Mr. Simmons. They used no more than 2 or 3 minutes each.

Mr. Eisenberg. Did they make any comments concerning the weapon?

Mr. Simmons. Yes; there were several comments made—particularly with respect to the amount of effort required to open the bolt. As a matter of fact, Mr. Staley had difficulty in opening the bolt in his first firing exercise. He thought it was completely up and it was not, and he had to retrace his steps as he attempted to open the bolt after the first round.

There was also comment made about the trigger pull, which is different as far as these firers are concerned. It is in effect a two-stage operation where the first—in the first stage the trigger is relatively free, and it suddenly required a greater pull to actually fire the weapon.

Mr. Eisenberg. Mr. Simmons, did you prepare a table showing the probability of hit at a given target at given ranges by riflemen with given degrees of accuracy?

Mr. Simmons. Well, we prepared a table which showed what the probability of a hit would be on specific sizes of target as a function of aiming error, and using the appropriate round-to-round dispersion also in these calculations.

Mr. Eisenberg. What were the targets that you used in your calculations?

Mr. Simmons. We used two circular targets, one of 4 inches in radius and one of 9 inches in radius, to approximate the area of the head and the area of the shoulders, or the thorax, actually. And a significant point to these calculations to us is that against the larger target, if you fire with the 0.7 mil aiming error which was observed against the first target, the probability of hitting that target is 1, and it is 1 at all three ranges, out to 270 feet.

Mr. Eisenberg. Can you explain the meaning of the probability being 1?

Mr. Simmons. Well, the probability is effectively one. Actually the number is 0.99 and several more digits afterwards. It is rounded off to 1. Simply implying that the probability of a hit is very high with the small aiming errors and short range.