← All items · Weapons
☆☆Sword of Affection
Weapons
Sword · Sword
Attack Rate(Atks/sec) 0.9
Range 3
Physical Attack 475–713
Durability 166
Requisite Lv. 89
Requisite Strength 181
Requisite Agility 137
Destroyed to: Pakua Stone ×103
Price 39,680
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品单剑
N/A9-10品单剑
Sword of ImmortalKiller
| Material | Qty |
|---|---|
Glaze
|
14 |
Cyan Jade
|
3 |
Mythril Bar
|
4 |
Raw source row · 216 fields
| ID | 5846 |
|---|---|
| id_major_type | 1 |
| id_sub_type | 18 |
| Name | ☆☆Sword of Affection |
| file_model_right | Models\Weapons\人物\刀剑\单手单剑\诛仙剑\诛仙剑.ecm |
| file_model_left | 0 |
| file_matter | Models\Weapons\人物\刀剑\单手单剑\诛仙剑\诛仙剑.ecm |
| file_icon | Surfaces\图标\通用物品\诛仙剑.dds |
| require_strength | 181 |
| require_agility | 137 |
| character_combo_id | 511 |
| require_level | 89 |
| level | 10 |
| damage_low | 475 |
| damage_high_min | 713 |
| damage_high_max | 713 |
| attack_range | 3.0 |
| short_range_mode | 1 |
| durability_min | 166 |
| durability_max | 166 |
| levelup_addon | 1721 |
| material_need | 2 |
| price | 39680 |
| shop_price | 79360 |
| repairfee | 39680 |
| 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 | 1282 |
| uniques_10_probability_unique | 0.07352964580059052 |
| uniques_11_id_unique | 1280 |
| 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 | 83 |
| durability_drop_max | 83 |
| decompose_time | 5 |
| element_id | 5637 |
| element_num | 206 |
| id_drop_after_damaged | 5637 |
| num_drop_after_damaged | 103 |
| pile_num_max | 1 |