{"current_steps": 10, "total_steps": 1854, "loss": 1.146, "accuracy": 0.574999988079071, "learning_rate": 4.999648198770648e-06, "epoch": 0.01616488179430188, "percentage": 0.54, "elapsed_time": "0:01:30", "remaining_time": "4:38:14"}
{"current_steps": 20, "total_steps": 1854, "loss": 1.1535, "accuracy": 0.5874999761581421, "learning_rate": 4.998578646361359e-06, "epoch": 0.03232976358860376, "percentage": 1.08, "elapsed_time": "0:03:03", "remaining_time": "4:41:03"}
{"current_steps": 30, "total_steps": 1854, "loss": 1.1699, "accuracy": 0.42500001192092896, "learning_rate": 4.996791614004449e-06, "epoch": 0.04849464538290564, "percentage": 1.62, "elapsed_time": "0:04:37", "remaining_time": "4:40:56"}
{"current_steps": 40, "total_steps": 1854, "loss": 1.2171, "accuracy": 0.48124998807907104, "learning_rate": 4.994287614855618e-06, "epoch": 0.06465952717720752, "percentage": 2.16, "elapsed_time": "0:06:03", "remaining_time": "4:35:03"}
{"current_steps": 50, "total_steps": 1854, "loss": 1.1729, "accuracy": 0.5, "learning_rate": 4.991067367951343e-06, "epoch": 0.0808244089715094, "percentage": 2.7, "elapsed_time": "0:07:44", "remaining_time": "4:39:25"}
{"current_steps": 60, "total_steps": 1854, "loss": 1.2007, "accuracy": 0.5249999761581421, "learning_rate": 4.987131798002389e-06, "epoch": 0.09698929076581128, "percentage": 3.24, "elapsed_time": "0:09:14", "remaining_time": "4:36:26"}
{"current_steps": 70, "total_steps": 1854, "loss": 1.2342, "accuracy": 0.5, "learning_rate": 4.982482035128285e-06, "epoch": 0.11315417256011315, "percentage": 3.78, "elapsed_time": "0:10:48", "remaining_time": "4:35:15"}
{"current_steps": 80, "total_steps": 1854, "loss": 1.0496, "accuracy": 0.5249999761581421, "learning_rate": 4.9771194145328e-06, "epoch": 0.12931905435441504, "percentage": 4.31, "elapsed_time": "0:12:22", "remaining_time": "4:34:15"}
{"current_steps": 90, "total_steps": 1854, "loss": 1.1086, "accuracy": 0.4937500059604645, "learning_rate": 4.971045476120532e-06, "epoch": 0.1454839361487169, "percentage": 4.85, "elapsed_time": "0:13:55", "remaining_time": "4:33:04"}
{"current_steps": 100, "total_steps": 1854, "loss": 1.1637, "accuracy": 0.5062500238418579, "learning_rate": 4.964261964054713e-06, "epoch": 0.1616488179430188, "percentage": 5.39, "elapsed_time": "0:15:28", "remaining_time": "4:31:29"}
{"current_steps": 110, "total_steps": 1854, "loss": 1.1606, "accuracy": 0.512499988079071, "learning_rate": 4.956770826256372e-06, "epoch": 0.17781369973732067, "percentage": 5.93, "elapsed_time": "0:17:03", "remaining_time": "4:30:24"}
{"current_steps": 120, "total_steps": 1854, "loss": 1.1411, "accuracy": 0.5, "learning_rate": 4.94857421384497e-06, "epoch": 0.19397858153162256, "percentage": 6.47, "elapsed_time": "0:18:37", "remaining_time": "4:29:00"}
{"current_steps": 130, "total_steps": 1854, "loss": 1.0644, "accuracy": 0.518750011920929, "learning_rate": 4.939674480520701e-06, "epoch": 0.21014346332592443, "percentage": 7.01, "elapsed_time": "0:20:14", "remaining_time": "4:28:31"}
{"current_steps": 140, "total_steps": 1854, "loss": 1.0811, "accuracy": 0.4937500059604645, "learning_rate": 4.930074181888613e-06, "epoch": 0.2263083451202263, "percentage": 7.55, "elapsed_time": "0:21:55", "remaining_time": "4:28:20"}
{"current_steps": 150, "total_steps": 1854, "loss": 1.0929, "accuracy": 0.5, "learning_rate": 4.91977607472475e-06, "epoch": 0.2424732269145282, "percentage": 8.09, "elapsed_time": "0:23:23", "remaining_time": "4:25:42"}
{"current_steps": 160, "total_steps": 1854, "loss": 1.02, "accuracy": 0.550000011920929, "learning_rate": 4.908783116184534e-06, "epoch": 0.2586381087088301, "percentage": 8.63, "elapsed_time": "0:24:55", "remaining_time": "4:23:58"}
{"current_steps": 170, "total_steps": 1854, "loss": 1.0464, "accuracy": 0.5062500238418579, "learning_rate": 4.897098462953598e-06, "epoch": 0.27480299050313195, "percentage": 9.17, "elapsed_time": "0:26:28", "remaining_time": "4:22:18"}
{"current_steps": 180, "total_steps": 1854, "loss": 0.9499, "accuracy": 0.612500011920929, "learning_rate": 4.884725470341331e-06, "epoch": 0.2909678722974338, "percentage": 9.71, "elapsed_time": "0:28:01", "remaining_time": "4:20:37"}
{"current_steps": 190, "total_steps": 1854, "loss": 1.2649, "accuracy": 0.40625, "learning_rate": 4.871667691317377e-06, "epoch": 0.3071327540917357, "percentage": 10.25, "elapsed_time": "0:29:35", "remaining_time": "4:19:07"}
{"current_steps": 200, "total_steps": 1854, "loss": 0.9612, "accuracy": 0.5, "learning_rate": 4.857928875491392e-06, "epoch": 0.3232976358860376, "percentage": 10.79, "elapsed_time": "0:31:04", "remaining_time": "4:16:56"}
{"current_steps": 210, "total_steps": 1854, "loss": 1.0514, "accuracy": 0.4937500059604645, "learning_rate": 4.843512968036314e-06, "epoch": 0.33946251768033947, "percentage": 11.33, "elapsed_time": "0:32:32", "remaining_time": "4:14:45"}
{"current_steps": 220, "total_steps": 1854, "loss": 1.2641, "accuracy": 0.543749988079071, "learning_rate": 4.828424108555486e-06, "epoch": 0.35562739947464134, "percentage": 11.87, "elapsed_time": "0:34:06", "remaining_time": "4:13:17"}
{"current_steps": 230, "total_steps": 1854, "loss": 1.0744, "accuracy": 0.44999998807907104, "learning_rate": 4.812666629893957e-06, "epoch": 0.3717922812689432, "percentage": 12.41, "elapsed_time": "0:35:38", "remaining_time": "4:11:38"}
{"current_steps": 240, "total_steps": 1854, "loss": 1.0315, "accuracy": 0.4749999940395355, "learning_rate": 4.796245056894273e-06, "epoch": 0.3879571630632451, "percentage": 12.94, "elapsed_time": "0:37:16", "remaining_time": "4:10:37"}
