Let's assume the experimenter/interviewer conducts this test 8 times and the interviewer has no bias in favor of reporting heads or tails.

In those 8 trials, twice both coins will come up heads and the interviewer will have to say that at least one was heads.

In 4 of the 8 trials, one will come up heads and the other tails. Half the time (twice)  the experimenter will report at least one heads; the other half (again two of thet trials) at least one tails.

In 2 of the trials the experimenter will be forced to say at least one is a tails.

A total of four times, the experimenter said that at least one was a heads, and this is one of those occasions. On two of those occasions, it was because there were two heads. The probability is 1/2, assuming the experimenter has no bias in favor of reporting heads.

The puzzle does not state what the experimenter's overall strategy is or whether he/she has a bias--only that on this occasion he/she reported at least one heads. Certainly the experimenter can't truthfully say this all the time as sometimes both come out tails. One can only assume a random choice about which toss the experimenter reports.