Ok. So, I have an experiment with 5 (five) 2-level factors, F1, F2...F5. An additional variable, not of direct interest, was a hard-to-change factor that called for a  (blocking) variable F6 that essentially divided the experiment into 2 separate 1-week blocks. That's because one of our participant groups had to divide their participation into one week or the other, and we wanted to block for that effect. Let's call the levels of the blocking variable as participant group A and participant group B.  

I had a run budget of 32 runs. So I had two blocks of 16. I was interested in main effects and 2-way interactions for the five main factors of interest F1-F5. 

At some point, someone introduced another complication: in addition to the blocking factor (participant group), I learned there were 2 individuals within each of those participant groups A and B; rather than each run being associated with a specified participant group A or B, as intended, each run was associated with one specific individual within their respective group — that is, one of those two individuals was assigned specific runs within their respective 16-run blocks. That is, individuals 1 and 2 executed (alternately) runs within block 1, and individuals 3 or 4 executed runs (alternately) runs within block 2.  

If I ignore those individuals, and simply treat the design as if it was a randomized design with two blocks, where the blocks are defined by their participant group, what am I doing to my analysis? I assume there will be 'unseen' variance stemming from the fact that there are two individuals within those participant groups, affecting each run differently. Is there a way that I should be conducting or caveating the analysis (ANOVA), knowing how the experiment was actually conducted?