{"current_steps": 250, "total_steps": 1854, "loss": 0.9923, "accuracy": 0.4937500059604645, "learning_rate": 4.779164105097148e-06, "epoch": 0.404122044857547, "percentage": 13.48, "elapsed_time": "0:38:52", "remaining_time": "4:09:24"}
{"current_steps": 260, "total_steps": 1854, "loss": 0.9591, "accuracy": 0.518750011920929, "learning_rate": 4.761428679387373e-06, "epoch": 0.42028692665184886, "percentage": 14.02, "elapsed_time": "0:40:27", "remaining_time": "4:08:00"}
{"current_steps": 270, "total_steps": 1854, "loss": 0.984, "accuracy": 0.5562499761581421, "learning_rate": 4.7430438725853515e-06, "epoch": 0.4364518084461507, "percentage": 14.56, "elapsed_time": "0:42:01", "remaining_time": "4:06:32"}
{"current_steps": 280, "total_steps": 1854, "loss": 1.0765, "accuracy": 0.512499988079071, "learning_rate": 4.724014963984669e-06, "epoch": 0.4526166902404526, "percentage": 15.1, "elapsed_time": "0:43:38", "remaining_time": "4:05:22"}
{"current_steps": 290, "total_steps": 1854, "loss": 1.0089, "accuracy": 0.543749988079071, "learning_rate": 4.704347417836116e-06, "epoch": 0.4687815720347545, "percentage": 15.64, "elapsed_time": "0:45:12", "remaining_time": "4:03:48"}
{"current_steps": 300, "total_steps": 1854, "loss": 0.9833, "accuracy": 0.512499988079071, "learning_rate": 4.684046881778603e-06, "epoch": 0.4849464538290564, "percentage": 16.18, "elapsed_time": "0:46:43", "remaining_time": "4:01:59"}
{"current_steps": 310, "total_steps": 1854, "loss": 0.954, "accuracy": 0.550000011920929, "learning_rate": 4.663119185217409e-06, "epoch": 0.5011113356233583, "percentage": 16.72, "elapsed_time": "0:48:18", "remaining_time": "4:00:34"}
{"current_steps": 320, "total_steps": 1854, "loss": 0.9498, "accuracy": 0.53125, "learning_rate": 4.641570337650232e-06, "epoch": 0.5172762174176602, "percentage": 17.26, "elapsed_time": "0:49:51", "remaining_time": "3:59:01"}
{"current_steps": 330, "total_steps": 1854, "loss": 1.0373, "accuracy": 0.4749999940395355, "learning_rate": 4.61940652694154e-06, "epoch": 0.533441099211962, "percentage": 17.8, "elapsed_time": "0:51:29", "remaining_time": "3:57:50"}
{"current_steps": 340, "total_steps": 1854, "loss": 0.9917, "accuracy": 0.4749999940395355, "learning_rate": 4.596634117545689e-06, "epoch": 0.5496059810062639, "percentage": 18.34, "elapsed_time": "0:53:02", "remaining_time": "3:56:11"}
{"current_steps": 350, "total_steps": 1854, "loss": 0.9987, "accuracy": 0.48124998807907104, "learning_rate": 4.573259648679335e-06, "epoch": 0.5657708628005658, "percentage": 18.88, "elapsed_time": "0:54:39", "remaining_time": "3:54:51"}
{"current_steps": 360, "total_steps": 1854, "loss": 0.9737, "accuracy": 0.518750011920929, "learning_rate": 4.549289832443663e-06, "epoch": 0.5819357445948676, "percentage": 19.42, "elapsed_time": "0:56:14", "remaining_time": "3:53:23"}
{"current_steps": 370, "total_steps": 1854, "loss": 0.8918, "accuracy": 0.4937500059604645, "learning_rate": 4.524731551896978e-06, "epoch": 0.5981006263891695, "percentage": 19.96, "elapsed_time": "0:57:48", "remaining_time": "3:51:52"}
{"current_steps": 380, "total_steps": 1854, "loss": 1.0132, "accuracy": 0.543749988079071, "learning_rate": 4.4995918590781925e-06, "epoch": 0.6142655081834714, "percentage": 20.5, "elapsed_time": "0:59:23", "remaining_time": "3:50:21"}
{"current_steps": 390, "total_steps": 1854, "loss": 0.9681, "accuracy": 0.581250011920929, "learning_rate": 4.473877972981797e-06, "epoch": 0.6304303899777733, "percentage": 21.04, "elapsed_time": "1:01:01", "remaining_time": "3:49:04"}
{"current_steps": 400, "total_steps": 1854, "loss": 0.971, "accuracy": 0.5, "learning_rate": 4.447597277484894e-06, "epoch": 0.6465952717720752, "percentage": 21.57, "elapsed_time": "1:02:32", "remaining_time": "3:47:20"}
{"current_steps": 410, "total_steps": 1854, "loss": 1.0559, "accuracy": 0.4749999940395355, "learning_rate": 4.42075731922687e-06, "epoch": 0.6627601535663771, "percentage": 22.11, "elapsed_time": "1:04:04", "remaining_time": "3:45:38"}
{"current_steps": 420, "total_steps": 1854, "loss": 0.9348, "accuracy": 0.518750011920929, "learning_rate": 4.3933658054423465e-06, "epoch": 0.6789250353606789, "percentage": 22.65, "elapsed_time": "1:05:37", "remaining_time": "3:44:02"}
{"current_steps": 430, "total_steps": 1854, "loss": 1.0372, "accuracy": 0.5062500238418579, "learning_rate": 4.365430601748003e-06, "epoch": 0.6950899171549808, "percentage": 23.19, "elapsed_time": "1:07:08", "remaining_time": "3:42:20"}
{"current_steps": 440, "total_steps": 1854, "loss": 0.9849, "accuracy": 0.5062500238418579, "learning_rate": 4.336959729883925e-06, "epoch": 0.7112547989492827, "percentage": 23.73, "elapsed_time": "1:08:41", "remaining_time": "3:40:45"}
{"current_steps": 450, "total_steps": 1854, "loss": 0.9756, "accuracy": 0.512499988079071, "learning_rate": 4.307961365410118e-06, "epoch": 0.7274196807435845, "percentage": 24.27, "elapsed_time": "1:10:18", "remaining_time": "3:39:21"}
{"current_steps": 460, "total_steps": 1854, "loss": 0.9449, "accuracy": 0.6000000238418579, "learning_rate": 4.278443835358854e-06, "epoch": 0.7435845625378864, "percentage": 24.81, "elapsed_time": "1:11:52", "remaining_time": "3:37:50"}
{"current_steps": 470, "total_steps": 1854, "loss": 0.9817, "accuracy": 0.5, "learning_rate": 4.248415615843523e-06, "epoch": 0.7597494443321883, "percentage": 25.35, "elapsed_time": "1:13:20", "remaining_time": "3:35:59"}
