson, 5/22 Lawrence, KS
1001 (3.8) $\dfrac{8 + \sqrt{4}}{1\%} + .\overline{9}$ Steve Wilson, 5/22 Lawrence, KS	1002 (2.8) $\dfrac{.\overline{9}}{.1\%} + \dfrac84$ Steve Wilson, 5/22 Lawrence, KS	1003 (3.8) $\dfrac{.\overline{9}}{1\pmf} + \dfrac{4!}{8}$ Steve Wilson, 5/22 Lawrence, KS	1004 (2.4) $\dfrac{8 + 1}{.9\%} + 4$ Steve Wilson, 5/22 Lawrence, KS	1005 (2.6) $\dfrac{9 - 1 + 4\%}{.8\%}$ Steve Wilson, 5/22 Lawrence, KS	1006 (3.8) $\dfrac{.\overline{9}}{1\pmf} + 8 - \sqrt{4}$ Steve Wilson, 5/22 Lawrence, KS	1007 (2.8) $\dfrac{9 - 4\%}{.\overline{8}\%} - 1$ Steve Wilson, 10/21 Lawrence, KS	1008 (2.0) $14 \times 8 \times 9$ Allison Layne-Mulhern, 9/13 Leawood, KS	1009 (2.8) $\dfrac{9 - 4\%}{.\overline{8}\%} + 1$ Steve Wilson, 5/22 Lawrence, KS	1010 (2.8) $\dfrac{9}{.\overline{8}\%} - \dfrac{1}{.4}$ Steve Wilson, 5/22 Lawrence, KS
1011 (3.8) $\dfrac{8!\%}{.4} + 1 \times \sqrt{9}$ Steve Wilson, 4/23 Lawrence, KS	1012 (2.6) $\dfrac{ \dfrac{9}{.\overline{1}\%} - 4}{8}$ Steve Wilson, 5/22 Lawrence, KS	1013 (2.6) $\dfrac{ \dfrac{9}{.\overline{1}\%} + 4}{8}$ Steve Wilson, 5/22 Lawrence, KS	1014 (4.0) $\dfrac{8!\%}{.4} + 1 \times (\sqrt{9})!$ Steve Wilson, 4/23 Lawrence, KS	1015 (2.8) $\dfrac{9}{.\overline{8}\%} + \dfrac{1}{.4}$ Steve Wilson, 5/22 Lawrence, KS	1016 (2.8) $\dfrac{9 + 4\%}{.\overline{8}\%} - 1$ Steve Wilson, 5/22 Lawrence, KS	1017 (2.6) $\dfrac{ \dfrac{9}{1\%} + 4}{.\overline{8}}$ Steve Wilson, 5/22 Lawrence, KS	1018 (2.8) $\dfrac{9 + 4\%}{.\overline{8}\%} + 1$ Steve Wilson, 5/22 Lawrence, KS	1019 (3.6) $\sqrt{ \sqrt[.1]{4}} - 8 + \sqrt{9}$ Steve Wilson, 4/23 Lawrence, KS	1020 (2.2) $\dfrac{98 + 4}{.1}$ Steve Wilson, 5/22 Lawrence, KS
1021 (2.8) $\dfrac{9.\overline{1}}{.\overline{8}\%} - 4$ Steve Wilson, 5/22 Lawrence, KS	1022 (3.6) $\sqrt{ \sqrt[.1]{4}} - \sqrt[\sqrt{9}]{8}$ Steve Wilson, 4/23 Lawrence, KS	1023 (3.4) $\sqrt{ \sqrt[.1]{4}} - 9 + 8$ Steve Wilson, 4/23 Lawrence, KS	1024 (3.2) $(8 \times 4)^{1.\overline{9}}$ Steve Wilson, 4/23 Lawrence, KS	1025 (2.2) $\dfrac{8 + \dfrac94}{1\%}$ Steve Wilson, 5/22 Lawrence, KS	1026 (3.6) $\sqrt{ \sqrt[.1]{4}} + \sqrt[\sqrt{9}]{8}$ Steve Wilson, 4/23 Lawrence, KS	1027 (3.6) $\dfrac{8!\%}{.4} + 19$ Steve Wilson, 4/23 Lawrence, KS	1028 (3.6) $\dfrac{8!\% + 9 - 1}{.4}$ Steve Wilson, 4/23 Lawrence, KS	1029 (2.8) $\dfrac{9.\overline{1}}{.\overline{8}\%} + 4$ Steve Wilson, 5/22 Lawrence, KS	1030 (3.8) $\sqrt{\sqrt[.1]{8 - 4}} + (\sqrt{9})!$ Steve Wilson, 4/23 Lawrence, KS
