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Sword · Blade
Attack Speed 1.11
Range 3
Physical Attack 406–754
Durability 164
Requisite Lv. 87
Requisite Strength 177
Requisite Agility 134
Destroyed to: Pakua Stone ×101
Price 38,880
Hex generation lands in the next phase — UI is in preview.
Dropped by 0
Not dropped by any monster.
Sold by 0
Not sold by any NPC.
Gathered from 0
Not gathered from any node.
Crafted via 3
N/A10-11品单刀
N/A9-10品单刀
Beftissector Blade
Crafted at:
Blacksmith Chang Jie, Blacksmith Chao Jin, Blacksmith Che, Blacksmith Chou, Blacksmith Chu, Blacksmith Fang, Blacksmith Fei, Blacksmith Hak Awei, Blacksmith Hung Hun, Blacksmith Huo, Blacksmith Jong, Blacksmith Kiogan, Blacksmith Ling, Blacksmith Lo Yuan, Blacksmith Lu Jin, Blacksmith Meng, Blacksmith Ning, Blacksmith Oezi, Blacksmith Su, Blacksmith Tu, Blacksmith Tuan Yu, Blacksmith Wang Shi, Blacksmith Wunhen, Blacksmith Yueh, Blacksmith Yueh Kai, Blacksmith Yzoan
| Material | Qty |
|---|---|
|
#828 |
14 |
|
#783 |
3 |
|
#6756 |
3 |
Decomposes into
#5637
Pakua Stone
×202
Raw source row · 216 fields
| ID | 5825 |
|---|---|
| id_major_type | 1 |
| id_sub_type | 2 |
| Name | ☆☆Heartless Falchion |
| file_model_right | Models\Weapons\人物\刀剑\单手单刀\解牛刀\解牛刀.ecm |
| file_model_left | 0 |
| file_matter | Models\Weapons\人物\刀剑\单手单刀\解牛刀\解牛刀.ecm |
| file_icon | Surfaces\图标\通用物品\解牛刀.dds |
| require_strength | 177 |
| require_agility | 134 |
| character_combo_id | 511 |
| require_level | 87 |
| level | 10 |
| damage_low | 406 |
| damage_high_min | 754 |
| damage_high_max | 754 |
| attack_range | 3.0 |
| short_range_mode | 1 |
| durability_min | 164 |
| durability_max | 164 |
| levelup_addon | 1721 |
| material_need | 2 |
| price | 38880 |
| shop_price | 77760 |
| repairfee | 38880 |
| drop_probability_socket0 | 0.5 |
| drop_probability_socket1 | 0.48500001430511475 |
| drop_probability_socket2 | 0.014999999664723873 |
| make_probability_socket0 | 0.4545454680919647 |
| make_probability_socket1 | 0.47727271914482117 |
| make_probability_socket2 | 0.06818182021379471 |
| probability_addon_num1 | 0.699999988079071 |
| probability_addon_num2 | 0.22499999403953552 |
| probability_addon_num3 | 0.07500000298023224 |
| probability_unique | 0.30000001192092896 |
| addons_1_id_addon | 759 |
| addons_1_probability_addon | 0.051086001098155975 |
| addons_2_id_addon | 760 |
| addons_2_probability_addon | 0.025543000549077988 |
| addons_3_id_addon | 761 |
| addons_3_probability_addon | 0.01702900044620037 |
| addons_4_id_addon | 762 |
| addons_4_probability_addon | 0.012771000154316425 |
| addons_5_id_addon | 770 |
| addons_5_probability_addon | 0.051086001098155975 |
| addons_6_id_addon | 771 |
| addons_6_probability_addon | 0.025543000549077988 |
| addons_7_id_addon | 772 |
| addons_7_probability_addon | 0.01702900044620037 |
| addons_8_id_addon | 773 |
| addons_8_probability_addon | 0.012771000154316425 |
| addons_9_id_addon | 1317 |
| addons_9_probability_addon | 0.030650999397039413 |
| addons_10_id_addon | 1318 |
| addons_10_probability_addon | 0.020433999598026276 |
| addons_11_id_addon | 1319 |
| addons_11_probability_addon | 0.015325999818742275 |
| addons_12_id_addon | 1241 |
| addons_12_probability_addon | 0.025543000549077988 |
| addons_13_id_addon | 1242 |
| addons_13_probability_addon | 0.01702900044620037 |
| addons_14_id_addon | 1243 |
| addons_14_probability_addon | 0.012771000154316425 |
| addons_15_id_addon | 1236 |
| addons_15_probability_addon | 0.030650999397039413 |
| addons_16_id_addon | 1237 |
| addons_16_probability_addon | 0.020433999598026276 |
| addons_17_id_addon | 1107 |
| addons_17_probability_addon | 0.025543000549077988 |
| addons_18_id_addon | 1107 |
| addons_18_probability_addon | 0.025543000549077988 |
| addons_19_id_addon | 1108 |
| addons_19_probability_addon | 0.012771000154316425 |
| addons_20_id_addon | 1112 |
| addons_20_probability_addon | 0.025543000549077988 |
| addons_21_id_addon | 1112 |
| addons_21_probability_addon | 0.025543000549077988 |
| addons_22_id_addon | 1113 |
| addons_22_probability_addon | 0.012771000154316425 |
| addons_23_id_addon | 1122 |
| addons_23_probability_addon | 0.04086799919605255 |
