We introduce augmented vector spaces of output differences, new generic and black-box distinguishers for Substitution Permutation Network (SPN) ciphers. Our distinguishers are based on a novel method of constructing a vector of size bits from a given vector of size n bits, where and d is a positive integer. We list all such -bit vectors into a set called the corresponding -order augmented set and define its linear span as the corresponding -order augmented vector space . These sets are related to Reed-Muller codes and we prove that the rank of linear span of -order augmented set is using Reed-Muller codes. We then experimentally estimate the number of n-bit vectors required to span augmented vector spaces of output differences. Following these results, we give a generic and efficient algorithm to compute -order augmented vector space (of difference sets) for substitution permutation network ciphers. We apply our algorithm to lightweight ciphers GIFT, PRESENT and SKINNY and provide in-depth comparison of round-reduced ciphers' distinguishers with random sets. Most notably, our new distinguishers for these ciphers cover more rounds than the subspace trails.