We’ll start with a bank of 16 first, middle, and last names. Each poster will eliminate a full name, until we’re left with one name. The next poster can create a new bank of 16 names.
First Names: [name_f]Amity[/name_f], [name_f]Angelique[/name_f], [name_f]Bronwen[/name_f], [name_u]Chelsea[/name_u], [name_f]Emerald[/name_f], [name_f]Frances[/name_f], [name_f]Gemma[/name_f], [name_u]Hayden[/name_u], [name_f]Isobel[/name_f], [name_u]Julianne[/name_u], [name_u]Kimberly[/name_u], [name_f]Lucille[/name_f], [name_u]Ruby[/name_u], Sarabeth, [name_f]Trinity[/name_f], [name_f]Vivienne[/name_f]
Middle names: Aika, Chiyoko, [name_f]Etsuko[/name_f], [name_f]Hanae[/name_f], [name_f]Izumi[/name_f], [name_f]Kaori[/name_f], [name_f]Keiko[/name_f], [name_f]Manami[/name_f], Miho, [name_f]Naoko[/name_f], [name_u]Ren[/name_u], Satomi, Sayaka, Tomiko, Yumi, Yuzuki
Last names: [name_m]Abe[/name_m], Bushida, Enatsu, Fujihara, Goto, Hagiwara, Hamano, Hikida, Ishibashi, Ito, Kagiyama, Mitsumi, [name_m]Mori[/name_m], Nakanishi, Ogami, Rikimaru
I will start by eliminating Amity Yumi Goto, leaving
First Names: [name_f]Angelique[/name_f], [name_f]Bronwen[/name_f], [name_u]Chelsea[/name_u], [name_f]Emerald[/name_f], [name_f]Frances[/name_f], [name_f]Gemma[/name_f], [name_u]Hayden[/name_u], [name_f]Isobel[/name_f], [name_u]Julianne[/name_u], [name_u]Kimberly[/name_u], [name_f]Lucille[/name_f], [name_u]Ruby[/name_u], Sarabeth, [name_f]Trinity[/name_f], [name_f]Vivienne[/name_f]
Middle names: Aika, Chiyoko, [name_f]Etsuko[/name_f], [name_f]Hanae[/name_f], [name_f]Izumi[/name_f], [name_f]Kaori[/name_f], [name_f]Keiko[/name_f], [name_f]Manami[/name_f], Miho, [name_f]Naoko[/name_f], [name_u]Ren[/name_u], Satomi, Sayaka, Tomiko, Yuzuki
Last names: [name_m]Abe[/name_m], Bushida, Enatsu, Fujihara, Hagiwara, Hamano, Hikida, Ishibashi, Ito, Kagiyama, Mitsumi, [name_m]Mori[/name_m], Nakanishi, Ogami, Rikimaru