{"current_steps": 480, "total_steps": 1854, "loss": 0.9413, "accuracy": 0.6187499761581421, "learning_rate": 4.217885329624666e-06, "epoch": 0.7759143261264903, "percentage": 25.89, "elapsed_time": "1:14:54", "remaining_time": "3:34:24"}
{"current_steps": 490, "total_steps": 1854, "loss": 0.9699, "accuracy": 0.5062500238418579, "learning_rate": 4.186861743633911e-06, "epoch": 0.7920792079207921, "percentage": 26.43, "elapsed_time": "1:16:26", "remaining_time": "3:32:46"}
{"current_steps": 500, "total_steps": 1854, "loss": 1.0008, "accuracy": 0.518750011920929, "learning_rate": 4.155353766456497e-06, "epoch": 0.808244089715094, "percentage": 26.97, "elapsed_time": "1:18:02", "remaining_time": "3:31:21"}
{"current_steps": 500, "total_steps": 1854, "eval_loss": 0.9776538014411926, "epoch": 0.808244089715094, "percentage": 26.97, "elapsed_time": "1:21:15", "remaining_time": "3:40:02"}
{"current_steps": 510, "total_steps": 1854, "loss": 0.975, "accuracy": 0.48750001192092896, "learning_rate": 4.123370445773134e-06, "epoch": 0.8244089715093958, "percentage": 27.51, "elapsed_time": "1:22:51", "remaining_time": "3:38:21"}
{"current_steps": 520, "total_steps": 1854, "loss": 1.0535, "accuracy": 0.5375000238418579, "learning_rate": 4.090920965761906e-06, "epoch": 0.8405738533036977, "percentage": 28.05, "elapsed_time": "1:24:21", "remaining_time": "3:36:24"}
{"current_steps": 530, "total_steps": 1854, "loss": 1.032, "accuracy": 0.5625, "learning_rate": 4.058014644460991e-06, "epoch": 0.8567387350979996, "percentage": 28.59, "elapsed_time": "1:25:45", "remaining_time": "3:34:15"}
{"current_steps": 540, "total_steps": 1854, "loss": 0.9562, "accuracy": 0.550000011920929, "learning_rate": 4.024660931092939e-06, "epoch": 0.8729036168923014, "percentage": 29.13, "elapsed_time": "1:27:20", "remaining_time": "3:32:33"}
{"current_steps": 550, "total_steps": 1854, "loss": 0.9704, "accuracy": 0.574999988079071, "learning_rate": 3.990869403351272e-06, "epoch": 0.8890684986866033, "percentage": 29.67, "elapsed_time": "1:28:57", "remaining_time": "3:30:55"}
{"current_steps": 560, "total_steps": 1854, "loss": 0.9918, "accuracy": 0.46875, "learning_rate": 3.956649764650206e-06, "epoch": 0.9052333804809052, "percentage": 30.2, "elapsed_time": "1:30:37", "remaining_time": "3:29:23"}
{"current_steps": 570, "total_steps": 1854, "loss": 0.922, "accuracy": 0.574999988079071, "learning_rate": 3.92201184133826e-06, "epoch": 0.9213982622752072, "percentage": 30.74, "elapsed_time": "1:32:07", "remaining_time": "3:27:30"}
{"current_steps": 580, "total_steps": 1854, "loss": 0.9234, "accuracy": 0.518750011920929, "learning_rate": 3.886965579876572e-06, "epoch": 0.937563144069509, "percentage": 31.28, "elapsed_time": "1:33:38", "remaining_time": "3:25:40"}
{"current_steps": 590, "total_steps": 1854, "loss": 0.9977, "accuracy": 0.46875, "learning_rate": 3.851521043982716e-06, "epoch": 0.9537280258638109, "percentage": 31.82, "elapsed_time": "1:35:13", "remaining_time": "3:24:01"}
{"current_steps": 600, "total_steps": 1854, "loss": 0.9592, "accuracy": 0.512499988079071, "learning_rate": 3.81568841174086e-06, "epoch": 0.9698929076581128, "percentage": 32.36, "elapsed_time": "1:36:53", "remaining_time": "3:22:30"}
{"current_steps": 610, "total_steps": 1854, "loss": 0.9233, "accuracy": 0.5375000238418579, "learning_rate": 3.7794779726790664e-06, "epoch": 0.9860577894524146, "percentage": 32.9, "elapsed_time": "1:38:27", "remaining_time": "3:20:47"}
{"current_steps": 620, "total_steps": 1854, "loss": 0.9302, "accuracy": 0.59375, "learning_rate": 3.7429001248146096e-06, "epoch": 1.0022226712467166, "percentage": 33.44, "elapsed_time": "1:40:05", "remaining_time": "3:19:11"}
{"current_steps": 630, "total_steps": 1854, "loss": 1.046, "accuracy": 0.543749988079071, "learning_rate": 3.7059653716681227e-06, "epoch": 1.0183875530410185, "percentage": 33.98, "elapsed_time": "1:41:36", "remaining_time": "3:17:24"}
{"current_steps": 640, "total_steps": 1854, "loss": 0.9434, "accuracy": 0.543749988079071, "learning_rate": 3.668684319247463e-06, "epoch": 1.0345524348353203, "percentage": 34.52, "elapsed_time": "1:43:03", "remaining_time": "3:15:30"}
{"current_steps": 650, "total_steps": 1854, "loss": 0.9515, "accuracy": 0.518750011920929, "learning_rate": 3.6310676730021373e-06, "epoch": 1.0507173166296222, "percentage": 35.06, "elapsed_time": "1:44:34", "remaining_time": "3:13:42"}
{"current_steps": 660, "total_steps": 1854, "loss": 1.004, "accuracy": 0.512499988079071, "learning_rate": 3.593126234749178e-06, "epoch": 1.066882198423924, "percentage": 35.6, "elapsed_time": "1:46:09", "remaining_time": "3:12:03"}
{"current_steps": 670, "total_steps": 1854, "loss": 0.9774, "accuracy": 0.5562499761581421, "learning_rate": 3.554870899571343e-06, "epoch": 1.083047080218226, "percentage": 36.14, "elapsed_time": "1:47:45", "remaining_time": "3:10:25"}
{"current_steps": 680, "total_steps": 1854, "loss": 0.9409, "accuracy": 0.5562499761581421, "learning_rate": 3.5163126526885373e-06, "epoch": 1.0992119620125278, "percentage": 36.68, "elapsed_time": "1:49:22", "remaining_time": "3:08:49"}
{"current_steps": 690, "total_steps": 1854, "loss": 0.9427, "accuracy": 0.543749988079071, "learning_rate": 3.4774625663033484e-06, "epoch": 1.1153768438068297, "percentage": 37.22, "elapsed_time": "1:50:55", "remaining_time": "3:07:07"}
{"current_steps": 700, "total_steps": 1854, "loss": 0.9448, "accuracy": 0.44999998807907104, "learning_rate": 3.4383317964216067e-06, "epoch": 1.1315417256011315, "percentage": 37.76, "elapsed_time": "1:52:29", "remaining_time": "3:05:26"}
