Practitioners of geostatistics often need to investigate the second-order dependence structure of their data. Although the semivariogram is used more often in geostattistlcs, however, the covariogram is equivalent in characterizing the spatial dependence and it needs using the covariogram when assesssing whether the underlying process is separable. Hence, many statistical inferences such as testing the separability of the data require knowing the distributions of the sample covariogram. Unfortunately, there is almost no research about the sample covariogram in the spatial statistical literature. In this paper, we derive the asymptotic normality of the sample covariogram under a mixing condition which is satisfied by most geostatistical models. The distributional result is established for nongaussian random fields first and then specialized to gaussian random fields. The distributional results for cases of gaussian random fields are easy to use and the gaussian assumption is satisfied most of time in geostatistical practice. Thus, the results of this paper will be very useful for geostatistical data analysts.