| addons_24_id_addon | 1122 |
| addons_24_probability_addon | 0.04086799919605255 |
| addons_25_id_addon | 1123 |
| addons_25_probability_addon | 0.020433999598026276 |
| addons_26_id_addon | 1117 |
| addons_26_probability_addon | 0.025543000549077988 |
| addons_27_id_addon | 1117 |
| addons_27_probability_addon | 0.025543000549077988 |
| addons_28_id_addon | 472 |
| addons_28_probability_addon | 0.33333298563957214 |
| rands_1_id_rand | 759 |
| rands_1_probability_rand | 0.07662815600633621 |
| rands_2_id_rand | 760 |
| rands_2_probability_rand | 0.038314078003168106 |
| rands_3_id_rand | 761 |
| rands_3_probability_rand | 0.025543050840497017 |
| rands_4_id_rand | 762 |
| rands_4_probability_rand | 0.019157039001584053 |
| rands_5_id_rand | 770 |
| rands_5_probability_rand | 0.07662815600633621 |
| rands_6_id_rand | 771 |
| rands_6_probability_rand | 0.038314078003168106 |
| rands_7_id_rand | 772 |
| rands_7_probability_rand | 0.025543050840497017 |
| rands_8_id_rand | 773 |
| rands_8_probability_rand | 0.019157039001584053 |
| rands_9_id_rand | 1317 |
| rands_9_probability_rand | 0.045977093279361725 |
| rands_10_id_rand | 1318 |
| rands_10_probability_rand | 0.030651060864329338 |
| rands_11_id_rand | 1319 |
| rands_11_probability_rand | 0.022989045828580856 |
| rands_12_id_rand | 1241 |
| rands_12_probability_rand | 0.038314078003168106 |
| rands_13_id_rand | 1242 |
| rands_13_probability_rand | 0.025543050840497017 |
| rands_14_id_rand | 1243 |
| rands_14_probability_rand | 0.019157039001584053 |
| rands_15_id_rand | 1236 |
| rands_15_probability_rand | 0.045977093279361725 |
| rands_16_id_rand | 1237 |
| rands_16_probability_rand | 0.030651060864329338 |
| rands_17_id_rand | 1107 |
| rands_17_probability_rand | 0.038314078003168106 |
| rands_18_id_rand | 1107 |
| rands_18_probability_rand | 0.038314078003168106 |
| rands_19_id_rand | 1108 |
| rands_19_probability_rand | 0.019157039001584053 |
| rands_20_id_rand | 1112 |
| rands_20_probability_rand | 0.038314078003168106 |
| rands_21_id_rand | 1112 |
| rands_21_probability_rand | 0.038314078003168106 |
| rands_22_id_rand | 1113 |
| rands_22_probability_rand | 0.019157039001584053 |
| rands_23_id_rand | 1122 |
| rands_23_probability_rand | 0.06130312383174896 |
| rands_24_id_rand | 1122 |
| rands_24_probability_rand | 0.06130312383174896 |
| rands_25_id_rand | 1123 |
| rands_25_probability_rand | 0.030651060864329338 |
| rands_26_id_rand | 1117 |
| rands_26_probability_rand | 0.038314078003168106 |
| rands_27_id_rand | 1117 |
| rands_27_probability_rand | 0.038314078003168106 |
| uniques_1_id_unique | 465 |
| uniques_1_probability_unique | 0.11029396951198578 |
| uniques_2_id_unique | 467 |
| uniques_2_probability_unique | 0.11029396951198578 |
| uniques_3_id_unique | 469 |
| uniques_3_probability_unique | 0.11029396951198578 |
| uniques_4_id_unique | 466 |
| uniques_4_probability_unique | 0.11029396951198578 |
| uniques_5_id_unique | 468 |
| uniques_5_probability_unique | 0.07352964580059052 |
| uniques_6_id_unique | 470 |
| uniques_6_probability_unique | 0.036764323711395264 |
| uniques_7_id_unique | 473 |
| uniques_7_probability_unique | 0.018382661044597626 |
| uniques_8_id_unique | 474 |
| uniques_8_probability_unique | 0.00735326437279582 |
| uniques_9_id_unique | 1284 |
| uniques_9_probability_unique | 0.07352964580059052 |
| uniques_10_id_unique | 1275 |
| uniques_10_probability_unique | 0.07352964580059052 |
| uniques_11_id_unique | 1277 |
| uniques_11_probability_unique | 0.07352964580059052 |
| uniques_12_id_unique | 1295 |
| uniques_12_probability_unique | 0.036764323711395264 |
| uniques_13_id_unique | 1289 |
| uniques_13_probability_unique | 0.036764323711395264 |
| uniques_14_id_unique | 1290 |
| uniques_14_probability_unique | 0.036764323711395264 |
| uniques_15_id_unique | 1293 |
| uniques_15_probability_unique | 0.07352964580059052 |
| uniques_16_id_unique | 420 |
| uniques_16_probability_unique | 0.018382661044597626 |
| durability_drop_min | 82 |
| durability_drop_max | 82 |
| decompose_time | 5 |
| element_id | 5637 |
| element_num | 202 |
| id_drop_after_damaged | 5637 |
| num_drop_after_damaged | 101 |
| pile_num_max | 1 |