{"current_steps": 710, "total_steps": 1854, "loss": 0.9792, "accuracy": 0.5, "learning_rate": 3.398931579648877e-06, "epoch": 1.1477066073954334, "percentage": 38.3, "elapsed_time": "1:54:07", "remaining_time": "3:03:53"}
{"current_steps": 720, "total_steps": 1854, "loss": 0.9215, "accuracy": 0.53125, "learning_rate": 3.359273229963813e-06, "epoch": 1.1638714891897353, "percentage": 38.83, "elapsed_time": "1:55:43", "remaining_time": "3:02:15"}
{"current_steps": 730, "total_steps": 1854, "loss": 0.9665, "accuracy": 0.543749988079071, "learning_rate": 3.319368135469285e-06, "epoch": 1.1800363709840371, "percentage": 39.37, "elapsed_time": "1:57:12", "remaining_time": "3:00:28"}
{"current_steps": 740, "total_steps": 1854, "loss": 0.8791, "accuracy": 0.612500011920929, "learning_rate": 3.279227755122228e-06, "epoch": 1.196201252778339, "percentage": 39.91, "elapsed_time": "1:58:48", "remaining_time": "2:58:51"}
{"current_steps": 750, "total_steps": 1854, "loss": 1.0252, "accuracy": 0.512499988079071, "learning_rate": 3.2388636154431417e-06, "epoch": 1.2123661345726409, "percentage": 40.45, "elapsed_time": "2:00:26", "remaining_time": "2:57:17"}
{"current_steps": 760, "total_steps": 1854, "loss": 0.9791, "accuracy": 0.5062500238418579, "learning_rate": 3.198287307206192e-06, "epoch": 1.2285310163669427, "percentage": 40.99, "elapsed_time": "2:01:59", "remaining_time": "2:55:35"}
{"current_steps": 770, "total_steps": 1854, "loss": 0.9687, "accuracy": 0.512499988079071, "learning_rate": 3.157510482110856e-06, "epoch": 1.2446958981612446, "percentage": 41.53, "elapsed_time": "2:03:35", "remaining_time": "2:53:59"}
{"current_steps": 780, "total_steps": 1854, "loss": 1.0263, "accuracy": 0.4749999940395355, "learning_rate": 3.116544849436077e-06, "epoch": 1.2608607799555465, "percentage": 42.07, "elapsed_time": "2:05:10", "remaining_time": "2:52:21"}
{"current_steps": 790, "total_steps": 1854, "loss": 0.9049, "accuracy": 0.5375000238418579, "learning_rate": 3.0754021726778848e-06, "epoch": 1.2770256617498483, "percentage": 42.61, "elapsed_time": "2:06:45", "remaining_time": "2:50:43"}
{"current_steps": 800, "total_steps": 1854, "loss": 1.003, "accuracy": 0.48750001192092896, "learning_rate": 3.0340942661714463e-06, "epoch": 1.2931905435441502, "percentage": 43.15, "elapsed_time": "2:08:23", "remaining_time": "2:49:08"}
{"current_steps": 810, "total_steps": 1854, "loss": 0.9729, "accuracy": 0.543749988079071, "learning_rate": 2.992632991698512e-06, "epoch": 1.3093554253384523, "percentage": 43.69, "elapsed_time": "2:09:55", "remaining_time": "2:47:27"}
{"current_steps": 820, "total_steps": 1854, "loss": 0.8851, "accuracy": 0.5062500238418579, "learning_rate": 2.9510302550812537e-06, "epoch": 1.3255203071327541, "percentage": 44.23, "elapsed_time": "2:11:27", "remaining_time": "2:45:45"}
{"current_steps": 830, "total_steps": 1854, "loss": 0.8864, "accuracy": 0.543749988079071, "learning_rate": 2.9092980027634325e-06, "epoch": 1.341685188927056, "percentage": 44.77, "elapsed_time": "2:13:01", "remaining_time": "2:44:07"}
{"current_steps": 840, "total_steps": 1854, "loss": 1.0363, "accuracy": 0.5249999761581421, "learning_rate": 2.867448218379927e-06, "epoch": 1.3578500707213579, "percentage": 45.31, "elapsed_time": "2:14:34", "remaining_time": "2:42:26"}
{"current_steps": 850, "total_steps": 1854, "loss": 1.0687, "accuracy": 0.543749988079071, "learning_rate": 2.825492919315559e-06, "epoch": 1.3740149525156597, "percentage": 45.85, "elapsed_time": "2:16:07", "remaining_time": "2:40:47"}
{"current_steps": 860, "total_steps": 1854, "loss": 0.9379, "accuracy": 0.543749988079071, "learning_rate": 2.7834441532542482e-06, "epoch": 1.3901798343099616, "percentage": 46.39, "elapsed_time": "2:17:43", "remaining_time": "2:39:11"}
{"current_steps": 870, "total_steps": 1854, "loss": 1.0382, "accuracy": 0.550000011920929, "learning_rate": 2.74131399471945e-06, "epoch": 1.4063447161042635, "percentage": 46.93, "elapsed_time": "2:19:17", "remaining_time": "2:37:32"}
{"current_steps": 880, "total_steps": 1854, "loss": 0.9734, "accuracy": 0.5062500238418579, "learning_rate": 2.6991145416068947e-06, "epoch": 1.4225095978985653, "percentage": 47.46, "elapsed_time": "2:20:56", "remaining_time": "2:35:59"}
{"current_steps": 890, "total_steps": 1854, "loss": 0.9081, "accuracy": 0.518750011920929, "learning_rate": 2.6568579117106143e-06, "epoch": 1.4386744796928672, "percentage": 48.0, "elapsed_time": "2:22:32", "remaining_time": "2:34:23"}
{"current_steps": 900, "total_steps": 1854, "loss": 0.9305, "accuracy": 0.4937500059604645, "learning_rate": 2.6145562392432544e-06, "epoch": 1.454839361487169, "percentage": 48.54, "elapsed_time": "2:24:06", "remaining_time": "2:32:45"}
{"current_steps": 910, "total_steps": 1854, "loss": 0.9318, "accuracy": 0.543749988079071, "learning_rate": 2.5722216713516682e-06, "epoch": 1.471004243281471, "percentage": 49.08, "elapsed_time": "2:25:36", "remaining_time": "2:31:03"}
{"current_steps": 920, "total_steps": 1854, "loss": 0.9373, "accuracy": 0.512499988079071, "learning_rate": 2.5298663646288064e-06, "epoch": 1.4871691250757728, "percentage": 49.62, "elapsed_time": "2:27:13", "remaining_time": "2:29:28"}
{"current_steps": 930, "total_steps": 1854, "loss": 1.0298, "accuracy": 0.5062500238418579, "learning_rate": 2.487502481622879e-06, "epoch": 1.503334006870075, "percentage": 50.16, "elapsed_time": "2:28:43", "remaining_time": "2:27:46"}