1031 (3.8) $\sqrt{\sqrt[.1]{4}} + 8 - .\overline{9}$ Steve Wilson, 4/23 Lawrence, KS	1032 (2.8) $\dfrac{.\overline{9}}{.1\%} + 8 \times 4$ Steve Wilson, 5/22 Lawrence, KS	1033 (3.4) $\sqrt{\sqrt[.1]{8 - 4}} + 9$ Steve Wilson, 4/23 Lawrence, KS	1034 (4.4) $94 \times (8 - \log(1\pm))$ Steve Wilson, 4/23 Lawrence, KS	1035 (3.6) $\sqrt{ \sqrt[.1]{4}} + 8 + \sqrt{9}$ Steve Wilson, 4/23 Lawrence, KS	1036 (3.8) $(.1)^{-8}\%\pm + 9 \times 4$ Steve Wilson, 5/26 Lawrence, KS	1037 (4.8) $(\antilog 8)\%\pm$ $\phantom. + 9 \times 4 + 1$ Steve Wilson, 5/26 Lawrence, KS	1038 (3.8) $\sqrt{ \sqrt[.1]{4}} + 8 + (\sqrt{9})!$ Steve Wilson, 4/23 Lawrence, KS		1040 (2.2) $(9 + 4) \times \dfrac{8}{.1}$ Steve Wilson, 5/22 Lawrence, KS
1041 (3.4) $\sqrt{ \sqrt[.1]{4}} + 9 + 8$ Steve Wilson, 4/23 Lawrence, KS		1043 (4.8) $\ln\sqrt{\sqrt{\exp(8^4)}} + 19$ Steve Wilson, 4/23 Lawrence, KS					1048 (2.8) $\dfrac{.\overline{9}}{.1\%} + 48$ Steve Wilson, 5/22 Lawrence, KS	1049 (3.8) $(.1)^{-8}\%\pm + 49$ Steve Wilson, 5/26 Lawrence, KS	1050 (2.2) $\dfrac{84}{(9 - 1)\%}$ Steve Wilson, 5/22 Lawrence, KS
		1053 (2.0) $81 \times (9 + 4)$ Steve Wilson, 5/22 Lawrence, KS			1056 (4.0) $\dfrac{.\overline{9} + 8\%}{1\pmf} - 4!$ Steve Wilson, 4/23 Lawrence, KS				1060 (4.8) $\antilog\sqrt{9} + \dfrac{8 - \sqrt{4}}{.1}$ Steve Wilson, 5/26 Lawrence, KS
	1062 (4.8) $9 \times \left(\left(\dfrac{4}{.8}\right)! + \log(1\%)\right)$ Steve Wilson, 4/23 Lawrence, KS		1064 (3.8) $\dfrac{.\overline{9}}{1 \pmf} + \sqrt{8^4}$ Steve Wilson, 5/22 Lawrence, KS						1070 (4.6) $9 \times \left(\dfrac{4}{.8}\right)! - \antilog 1$ Steve Wilson, 5/26 Lawrence, KS
1071 (3.4) $9 \times \left( \left( \dfrac{4}{.8} \right)! - 1\right)$ Steve Wilson, 5/22 Lawrence, KS	1072 (3.2) $9 \times (4 + 1)! - 8$ Steve Wilson, 5/22 Lawrence, KS	1073 (4.8) $\dfrac{9 - .4}{8\pmf} + \log(1\%)$ Steve Wilson, 4/23 Lawrence, KS	1074 (2.6) $\dfrac{9 - .4}{.8\%} - 1$ Steve Wilson, 5/22 Lawrence, KS	1075 (2.6) $\dfrac{9 - .4}{.8\%} \times 1$ Steve Wilson, 5/22 Lawrence, KS	1076 (2.6) $\dfrac{9 - .4}{.8\%} + 1$ Steve Wilson, 5/22 Lawrence, KS	1077 (4.8) $9 \times \left(\dfrac{4}{.8}\right)! + \log(1\pm)$ Steve Wilson, 4/23 Lawrence, KS	1078 (4.0) $\dfrac{.\overline{9} + 8\%}{1\pmf} - \sqrt{4}$ Steve Wilson, 4/23 Lawrence, KS	1079 (3.4) $9 \times \left( \dfrac{4}{.8} \right)! - 1$ Steve Wilson, 5/22 Lawrence, KS	1080 (2.2) $(8 + 4) \times \dfrac{9}{.1}$ Steve Wilson, 5/22 Lawrence, KS
