Count data are often analyzed by Poisson regression, generalized to negative binomial (NB) models in overdispersed cases. When zeroes are much too frequent or infrequent, hurdle models use a binary model to predict 0 vs. >0 and a count model (e.g. conditional Poisson or NB) for the exact positive count. Model departures might still occur for very low counts. Thus we extend the binary part to a cumulative logit (CL) ordinal regression model, the conditional count model predicting exact counts within the CL's highest category, say count>L where L>0 (case L=0 is a hurdle model). Exposure time is incorporated. Parameters estimates by ML are asymptotically normal. A simple type of effect sharing between the two parts can reduce dimension. An individual Pearson type statistic crudely assesses fit. A proper, categorized chi square fit test is possible. Models were readily fit in application.