{"current_steps": 940, "total_steps": 1854, "loss": 0.9767, "accuracy": 0.48750001192092896, "learning_rate": 2.4451421873448253e-06, "epoch": 1.5194988886643768, "percentage": 50.7, "elapsed_time": "2:30:17", "remaining_time": "2:26:07"}
{"current_steps": 950, "total_steps": 1854, "loss": 0.9919, "accuracy": 0.48750001192092896, "learning_rate": 2.40279764577506e-06, "epoch": 1.5356637704586786, "percentage": 51.24, "elapsed_time": "2:31:51", "remaining_time": "2:24:30"}
{"current_steps": 960, "total_steps": 1854, "loss": 0.9153, "accuracy": 0.5375000238418579, "learning_rate": 2.3604810163705242e-06, "epoch": 1.5518286522529805, "percentage": 51.78, "elapsed_time": "2:33:27", "remaining_time": "2:22:54"}
{"current_steps": 970, "total_steps": 1854, "loss": 0.8943, "accuracy": 0.53125, "learning_rate": 2.3182044505730364e-06, "epoch": 1.5679935340472824, "percentage": 52.32, "elapsed_time": "2:34:59", "remaining_time": "2:21:14"}
{"current_steps": 980, "total_steps": 1854, "loss": 0.901, "accuracy": 0.53125, "learning_rate": 2.275980088319941e-06, "epoch": 1.5841584158415842, "percentage": 52.86, "elapsed_time": "2:36:34", "remaining_time": "2:19:38"}
{"current_steps": 990, "total_steps": 1854, "loss": 0.9171, "accuracy": 0.550000011920929, "learning_rate": 2.2338200545580577e-06, "epoch": 1.600323297635886, "percentage": 53.4, "elapsed_time": "2:38:05", "remaining_time": "2:17:58"}
{"current_steps": 1000, "total_steps": 1854, "loss": 0.8458, "accuracy": 0.5562499761581421, "learning_rate": 2.191736455761947e-06, "epoch": 1.616488179430188, "percentage": 53.94, "elapsed_time": "2:39:34", "remaining_time": "2:16:16"}
{"current_steps": 1000, "total_steps": 1854, "eval_loss": 0.9560017585754395, "epoch": 1.616488179430188, "percentage": 53.94, "elapsed_time": "2:42:46", "remaining_time": "2:19:00"}
{"current_steps": 1010, "total_steps": 1854, "loss": 0.9769, "accuracy": 0.5625, "learning_rate": 2.1497413764574673e-06, "epoch": 1.6326530612244898, "percentage": 54.48, "elapsed_time": "2:44:33", "remaining_time": "2:17:30"}
{"current_steps": 1020, "total_steps": 1854, "loss": 0.943, "accuracy": 0.5375000238418579, "learning_rate": 2.1078468757516395e-06, "epoch": 1.6488179430187917, "percentage": 55.02, "elapsed_time": "2:46:05", "remaining_time": "2:15:47"}
{"current_steps": 1030, "total_steps": 1854, "loss": 0.9471, "accuracy": 0.46875, "learning_rate": 2.0660649838698145e-06, "epoch": 1.6649828248130936, "percentage": 55.56, "elapsed_time": "2:47:39", "remaining_time": "2:14:07"}
{"current_steps": 1040, "total_steps": 1854, "loss": 0.9776, "accuracy": 0.543749988079071, "learning_rate": 2.0244076987011284e-06, "epoch": 1.6811477066073954, "percentage": 56.09, "elapsed_time": "2:49:14", "remaining_time": "2:12:28"}
{"current_steps": 1050, "total_steps": 1854, "loss": 0.9472, "accuracy": 0.5375000238418579, "learning_rate": 1.982886982353251e-06, "epoch": 1.6973125884016973, "percentage": 56.63, "elapsed_time": "2:50:49", "remaining_time": "2:10:47"}
{"current_steps": 1060, "total_steps": 1854, "loss": 0.921, "accuracy": 0.5375000238418579, "learning_rate": 1.941514757717392e-06, "epoch": 1.7134774701959992, "percentage": 57.17, "elapsed_time": "2:52:25", "remaining_time": "2:09:09"}
{"current_steps": 1070, "total_steps": 1854, "loss": 0.9734, "accuracy": 0.512499988079071, "learning_rate": 1.9003029050445953e-06, "epoch": 1.729642351990301, "percentage": 57.71, "elapsed_time": "2:54:03", "remaining_time": "2:07:32"}
{"current_steps": 1080, "total_steps": 1854, "loss": 0.9396, "accuracy": 0.5249999761581421, "learning_rate": 1.8592632585342523e-06, "epoch": 1.745807233784603, "percentage": 58.25, "elapsed_time": "2:55:37", "remaining_time": "2:05:51"}
{"current_steps": 1090, "total_steps": 1854, "loss": 0.9053, "accuracy": 0.5, "learning_rate": 1.8184076029358527e-06, "epoch": 1.7619721155789048, "percentage": 58.79, "elapsed_time": "2:57:09", "remaining_time": "2:04:10"}
{"current_steps": 1100, "total_steps": 1854, "loss": 0.9752, "accuracy": 0.543749988079071, "learning_rate": 1.7777476701649318e-06, "epoch": 1.7781369973732066, "percentage": 59.33, "elapsed_time": "2:58:46", "remaining_time": "2:02:32"}
{"current_steps": 1110, "total_steps": 1854, "loss": 0.8994, "accuracy": 0.5062500238418579, "learning_rate": 1.7372951359341925e-06, "epoch": 1.7943018791675085, "percentage": 59.87, "elapsed_time": "3:00:16", "remaining_time": "2:00:50"}
{"current_steps": 1120, "total_steps": 1854, "loss": 0.8967, "accuracy": 0.543749988079071, "learning_rate": 1.6970616164007547e-06, "epoch": 1.8104667609618104, "percentage": 60.41, "elapsed_time": "3:01:44", "remaining_time": "1:59:06"}
{"current_steps": 1130, "total_steps": 1854, "loss": 0.9437, "accuracy": 0.5625, "learning_rate": 1.6570586648305276e-06, "epoch": 1.8266316427561122, "percentage": 60.95, "elapsed_time": "3:03:16", "remaining_time": "1:57:25"}
{"current_steps": 1140, "total_steps": 1854, "loss": 0.9326, "accuracy": 0.550000011920929, "learning_rate": 1.6172977682806151e-06, "epoch": 1.842796524550414, "percentage": 61.49, "elapsed_time": "3:04:48", "remaining_time": "1:55:45"}
{"current_steps": 1150, "total_steps": 1854, "loss": 0.9689, "accuracy": 0.518750011920929, "learning_rate": 1.5777903443007586e-06, "epoch": 1.858961406344716, "percentage": 62.03, "elapsed_time": "3:06:22", "remaining_time": "1:54:05"}
{"current_steps": 1160, "total_steps": 1854, "loss": 0.9893, "accuracy": 0.550000011920929, "learning_rate": 1.5385477376547226e-06, "epoch": 1.8751262881390178, "percentage": 62.57, "elapsed_time": "3:07:57", "remaining_time": "1:52:26"}