1081 (3.4) $9 \times \left( \dfrac{4}{.8} \right)! + 1$ Steve Wilson, 5/22 Lawrence, KS	1082 (4.0) $\dfrac{.\overline{9} + 8\%}{1\pmf} + \sqrt{4}$ Steve Wilson, 4/23 Lawrence, KS	1083 (4.8) $9 \times \left(\dfrac{4}{.8}\right)! - \log(1\pm)$ Steve Wilson, 4/23 Lawrence, KS	1084 (2.4) $\dfrac{9}{.8\%} - 41$ Steve Wilson, 5/22 Lawrence, KS	1085 (2.4) $\dfrac{ \dfrac{9}{8\%} - 4}{.1}$ Steve Wilson, 5/22 Lawrence, KS			1088 (3.2) $9 \times (4 + 1)! + 8$ Steve Wilson, 5/22 Lawrence, KS	1089 (3.4) $9 \times \left( \left( \dfrac{4}{.8} \right)! + 1\right)$ Steve Wilson, 5/22 Lawrence, KS	1090 (4.6) $9 \times \left(\dfrac{4}{.8}\right)! + \antilog 1$ Steve Wilson, 5/26 Lawrence, KS
	1092 (2.0) $91 \times (8 + 4)$ Hannah Maleki, 9/15 Overland Park, KS		1094 (3.8) $(.1)^{-8}\%\pm + 94$ Steve Wilson, 5/26 Lawrence, KS		1096 (3.4) $\dfrac{8 + \sqrt{9}}{1\%} - 4$ Steve Wilson, 4/23 Lawrence, KS		1098 (3.6) $\dfrac{8 + \sqrt{9}}{1\%} - \sqrt{4}$ Steve Wilson, 4/23 Lawrence, KS	1099 (3.6) $\dfrac{8!\%}{.4} + 91$ Steve Wilson, 4/23 Lawrence, KS	1100 (2.6) $\dfrac{9}{.8\%} - \dfrac{1}{4\%}$ Steve Wilson, 5/22 Lawrence, KS
1101 (3.4) $\dfrac{9}{8\pmf} - 4! \times 1$ Steve Wilson, 5/22 Lawrence, KS	1102 (3.4) $\dfrac{9}{8\pmf} - 4! + 1$ Steve Wilson, 5/22 Lawrence, KS	1103 (4.8) $\dfrac{9}{8\pmf} - 4! - \log(1\%)$ Steve Wilson, 4/23 Lawrence, KS	1104 (3.4) $\dfrac{8 + \sqrt{9}}{1\%} + 4$ Steve Wilson, 4/23 Lawrence, KS	1105 (3.6) $\dfrac{ \dfrac{9}{8\%} - \sqrt{4}}{.1}$ Steve Wilson, 4/23 Lawrence, KS		1107 (3.8) $\dfrac{1}{.\overline{8}\pmf} - 9 \times \sqrt{4}$ Steve Wilson, 4/23 Lawrence, KS	1108 (3.4) $\dfrac{9 + \sqrt{4}}{1\%} + 8$ Steve Wilson, 4/23 Lawrence, KS		1110 (2.4) $\dfrac{8 + 4 - .9}{1\%}$ Steve Wilson, 5/26 Lawrence, KS
1111 (2.4) $\dfrac{9}{.8\%} - 14$ Steve Wilson, 5/22 Lawrence, KS	1112 (3.6) $\dfrac{1}{.\overline{8}\pmf} - 9 - 4$ Steve Wilson, 4/23 Lawrence, KS	1113 (3.4) $\sqrt{\sqrt[.1]{4}} + 89$ Steve Wilson, 4/23 Lawrence, KS	1114 (3.8) $\dfrac{1}{.\overline{8}\pmf} - 9 - \sqrt{4}$ Steve Wilson, 4/23 Lawrence, KS	1115 (3.8) $\dfrac{9}{8\pmf} - (.1)^{-4}\pm$ Steve Wilson, 4/23 Lawrence, KS	1116 (3.6) $\dfrac{1^4}{.\overline{8}\pmf} - 9$ Steve Wilson, 4/23 Lawrence, KS	1117 (4.6) $\dfrac{9}{8\pmf} + 4 \times \log(1\%)$ Steve Wilson, 4/23 Lawrence, KS	1118 (3.8) $\dfrac{1}{.\overline{8}\pmf} - 9 + \sqrt{4}$ Steve Wilson, 4/23 Lawrence, KS	1119 (2.6) $\dfrac{9 - 4\%}{.8\%} - 1$ Steve Wilson, 5/22 Lawrence, KS	1120 (2.4) $\dfrac{9}{.8\%} - 4 - 1$ Steve Wilson, 5/22 Lawrence, KS
