/libussfMIenc[% /Gamma % '0 /Delta1 % '1 /Theta % '2 /Lambda % '3 /Xi % '4 /Pi % '5 /Sigma % '6 /Upsilon % '7 /Phi % '10 /Psi % '11 /Omega % '12 /alpha % '13 /beta % '14 /gamma % '15 /delta % '16 /epsilon1 % '17 /zeta % '20 /eta % '21 /theta % '22 /iota % '23 /kappa % '24 /lambda % '25 /mu % '26 /nu % '27 /xi % '30 /pi % '31 /rho % '32 /sigma % '33 /tau % '34 /upsilon % '35 /phi % '36 /chi % '37 /psi % '40 /omega % '41 /epsilon % '42 /theta1 % '43 /pi1 % '44 /rho1 % '45 /sigma1 % '46 /phi1 % '47 /gradient /partialdiff % partialdiff italic /aleph /uni2136 /uni2137 /uni2138 /uni22B3 /uni22B2 /zero /one /two /three /four /five /six /seven /eight /nine /period /comma /less /hslash /greater /uni22C6 /uni2268 /A % '101 /B % '102 /C % '103 /D % '104 /E % '105 /F % '106 /G % '107 /H % '110 /I % '111 /J % '112 /K % '113 /L % '114 /M % '115 /N % '116 /O % '117 /P % '120 /Q % '121 /R % '122 /S % '123 /T % '124 /U % '125 /V % '126 /W % '127 /X % '130 /Y % '131 /Z % '132 /uni266D /uni266E /uni266F /uni2323 /uni2322 /hbar /a % '141 /b % '142 /c % '143 /d % '144 /e % '145 /f % '146 /g % '147 /h % '150 /i % '151 /j % '152 /k % '153 /l % '154 /m % '155 /n % '156 /o % '157 /p % '160 /q % '161 /r % '162 /s % '163 /t % '164 /u % '165 /v % '166 /w % '167 /x % '170 /y % '171 /z % '172 /i.dtls % '173 /j.dtls % '174 /uni2269 /uni226A /uni2040 % tie /gravecomb /acutecomb /uni0302 /tildecomb /uni0304 /uni0306 /uni0307 /uni0308 /hookabovecomb /uni030A /uni030C /uni0310 /uni0312 /uni0315 /uni031A /uni20D0 /uni20D1 /uni20D6 /uni20D7 /uni20DB /uni20DC /uni20E1 /uni20E7 % combining annuity /uni20E9 % should be /uni20E9 /uni20F0 /uni20D6.ex /uni0302.size1 /uni0303.size1 /uni030C.size1 /uni0302.size2 /uni0303.size2 /uni030C.size2 /uni0302.size3 /uni0303.size3 /uni030C.size3 /uni0302.size4 /uni0303.size4 /uni030C.size4 /uni0302.size5 /uni0303.size5 /uni030C.size5 /uni23DE.lt /uni23DE.rt /uni23DF.lt /uni23DF.rt /uni23DE.ex /uni23DE.md /uni23DF.md /uni23DC.lt /uni23DC.rt /uni23DD.lt /uni23DD.rt /uni23B4.lt /uni23B4.rt /uni23B5.lt /uni23B5.rt /uni226B /uni226C /uni226D /uni226E /uni226F /uni2270 /uni2271 /uni2272 /uni2273 /uni2274 /uni2275 /uni2276 /uni2277 /uni2278 /uni2279 /uni227A /uni227B /uni227C /uni227D /uni227E /uni227F /uni2280 /uni2281 /propersubset /propersuperset /notsubset /uni2285 /reflexsubset /reflexsuperset /uni2288 /uni2289 /uni228A /uni228B /uni228C /uni228D /uni228E /uni228F /uni2290 /uni2291 /uni2292 /uni2293 /uni2294 /circleplus /uni2296 /circlemultiply /uni2298 /uni2299 /uni229A /uni229B /uni229C /uni229D /uni229E /uni229F /uni22A0 /uni22A1 /uni22A2 /uni22A3 /uni22A4 /perpendicular /uni22A6 /uni22A7 /uni22A8 /uni22A9 /uni22AA /uni22AB /uni22AC /uni22AD /uni22AE /uni22AF /uni22B0 /kappa1 % was /uni22B1 /uni22B4 ] def