User blog:TySkyo/Reyes' Numbers

Reyes' Numbers are numbers made from the sequence "4, 8, 15, 16, 23, 42", in order.

Reyes' Additive Number ($$R_{0}$$)
$$=4+8+15+16+23+42$$ $$=108$$

Reyes' Multiplicative Number ($$R_{1}$$)
$$=4*8*15*16*23*42$$ $$=7418880$$

Reyes' Exponential Number ($$R_{2}$$)
$$=4^{8^{15^{16^{23^{42}}}}}$$ $$=10^{10^{10^{10^{10^{57.27323887641252}}}}}$$ $$=(^{5}10)^57.27323887641252$$

Reyes' Numbers ($$R_{n}$$)
$$=H_{n+1}(H_{n+1}(H_{n+1}(H_{n+1}(H_{n+1}(4,8),15),16),23),42)$$