# !!!performance-id: pid9048-11 # !!!title: Mazurka in E minor, Op. 17, No. 2 # !!!trials: 1 # !!!date: 2005/07/10/ # !!!reverse-conductor: Craig Stuart Sapp # !!!performer: Frederic Chiu # !!!performance-date: 1999 # !!!label: Harmonia Mundi HMX 2907352.53 # !!!label-title: Chopin Complete Mazurkas # !!!trial-hardware: RM; Intel P4 # !!!trial-cpuspeed: 3.4 GHz # !!!trial-os: Windows XP # !!!offset: 0 1.546 64.0 2.484 71.8 3.320 104.2 3.896 104.0 4.473 96.6 5.094 86.2 5.790 75.2 6.588 69.0 7.457 103.1 8.039 66.4 8.943 93.9 9.582 64.0 10.520 56.2 11.587 113.4 12.116 127.7 12.586 102.9 13.169 146.7 13.578 108.9 14.129 92.2 14.780 127.7 15.250 99.0 15.856 110.5 16.399 123.7 16.884 94.8 17.517 80.2 18.265 120.7 18.762 124.0 19.246 124.5 19.728 84.7 20.436 93.9 21.075 145.6 21.487 141.5 21.911 124.5 22.393 85.5 23.095 64.0 24.033 51.8 25.191 78.0 25.960 86.5 26.654 113.6 27.182 107.7 27.739 92.7 28.386 105.4 28.955 81.6 29.690 71.8 30.526 121.0 31.022 57.4 32.067 88.4 32.746 78.9 33.506 66.0 34.415 118.1 34.923 119.5 35.425 105.4 35.994 135.1 36.438 104.3 37.013 94.9 37.645 113.4 38.174 89.6 38.844 115.4 39.364 118.1 39.872 111.3 40.411 105.4 40.980 125.3 41.459 150.8 41.857 123.2 42.344 83.3 43.064 97.4 43.680 140.8 44.106 126.8 44.579 101.7 45.169 63.6 46.112 69.6 46.974 57.3 48.022 74.9 48.823 134.2 49.270 123.7 49.755 180.2 50.088 115.4 50.608 124.5 51.090 157.9 51.470 142.5 51.891 131.9 52.346 167.6 52.704 141.8 53.127 135.1 53.571 129.9 54.033 156.3 54.417 135.7 54.859 114.1 55.385 148.5 55.789 128.8 56.255 93.8 56.895 118.1 57.403 113.0 57.934 117.4 58.445 112.8 58.977 88.6 59.654 68.0 60.537 109.3 61.086 117.9 61.595 146.0 62.006 123.7 62.491 134.8 62.936 144.9 63.350 146.0 63.761 147.8 64.167 153.1 64.559 147.1 64.967 136.1 65.408 109.5 65.956 133.3 66.406 131.3 66.863 111.9 67.399 108.9 67.950 135.1 68.394 132.5 68.847 116.1 69.364 107.1 69.924 113.0 70.455 104.3 71.030 108.3 71.584 129.0 72.049 107.1 72.609 136.1 73.050 123.5 73.536 134.5 73.982 141.8 74.405 134.2 74.852 116.3 75.368 120.0 75.868 124.0 76.352 122.4 76.842 132.2 77.296 124.5 77.778 118.1 78.286 118.3 78.793 122.7 79.282 125.8 79.759 122.7 80.248 131.6 80.704 113.0 81.235 126.1 81.711 107.7 82.268 110.1 82.813 97.4 83.429 79.9 84.180 86.3 84.875 95.7 85.502 108.5 86.055 114.5 86.579 114.1 87.105 112.6 87.638 104.3 88.213 101.2 88.806 95.7 89.433 91.0 90.092 70.2 90.947 51.4 92.114 65.6 93.028 85.1 93.733 112.4 94.267 104.2 94.843 127.4 95.314 92.3 95.964 95.1 96.595 104.9 97.167 74.9 97.968 77.1 98.746 79.3 99.503 61.3 100.481 88.2 101.161 95.5 101.789 95.7 102.416 122.7 102.905 97.6 103.520 83.8 104.236 128.5 104.703 100.2 105.302 107.0 105.863 107.0 106.424 77.8 107.195 80.8 107.938 114.3 108.463 99.3 109.067 102.7 109.651 72.5 110.479 72.8 111.303 119.0 111.807 126.8 112.280 133.3 112.730 111.7 113.267 99.3 113.871 74.8 114.673 151.5 115.069 134.8 115.514 135.1 115.958 102.9 116.541 69.3 117.407 60.1 118.406 87.2 119.094 130.2 119.555 87.2 120.243 55.9 121.317 53.0 122.449 40.7