{"current_steps": 1170, "total_steps": 1854, "loss": 0.9543, "accuracy": 0.518750011920929, "learning_rate": 1.4995812170625845e-06, "epoch": 1.89129116993332, "percentage": 63.11, "elapsed_time": "3:09:32", "remaining_time": "1:50:48"}
{"current_steps": 1180, "total_steps": 1854, "loss": 0.9778, "accuracy": 0.543749988079071, "learning_rate": 1.4609019719648666e-06, "epoch": 1.9074560517276218, "percentage": 63.65, "elapsed_time": "3:11:07", "remaining_time": "1:49:10"}
{"current_steps": 1190, "total_steps": 1854, "loss": 0.8972, "accuracy": 0.574999988079071, "learning_rate": 1.42252110930943e-06, "epoch": 1.9236209335219236, "percentage": 64.19, "elapsed_time": "3:12:35", "remaining_time": "1:47:27"}
{"current_steps": 1200, "total_steps": 1854, "loss": 0.9217, "accuracy": 0.512499988079071, "learning_rate": 1.3844496503620493e-06, "epoch": 1.9397858153162255, "percentage": 64.72, "elapsed_time": "3:14:12", "remaining_time": "1:45:50"}
{"current_steps": 1210, "total_steps": 1854, "loss": 1.0086, "accuracy": 0.5062500238418579, "learning_rate": 1.3466985275416081e-06, "epoch": 1.9559506971105274, "percentage": 65.26, "elapsed_time": "3:15:49", "remaining_time": "1:44:13"}
{"current_steps": 1220, "total_steps": 1854, "loss": 0.8897, "accuracy": 0.59375, "learning_rate": 1.309278581280791e-06, "epoch": 1.9721155789048292, "percentage": 65.8, "elapsed_time": "3:17:21", "remaining_time": "1:42:33"}
{"current_steps": 1230, "total_steps": 1854, "loss": 0.9729, "accuracy": 0.5, "learning_rate": 1.272200556913199e-06, "epoch": 1.9882804606991311, "percentage": 66.34, "elapsed_time": "3:18:56", "remaining_time": "1:40:55"}
{"current_steps": 1240, "total_steps": 1854, "loss": 0.8947, "accuracy": 0.574999988079071, "learning_rate": 1.2354751015877698e-06, "epoch": 2.004445342493433, "percentage": 66.88, "elapsed_time": "3:20:28", "remaining_time": "1:39:15"}
{"current_steps": 1250, "total_steps": 1854, "loss": 0.9609, "accuracy": 0.543749988079071, "learning_rate": 1.1991127612113945e-06, "epoch": 2.020610224287735, "percentage": 67.42, "elapsed_time": "3:22:03", "remaining_time": "1:37:37"}
{"current_steps": 1260, "total_steps": 1854, "loss": 0.9325, "accuracy": 0.46875, "learning_rate": 1.1631239774206035e-06, "epoch": 2.036775106082037, "percentage": 67.96, "elapsed_time": "3:23:33", "remaining_time": "1:35:57"}
{"current_steps": 1270, "total_steps": 1854, "loss": 0.9484, "accuracy": 0.606249988079071, "learning_rate": 1.1275190845831978e-06, "epoch": 2.052939987876339, "percentage": 68.5, "elapsed_time": "3:25:11", "remaining_time": "1:34:21"}
{"current_steps": 1280, "total_steps": 1854, "loss": 0.94, "accuracy": 0.5562499761581421, "learning_rate": 1.0923083068306778e-06, "epoch": 2.0691048696706407, "percentage": 69.04, "elapsed_time": "3:26:48", "remaining_time": "1:32:44"}
{"current_steps": 1290, "total_steps": 1854, "loss": 0.8412, "accuracy": 0.5249999761581421, "learning_rate": 1.0575017551223348e-06, "epoch": 2.0852697514649425, "percentage": 69.58, "elapsed_time": "3:28:18", "remaining_time": "1:31:04"}
{"current_steps": 1300, "total_steps": 1854, "loss": 0.9444, "accuracy": 0.5375000238418579, "learning_rate": 1.023109424341833e-06, "epoch": 2.1014346332592444, "percentage": 70.12, "elapsed_time": "3:29:52", "remaining_time": "1:29:26"}
{"current_steps": 1310, "total_steps": 1854, "loss": 0.9076, "accuracy": 0.5687500238418579, "learning_rate": 9.891411904271273e-07, "epoch": 2.1175995150535463, "percentage": 70.66, "elapsed_time": "3:31:26", "remaining_time": "1:27:48"}
{"current_steps": 1320, "total_steps": 1854, "loss": 0.9162, "accuracy": 0.550000011920929, "learning_rate": 9.556068075345363e-07, "epoch": 2.133764396847848, "percentage": 71.2, "elapsed_time": "3:33:00", "remaining_time": "1:26:10"}
{"current_steps": 1330, "total_steps": 1854, "loss": 0.9658, "accuracy": 0.5625, "learning_rate": 9.225159052377838e-07, "epoch": 2.14992927864215, "percentage": 71.74, "elapsed_time": "3:34:35", "remaining_time": "1:24:32"}
{"current_steps": 1340, "total_steps": 1854, "loss": 0.8306, "accuracy": 0.550000011920929, "learning_rate": 8.898779857628184e-07, "epoch": 2.166094160436452, "percentage": 72.28, "elapsed_time": "3:36:08", "remaining_time": "1:22:54"}
{"current_steps": 1350, "total_steps": 1854, "loss": 0.9639, "accuracy": 0.4937500059604645, "learning_rate": 8.577024212591975e-07, "epoch": 2.1822590422307537, "percentage": 72.82, "elapsed_time": "3:37:42", "remaining_time": "1:21:16"}
{"current_steps": 1360, "total_steps": 1854, "loss": 0.9451, "accuracy": 0.5062500238418579, "learning_rate": 8.259984511088276e-07, "epoch": 2.1984239240250556, "percentage": 73.35, "elapsed_time": "3:39:16", "remaining_time": "1:19:38"}
{"current_steps": 1370, "total_steps": 1854, "loss": 0.9559, "accuracy": 0.550000011920929, "learning_rate": 7.947751792728237e-07, "epoch": 2.2145888058193575, "percentage": 73.89, "elapsed_time": "3:40:47", "remaining_time": "1:18:00"}
{"current_steps": 1380, "total_steps": 1854, "loss": 0.9579, "accuracy": 0.543749988079071, "learning_rate": 7.640415716772626e-07, "epoch": 2.2307536876136593, "percentage": 74.43, "elapsed_time": "3:42:26", "remaining_time": "1:16:24"}
{"current_steps": 1390, "total_steps": 1854, "loss": 0.9136, "accuracy": 0.5375000238418579, "learning_rate": 7.338064536385722e-07, "epoch": 2.246918569407961, "percentage": 74.97, "elapsed_time": "3:44:03", "remaining_time": "1:14:47"}
