# !!!performance-id: pid918805-02 # !!!title: Mazurka in C-sharp minor, Op. 63, No. 3 # !!!trials: 1 # !!!date: 2008/04/04/ # !!!reverse-conductor: Craig Stuart Sapp # !!!performer: Richard Farrell # !!!performance-date: 1999 # !!!label: EMI Phoenixa CDM 7 64136 2 # !!!label-title: Chopin # !!!offset: 0 1.180 97.1 1.798 87.0 2.488 100.0 3.088 130.4 3.548 125.0 4.028 98.4 4.638 125.0 5.118 150.0 5.518 130.4 5.978 142.9 6.398 125.0 6.878 100.0 7.478 142.9 7.898 120.0 8.398 124.5 8.880 115.8 9.398 109.1 9.948 93.8 10.588 125.0 11.068 122.4 11.558 139.5 11.988 125.0 12.468 122.4 12.958 105.3 13.528 98.4 14.138 92.3 14.788 95.2 15.418 139.5 15.848 127.7 16.318 109.1 16.868 142.9 17.288 150.0 17.688 140.2 18.116 138.9 18.548 127.7 19.018 101.7 19.608 125.0 20.088 89.2 20.761 134.2 21.208 122.4 21.698 133.3 22.148 142.9 22.568 117.6 23.078 103.4 23.658 117.4 24.169 113.4 24.698 78.4 25.463 94.5 26.098 100.0 26.698 88.2 27.378 111.1 27.918 136.4 28.358 125.0 28.838 115.4 29.358 171.4 29.708 107.1 30.268 133.3 30.718 146.3 31.128 130.4 31.588 146.3 31.998 153.8 32.388 130.2 32.849 143.2 33.268 127.7 33.738 113.2 34.268 107.1 34.828 139.5 35.258 96.5 35.880 128.2 36.348 125.0 36.828 96.8 37.448 105.3 38.018 75.9 38.808 76.9 39.588 84.5 40.298 125.0 40.778 128.5 41.245 116.3 41.761 159.2 42.138 96.8 42.758 113.2 43.288 142.2 43.710 128.2 44.178 142.9 44.598 157.9 44.978 142.9 45.398 139.5 45.828 133.3 46.278 117.6 46.788 115.4 47.308 117.6 47.818 111.1 48.358 103.4 48.938 90.9 49.598 78.9 50.358 73.2 51.178 62.5 52.138 86.6 52.831 120.7 53.328 142.9 53.748 115.4 54.268 135.7 54.710 123.0 55.198 117.6 55.708 157.9 56.088 125.0 56.568 95.2 57.198 105.3 57.768 92.3 58.418 86.2 59.114 135.1 59.558 125.0 60.038 122.4 60.528 139.5 60.958 113.2 61.488 87.0 62.178 125.0 62.658 109.1 63.208 86.7 63.900 87.2 64.588 82.2 65.318 88.2 65.998 120.0 66.498 139.5 66.928 115.4 67.448 150.0 67.848 139.5 68.278 120.0 68.778 111.1 69.318 98.5 69.927 95.1 70.558 83.3 71.278 88.2 71.958 107.1 72.518 127.7 72.988 136.4 73.428 109.1 73.978 142.9 74.398 139.5 74.828 113.2 75.358 122.4 75.848 95.2 76.478 69.0 77.348 87.0 78.038 95.2 78.668 88.2 79.348 95.2 79.978 125.0 80.458 133.3 80.908 127.7 81.378 120.0 81.878 109.1 82.428 115.4 82.948 125.0 83.428 130.4 83.888 125.0 84.368 117.6 84.878 103.4 85.458 120.0 85.958 139.5 86.388 120.0 86.888 130.4 87.348 122.4 87.838 109.1 88.388 95.2 89.018 109.1 89.568 117.6 90.078 115.4 90.598 101.7 91.188 93.8 91.828 98.4 92.438 139.5 92.868 133.3 93.318 109.1 93.868 139.5 94.298 139.5 94.728 136.4 95.168 125.0 95.648 103.4 96.228 93.8 96.868 105.3 97.438 115.4 97.958 136.4 98.398 102.7 98.982 109.9 99.528 75.0 100.328 35.5 102.018 78.1 102.786 129.9 103.248 111.1 103.788 89.2 104.461 72.6 105.288 113.2 105.818 89.6 106.488 74.1 107.298 101.7 107.888 93.9 108.527 96.6 109.148 85.7 109.848 125.0 110.328 127.7 110.798 111.1 111.338 107.1 111.898 103.4 112.478 115.4 112.998 80.5 113.743 120.0 114.243 106.2 114.808 96.8 115.428 95.2 116.058 120.0 116.558 90.9 117.218 115.4 117.738 138.6 118.171 92.7 118.818 84.5 119.528 84.5 120.238 96.8 120.858 122.4 121.348 101.9 121.937 103.3 122.518 75.0 123.318 32.8 125.148 68.3 126.027 115.2 126.548 77.9 127.318 55.0 128.408 132.5