G-Y444108 (age: 60 ybp) Formula: (60+60)/2 |
Formula: (60+60)/2 |
Branch ID | Sample ID | Number of SNPs | Coverage (bp) | Formula to correct SNPs number | Corrected number of SNPs | Formula to estimate age | Age by this line only |
YF124634 | 0.00 | 8386877 | 0.00/8386877 * 8467165 | 0.00 | 0.00 * 144.41 + 60 | 60 | |
YF117563 | 0.00 | 8408242 | 0.00/8408242 * 8467165 | 0.00 | 0.00 * 144.41 + 60 | 60 |
FAQ: What is YFull's age estimation methodology?
Increase in age Decrease in age
SNPs currently defining G-Y444108 | |
PH1392 | |
FTE4631 / Y444116 | |
FTE5017 / Y444124 | |
FTE6681 / Y444108 | |
MF208698 | |
FTE3749 / Y444121 | |
FTE5632 / Y444123 | |
FTE3490 / Y444127 | |
FTE3029 / Y444119 | |
FTE3255 / Y444111 | |
FTE6957 / Y444128 | |
FTE3752 / Y444118 | |
FTE2786 / Y444110 | |
Y506857 | |
Y506791 / FTE85070 | |
FTE4836 / Y444122 | |
FTE4353 / Y444120 | |
FTE7076 / Y444114(H) | H |
Y444125 / FTE4025 | |
Y446890 | |
FTE6965 / Y444109(H) | H |
MF601705(H) | H |
Y444117 / FTE6953(H) | H |
Y506833 | |
Y506805(H) | H |
FTE7100 / Y444115(H) | H |
FT270194 | |
FT109962(H) | H |
FT330566 | |
MF194657(H) | H |
Y84805 |
Other SNPs possibly defining G-Y444108 | |
Y506890 level G-Y444108<->G-M3422 | |
Y506849 level G-Y444108<->G-M3422 | |
Y506845 level G-Y444108<->G-M3422 | |
Y506788 level G-Y444108<->G-M3422 | |
Y533364 level G-Y444108<->G-M3422 | |
Y506776 level G-Y444108<->G-M3422 | |
Y506792 level G-Y444108<->G-M3422 | |
Y506816 level G-Y444108<->G-M3422 | |
Y506918 level G-Y444108<->G-M3422 | |
Y506810 level G-Y444108<->G-M3422 | |
Y533365 level G-Y444108<->G-M3422 | |
Y503746 level G-Y444108<->G-M3422 |
You can watch theoretical computed paths using PhyloGeographer. We do not guarantee that provided information is correct.
- Theoretical Computed Paths > G-Y444108
- Y Heatmap > G-Y444108
* The PhyloGeographer is not affiliated with YFull