{"current_steps": 1400, "total_steps": 1854, "loss": 1.0184, "accuracy": 0.48750001192092896, "learning_rate": 7.040785073292883e-07, "epoch": 2.263083451202263, "percentage": 75.51, "elapsed_time": "3:45:36", "remaining_time": "1:13:09"}
{"current_steps": 1410, "total_steps": 1854, "loss": 0.9275, "accuracy": 0.5249999761581421, "learning_rate": 6.748662692849297e-07, "epoch": 2.279248332996565, "percentage": 76.05, "elapsed_time": "3:47:09", "remaining_time": "1:11:31"}
{"current_steps": 1420, "total_steps": 1854, "loss": 0.9025, "accuracy": 0.512499988079071, "learning_rate": 6.46178127952686e-07, "epoch": 2.295413214790867, "percentage": 76.59, "elapsed_time": "3:48:41", "remaining_time": "1:09:53"}
{"current_steps": 1430, "total_steps": 1854, "loss": 0.9249, "accuracy": 0.5249999761581421, "learning_rate": 6.180223212826289e-07, "epoch": 2.3115780965851687, "percentage": 77.13, "elapsed_time": "3:50:13", "remaining_time": "1:08:15"}
{"current_steps": 1440, "total_steps": 1854, "loss": 0.9766, "accuracy": 0.5625, "learning_rate": 5.904069343621443e-07, "epoch": 2.3277429783794705, "percentage": 77.67, "elapsed_time": "3:51:49", "remaining_time": "1:06:39"}
{"current_steps": 1450, "total_steps": 1854, "loss": 0.8927, "accuracy": 0.5, "learning_rate": 5.633398970942544e-07, "epoch": 2.3439078601737724, "percentage": 78.21, "elapsed_time": "3:53:21", "remaining_time": "1:05:01"}
{"current_steps": 1460, "total_steps": 1854, "loss": 0.8585, "accuracy": 0.518750011920929, "learning_rate": 5.368289819205069e-07, "epoch": 2.3600727419680743, "percentage": 78.75, "elapsed_time": "3:54:49", "remaining_time": "1:03:22"}
{"current_steps": 1470, "total_steps": 1854, "loss": 0.9531, "accuracy": 0.518750011920929, "learning_rate": 5.108818015890785e-07, "epoch": 2.376237623762376, "percentage": 79.29, "elapsed_time": "3:56:25", "remaining_time": "1:01:45"}
{"current_steps": 1480, "total_steps": 1854, "loss": 0.9111, "accuracy": 0.543749988079071, "learning_rate": 4.855058069687291e-07, "epoch": 2.392402505556678, "percentage": 79.83, "elapsed_time": "3:57:55", "remaining_time": "1:00:07"}
{"current_steps": 1490, "total_steps": 1854, "loss": 1.0107, "accuracy": 0.512499988079071, "learning_rate": 4.607082849092523e-07, "epoch": 2.40856738735098, "percentage": 80.37, "elapsed_time": "3:59:34", "remaining_time": "0:58:31"}
{"current_steps": 1500, "total_steps": 1854, "loss": 0.9219, "accuracy": 0.5062500238418579, "learning_rate": 4.3649635614901405e-07, "epoch": 2.4247322691452817, "percentage": 80.91, "elapsed_time": "4:01:09", "remaining_time": "0:56:54"}
{"current_steps": 1500, "total_steps": 1854, "eval_loss": 0.9497246742248535, "epoch": 2.4247322691452817, "percentage": 80.91, "elapsed_time": "4:04:22", "remaining_time": "0:57:40"}
{"current_steps": 1510, "total_steps": 1854, "loss": 0.9062, "accuracy": 0.5375000238418579, "learning_rate": 4.128769732701973e-07, "epoch": 2.4408971509395836, "percentage": 81.45, "elapsed_time": "4:05:56", "remaining_time": "0:56:01"}
{"current_steps": 1520, "total_steps": 1854, "loss": 0.9487, "accuracy": 0.5, "learning_rate": 3.8985691870233046e-07, "epoch": 2.4570620327338855, "percentage": 81.98, "elapsed_time": "4:07:28", "remaining_time": "0:54:22"}
{"current_steps": 1530, "total_steps": 1854, "loss": 0.9661, "accuracy": 0.53125, "learning_rate": 3.6744280277467904e-07, "epoch": 2.4732269145281873, "percentage": 82.52, "elapsed_time": "4:08:59", "remaining_time": "0:52:43"}
{"current_steps": 1540, "total_steps": 1854, "loss": 0.8596, "accuracy": 0.5625, "learning_rate": 3.456410618180503e-07, "epoch": 2.489391796322489, "percentage": 83.06, "elapsed_time": "4:10:33", "remaining_time": "0:51:05"}
{"current_steps": 1550, "total_steps": 1854, "loss": 0.9137, "accuracy": 0.53125, "learning_rate": 3.244579563165753e-07, "epoch": 2.5055566781167915, "percentage": 83.6, "elapsed_time": "4:12:04", "remaining_time": "0:49:26"}
{"current_steps": 1560, "total_steps": 1854, "loss": 0.9267, "accuracy": 0.5375000238418579, "learning_rate": 3.038995691099697e-07, "epoch": 2.521721559911093, "percentage": 84.14, "elapsed_time": "4:13:34", "remaining_time": "0:47:47"}
{"current_steps": 1570, "total_steps": 1854, "loss": 1.0574, "accuracy": 0.512499988079071, "learning_rate": 2.839718036468192e-07, "epoch": 2.5378864417053952, "percentage": 84.68, "elapsed_time": "4:15:07", "remaining_time": "0:46:08"}
{"current_steps": 1580, "total_steps": 1854, "loss": 1.0579, "accuracy": 0.4749999940395355, "learning_rate": 2.646803822893723e-07, "epoch": 2.5540513234996967, "percentage": 85.22, "elapsed_time": "4:16:39", "remaining_time": "0:44:30"}
{"current_steps": 1590, "total_steps": 1854, "loss": 0.9704, "accuracy": 0.512499988079071, "learning_rate": 2.460308446703341e-07, "epoch": 2.570216205293999, "percentage": 85.76, "elapsed_time": "4:18:11", "remaining_time": "0:42:52"}
{"current_steps": 1600, "total_steps": 1854, "loss": 0.9107, "accuracy": 0.5874999761581421, "learning_rate": 2.2802854610213143e-07, "epoch": 2.5863810870883004, "percentage": 86.3, "elapsed_time": "4:19:43", "remaining_time": "0:41:13"}
{"current_steps": 1610, "total_steps": 1854, "loss": 0.9881, "accuracy": 0.5375000238418579, "learning_rate": 2.106786560391072e-07, "epoch": 2.6025459688826027, "percentage": 86.84, "elapsed_time": "4:21:14", "remaining_time": "0:39:35"}
{"current_steps": 1620, "total_steps": 1854, "loss": 0.9563, "accuracy": 0.5, "learning_rate": 1.9398615659308255e-07, "epoch": 2.6187108506769046, "percentage": 87.38, "elapsed_time": "4:22:47", "remaining_time": "0:37:57"}
