A \$k\$-hyperperfect number is a natural number \$n \ge 1\$ such that $$n = 1 + k(\sigma(n) − n − 1)$$ where \$\sigma(n)\$ is the sum of the divisors of \$n\$. Note that \$\sigma(n) - n\$ is the proper divisor sum of \$n\$. The sequence of \$k\$-hyperperfect numbers begins $$6, 21, 28, 301, 325, ...