1121 (2.4) $\dfrac{9}{.8\%} - 4 \times 1$ Steve Wilson, 5/22 Lawrence, KS	1122 (2.4) $\dfrac{9}{.8\%} - 4 + 1$ Steve Wilson, 5/22 Lawrence, KS	1123 (3.4) $\dfrac{1 \times 9}{8\pmf} - \sqrt{4}$ Steve Wilson, 4/23 Lawrence, KS	1124 (3.2) $\dfrac{9}{8\pmf} - 1^4$ Steve Wilson, 4/23 Lawrence, KS	1125 (3.2) $1^4 \times \dfrac{9}{8\pmf}$ Steve Wilson, 4/23 Lawrence, KS			1128 (2.4) $\dfrac{9}{.8\%} + 4 - 1$ Steve Wilson, 5/26 Lawrence, KS	1129 (2.4) $\dfrac{9}{.8\%} + 4 \times 1$ Steve Wilson, 5/26 Lawrence, KS	1130 (2.4) $\dfrac{9}{.8\%} + 4 + 1$ Steve Wilson, 5/26 Lawrence, KS
1131 (2.6) $\dfrac{9 + 4\%}{.8\%} + 1$ Steve Wilson, 5/26 Lawrence, KS			1134 (3.4) $\dfrac{9!}{8 \times 4} \times .1$ Shannon O'Neill, 7/12 Lawrence, KS					1139 (2.4) $\dfrac{9}{.8\%} + 14$ Steve Wilson, 5/26 Lawrence, KS	1140 (4.0) $\dfrac{\left(\dfrac{4}{.8}\right)! - (\sqrt{9})!}{.1}$ Steve Wilson, 5/26 Lawrence, KS
									1150 (2.6) $\dfrac{9}{.8\%} + \dfrac{1}{4\%}$ Steve Wilson, 5/26 Lawrence, KS
									1160 (3.6) $\dfrac{(8 - \sqrt{9})! - 4}{.1}$ Steve Wilson, 5/26 Lawrence, KS
				1165 (2.6) $\dfrac{9}{.8\%} + \dfrac{4}{.1}$ Steve Wilson, 5/26 Lawrence, KS	1166 (2.4) $\dfrac{9}{.8\%} + 41$ Steve Wilson, 5/26 Lawrence, KS				1170 (3.2) $\dfrac{.9 + .8 - .4}{.\overline{1}\%}$ Steve Wilson, 5/26 Lawrence, KS
			1174 (2.2) $\dfrac{94}{8\%} - 1$ Steve Wilson, 5/26 Lawrence, KS	1175 (2.2) $\dfrac{94}{8\%} \times 1$ Steve Wilson, 5/26 Lawrence, KS	1176 (2.2) $\dfrac{94}{8\%} + 1$ Steve Wilson, 5/26 Lawrence, KS				1180 (3.8) $\dfrac{(8 - \sqrt{9})! - \sqrt{4}}{.1}$ Steve Wilson, 5/26 Lawrence, KS
									1190 (2.8) $\dfrac{8 + 4 - .1}{.\overline{9}\%}$ Steve Wilson, 5/26 Lawrence, KS
1191 (2.2) $\dfrac{8 + 4}{1\%} - 9$ Steve Wilson, 5/26 Lawrence, KS	1192 (2.0) $149 \times 8$ Nathan Fields, 3/12 Overland Park, KS		1194 (3.6) $\dfrac{8 + 4}{1\%} - (\sqrt{9})!$ Steve Wilson, 5/26 Lawrence, KS			1197 (3.4) $\dfrac{8 + 4}{1\%} - \sqrt{9}$ Steve Wilson, 5/26 Lawrence, KS		1199 (2.6) $\dfrac{8 + 4}{1\%} - .\overline{9}$ Steve Wilson, 5/26 Lawrence, KS	1200 (2.6) $\dfrac{8 + 4}{(.9 + .1)\%}$ Steve Wilson, 5/26 Lawrence, KS

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