{"current_steps": 1630, "total_steps": 1854, "loss": 0.9756, "accuracy": 0.5, "learning_rate": 1.7795584110272184e-07, "epoch": 2.6348757324712064, "percentage": 87.92, "elapsed_time": "4:24:25", "remaining_time": "0:36:20"}
{"current_steps": 1640, "total_steps": 1854, "loss": 0.9294, "accuracy": 0.4749999940395355, "learning_rate": 1.6259231275709636e-07, "epoch": 2.6510406142655083, "percentage": 88.46, "elapsed_time": "4:26:00", "remaining_time": "0:34:42"}
{"current_steps": 1650, "total_steps": 1854, "loss": 0.9021, "accuracy": 0.5375000238418579, "learning_rate": 1.478999832738548e-07, "epoch": 2.66720549605981, "percentage": 89.0, "elapsed_time": "4:27:32", "remaining_time": "0:33:04"}
{"current_steps": 1660, "total_steps": 1854, "loss": 0.8916, "accuracy": 0.512499988079071, "learning_rate": 1.338830716323769e-07, "epoch": 2.683370377854112, "percentage": 89.54, "elapsed_time": "4:29:08", "remaining_time": "0:31:27"}
{"current_steps": 1670, "total_steps": 1854, "loss": 0.9171, "accuracy": 0.518750011920929, "learning_rate": 1.205456028622723e-07, "epoch": 2.699535259648414, "percentage": 90.08, "elapsed_time": "4:30:36", "remaining_time": "0:29:48"}
{"current_steps": 1680, "total_steps": 1854, "loss": 0.9016, "accuracy": 0.5874999761581421, "learning_rate": 1.0789140688756805e-07, "epoch": 2.7157001414427158, "percentage": 90.61, "elapsed_time": "4:32:08", "remaining_time": "0:28:11"}
{"current_steps": 1690, "total_steps": 1854, "loss": 0.9688, "accuracy": 0.44999998807907104, "learning_rate": 9.592411742693098e-08, "epoch": 2.7318650232370176, "percentage": 91.15, "elapsed_time": "4:33:36", "remaining_time": "0:26:33"}
{"current_steps": 1700, "total_steps": 1854, "loss": 0.894, "accuracy": 0.59375, "learning_rate": 8.464717095022168e-08, "epoch": 2.7480299050313195, "percentage": 91.69, "elapsed_time": "4:35:08", "remaining_time": "0:24:55"}
{"current_steps": 1710, "total_steps": 1854, "loss": 0.9886, "accuracy": 0.4437499940395355, "learning_rate": 7.406380569169841e-08, "epoch": 2.7641947868256214, "percentage": 92.23, "elapsed_time": "4:36:41", "remaining_time": "0:23:17"}
{"current_steps": 1720, "total_steps": 1854, "loss": 0.9715, "accuracy": 0.5, "learning_rate": 6.417706072013808e-08, "epoch": 2.7803596686199232, "percentage": 92.77, "elapsed_time": "4:38:15", "remaining_time": "0:21:40"}
{"current_steps": 1730, "total_steps": 1854, "loss": 0.9602, "accuracy": 0.5, "learning_rate": 5.498977506615294e-08, "epoch": 2.796524550414225, "percentage": 93.31, "elapsed_time": "4:39:51", "remaining_time": "0:20:03"}
{"current_steps": 1740, "total_steps": 1854, "loss": 1.0182, "accuracy": 0.5625, "learning_rate": 4.6504586906947756e-08, "epoch": 2.812689432208527, "percentage": 93.85, "elapsed_time": "4:41:24", "remaining_time": "0:18:26"}
{"current_steps": 1750, "total_steps": 1854, "loss": 1.0459, "accuracy": 0.46875, "learning_rate": 3.8723932808754914e-08, "epoch": 2.828854314002829, "percentage": 94.39, "elapsed_time": "4:43:00", "remaining_time": "0:16:49"}
{"current_steps": 1760, "total_steps": 1854, "loss": 0.9285, "accuracy": 0.543749988079071, "learning_rate": 3.1650047027158014e-08, "epoch": 2.8450191957971307, "percentage": 94.93, "elapsed_time": "4:44:35", "remaining_time": "0:15:12"}
{"current_steps": 1770, "total_steps": 1854, "loss": 0.8928, "accuracy": 0.5249999761581421, "learning_rate": 2.5284960865517848e-08, "epoch": 2.8611840775914326, "percentage": 95.47, "elapsed_time": "4:46:11", "remaining_time": "0:13:34"}
{"current_steps": 1780, "total_steps": 1854, "loss": 0.8926, "accuracy": 0.59375, "learning_rate": 1.9630502091670388e-08, "epoch": 2.8773489593857344, "percentage": 96.01, "elapsed_time": "4:47:43", "remaining_time": "0:11:57"}
{"current_steps": 1790, "total_steps": 1854, "loss": 0.8723, "accuracy": 0.543749988079071, "learning_rate": 1.4688294413074677e-08, "epoch": 2.8935138411800363, "percentage": 96.55, "elapsed_time": "4:49:13", "remaining_time": "0:10:20"}
{"current_steps": 1800, "total_steps": 1854, "loss": 0.9156, "accuracy": 0.5062500238418579, "learning_rate": 1.0459757010556626e-08, "epoch": 2.909678722974338, "percentage": 97.09, "elapsed_time": "4:50:46", "remaining_time": "0:08:43"}
{"current_steps": 1810, "total_steps": 1854, "loss": 0.9617, "accuracy": 0.48124998807907104, "learning_rate": 6.94610413078306e-09, "epoch": 2.92584360476864, "percentage": 97.63, "elapsed_time": "4:52:14", "remaining_time": "0:07:06"}
{"current_steps": 1820, "total_steps": 1854, "loss": 0.8634, "accuracy": 0.606249988079071, "learning_rate": 4.14834473758563e-09, "epoch": 2.942008486562942, "percentage": 98.17, "elapsed_time": "4:53:49", "remaining_time": "0:05:29"}
{"current_steps": 1830, "total_steps": 1854, "loss": 0.881, "accuracy": 0.5562499761581421, "learning_rate": 2.067282222230349e-09, "epoch": 2.9581733683572438, "percentage": 98.71, "elapsed_time": "4:55:28", "remaining_time": "0:03:52"}
{"current_steps": 1840, "total_steps": 1854, "loss": 0.9018, "accuracy": 0.5625, "learning_rate": 7.035141727212979e-10, "epoch": 2.9743382501515456, "percentage": 99.24, "elapsed_time": "4:56:57", "remaining_time": "0:02:15"}
{"current_steps": 1850, "total_steps": 1854, "loss": 1.097, "accuracy": 0.543749988079071, "learning_rate": 5.743220219761592e-11, "epoch": 2.9905031319458475, "percentage": 99.78, "elapsed_time": "4:58:32", "remaining_time": "0:00:38"}
{"current_steps": 1854, "total_steps": 1854, "epoch": 2.9969690846635686, "percentage": 100.0, "elapsed_time": "4:59:09", "remaining_time": "0:00:00"}