UnitedStatesMinorOutlyingIslands |
appearance as argument number 1 |
No TPTP formula. May not be expressible in strict first order. | Media.kif 2609-2612 | |
No TPTP formula. May not be expressible in strict first order. | Media.kif 2607-2607 | UnitedStatesMinorOutlyingIslands 是 群体 的 instance |
No TPTP formula. May not be expressible in strict first order. | Media.kif 2608-2608 | UnitedStatesMinorOutlyingIslands 是 地缘政治区域 的 instance |
appearance as argument number 2 |
No TPTP formula. May not be expressible in strict first order. | Media.kif 2618-2618 | 贝克岛 是 UnitedStatesMinorOutlyingIslands 的 member |
No TPTP formula. May not be expressible in strict first order. | Media.kif 2619-2619 | Howland岛 是 UnitedStatesMinorOutlyingIslands 的 member |
No TPTP formula. May not be expressible in strict first order. | Media.kif 2620-2620 | 贾维斯岛 是 UnitedStatesMinorOutlyingIslands 的 member |
No TPTP formula. May not be expressible in strict first order. | Media.kif 2625-2625 | 约翰斯顿环礁 是 UnitedStatesMinorOutlyingIslands 的 member |
No TPTP formula. May not be expressible in strict first order. | Media.kif 2621-2621 | 金曼礁 是 UnitedStatesMinorOutlyingIslands 的 member |
No TPTP formula. May not be expressible in strict first order. | Media.kif 2626-2626 | 中途岛屿 是 UnitedStatesMinorOutlyingIslands 的 member |
No TPTP formula. May not be expressible in strict first order. | Media.kif 2622-2622 | 纳瓦萨岛 是 UnitedStatesMinorOutlyingIslands 的 member |
No TPTP formula. May not be expressible in strict first order. | Media.kif 2624-2624 | 巴尔米拉环礁 是 UnitedStatesMinorOutlyingIslands 的 member |
No TPTP formula. May not be expressible in strict first order. | Media.kif 2623-2623 | 苏醒岛 是 UnitedStatesMinorOutlyingIslands 的 member |
No TPTP formula. May not be expressible in strict first order. | domainEnglishFormat.kif 65665-65665 |
appearance as argument number 3 |
No TPTP formula. May not be expressible in strict first order. | Media.kif 2883-2883 | "UM" 在 ISO-3166-1-alpha-2 denotes UnitedStatesMinorOutlyingIslands |
antecedent |
No TPTP formula. May not be expressible in strict first order. | Media.kif 2614-2616 |