G-Z36522 (age: 411 ybp) Formula: (669+207+359)/3 |
Formula: (669+207+359)/3 |
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 |
YF009206 | 4.00 | 8031980 | 4.00/8031980 * 8467165 | 4.22 | 4.22 * 144.41 + 60 | 669 | |
YF064930 | 1.00 | 8309107 | 1.00/8309107 * 8467165 | 1.02 | 1.02 * 144.41 + 60 | 207 | |
YF071598 | 2.00 | 8185070 | 2.00/8185070 * 8467165 | 2.07 | 2.07 * 144.41 + 60 | 359 |
FAQ: What is YFull's age estimation methodology?
Increase in age
Decrease in age
SNPs currently defining G-Z36522 | |
Y102255 | ![]() |
Y109600 | ![]() |
Y109956 | ![]() |
Y111840 | ![]() |
Y112200 | ![]() |
Y85384 | ![]() |
Y85440 | ![]() |
Y87181 | ![]() |
Y87673 | ![]() |
Y88976 | ![]() |
Y92466 | ![]() |
Y95779 | ![]() |
Z36522 | ![]() |
Y102702 | ![]() |
Y93441 | ![]() |
FT255215 / Y181992 | ![]() |
Y103141 | ![]() |
Y107591 | ![]() |
Y105349 | ![]() |
Y102327 | ![]() |
Y102688 | ![]() |
Y105012 | ![]() |
Y111202 | ![]() |
Y112484 | ![]() |
Y86365 | ![]() |
Y86659 | ![]() |
Y90514 | ![]() |
Y94510 | ![]() |
Y109043 | ![]() |
Y93824 | ![]() |
Y108948 | ![]() |
Y102297 | ![]() |
Y98343 | ![]() |
Y106352 | ![]() |
Y83453 | ![]() |
Y177454 / FT104913 | ![]() |
Y177455 / FT104375 | ![]() |
Y98486 | ![]() |
Y111088 | ![]() |
Z36524 | ![]() |
Y98220 | ![]() |
YP1437 | ![]() |
Y27129 | ![]() |
FGC91720 / Y150837 | ![]() |
Other SNPs possibly defining G-Z36522 | |
FT103755 level G-Z36522<->G-Y90753 | ![]() |
FT76476 level G-Z36522<->G-Y90753 | ![]() |
FT65107 level G-Z36522<->G-Y90753 | ![]() |
FT105401 level G-Z36522<->G-Y90753 | ![]() |
FT104955 level G-Z36522<->G-Y90753 | ![]() |
FT74720 level G-Z36522<->G-Y90753 | ![]() |
Y226130 level G-Z36522<->G-Y90753 | ![]() |
FT103646 level G-Z36522<->G-Y90753 | ![]() |
FT255217 / Y178451 level G-Z36522<->G-Y90753 | ![]() |
FT103601 level G-Z36522<->G-Y90753 | ![]() |
FT104851 level G-Z36522<->G-Y90753 | ![]() |
FT104134 level G-Z36522<->G-Y90753 | ![]() |
FT105978 level G-Z36522<->G-Y90753 | ![]() |
FT255216 level G-Z36522<->G-Y90753 | ![]() |
FT45901 level G-Z36522<->G-Y90753 | ![]() |
FT191148 level G-Z36522<->G-Y90753 | ![]() |
STRs | Mutation rate | ANC | DER | |
DYS450 | ![]() |
8 | → | 9 |
DYR453 | ![]() |
8 | → | 9 |
DYR734 | ![]() |
11 | → | 12 |
DYR832 | ![]() |
11 | → | 12 |
DYR54 | ![]() |
11 | → | 10 |
DYS468 | ![]() |
17 | → | 18 |
DYS511 | ![]() |
10 | → | 9 |
DYS592 | ![]() |
12 | → | 13 |
DYF406 | ![]() |
12 | → | 13 |
DYR3 | ![]() |
12 | → | 11 |
DYS541 | ![]() |
11 | → | 12 |
DYS389I | ![]() |
12 | → | 13 |
DYS390 | ![]() |
23 | → | 25 |
DYS708 | ![]() |
27 | → | 29 |
DYS513 | ![]() |
12 | → | 13 |
DYR15 | ![]() |
12 | → | 13 |
DYS510 | ![]() |
19 | → | 17 |
DYS514 | ![]() |
18 | → | 19 |
DYS557 | ![]() |
14 | → | 15 |
DYR6 | ![]() |
14 | → | 13 |
DYS644 | ![]() |
16 | → | 14 |
DYS679 | ![]() |
11 | → | 14 |
DYS456 | ![]() |
15 | → | 16 |
DYR112 | ![]() |
14 | → | 13 |
DYS709 | ![]() |
22 | → | 25 |
DYS722 | ![]() |
21 | → | 23 |
DYR33 | ![]() |
13 | → | 15 |
DYS523 | ![]() |
14 | → | 16 |
DYR162 | ![]() |
15 | → | 14 |
DYS630 | ![]() |
22 | → | 23 |
DYR1 | ![]() |
15 | → | 16 |
DYS570 | ![]() |
19 | → | 20 |
DYS687 | ![]() |
35 | → | 33 |
DYS627 | ![]() |
28 | → | 26 |
DYS547 | ![]() |
42 | → | 45 |
FAQ: What STR interpretations does YFull provide for my sample?
You can watch theoretical computed paths using PhyloGeographer. We do not guarantee that provided information is correct.
- Theoretical Computed Paths > G-Z36522
- Y Heatmap > G-Z36522
* The PhyloGeographer is not affiliated with YFull