does it appear after you are done the process? or are these just screen shots as you are going along? It isn't clear
The interpreting rms error section here suggests you might be more concerned about the individual points. Perhaps the total has been left out if favor of more detailed information during the collection.
The total error is computed by taking the root mean square sum of all the residuals to compute the RMS error. This value describes how consistent the transformation is between the different control points (links). When the error is particularly large, you can remove and add control points to adjust the error. Although the RMS error is a good assessment of the transformation's accuracy, don't confuse a low RMS error with an accurate registration. For example, the transformation may still contain significant errors due to a poorly entered control point. The more control points of equal quality used, the more accurately the polynomial can convert the input data to output coordinates. Typically, the adjust and spline transformations give an RMS of nearly zero or zero; however, this does not mean that the image will be perfectly georeferenced.
The forward residual shows you the error in the same units as the data frame spatial reference. The inverse residual shows you the error in the pixel units. The forward-inverse residual is a measure of how close your accuracy is, measured in pixels. All residuals closer to zero are considered more accurate.
Of course if your intent is to reach zero.. then you may fall into the trap of assuming that the minimum number of points that produces a total of zero is the best... this simply isn't the case
A minimum of four links are required to perform a projective transformation. When only four links are used, the root mean square (RMS) error will be zero. When more points are used, the RMS error will be slightly above zero.