← All items · Weapons
Magic · Pataka
Attack Speed 1.00
Range 3
Physical Attack 448–672
Magic Attack 816–997
Durability 125
Requisite Lv. 95
Requisite Strength 52
Requisite Energy 285
Bound when equipped
Price 77,480
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.
Decomposes into
#11208
Mirage Celestone
×20
Raw source row · 216 fields
| ID | 23887 |
|---|---|
| id_major_type | 292 |
| id_sub_type | 340 |
| file_model_right | \Models\Weapons\人物\刀剑\法剑\19品法剑\19品法剑.ecm |
| file_model_left | 0 |
| file_matter | \Models\Weapons\人物\刀剑\法剑\19品法剑\19品法剑.ecm |
| file_icon | Surfaces\图标\通用物品\15品法剑.dds |
| require_strength | 52 |
| require_energy | 285 |
| character_combo_id | 767 |
| require_level | 95 |
| level | 13 |
| fixed_props | 2 |
| damage_low | 448 |
| damage_high_min | 672 |
| damage_high_max | 672 |
| magic_damage_low | 816 |
| magic_damage_high_min | 997 |
| magic_damage_high_max | 997 |
| attack_range | 3.0 |
| short_range_mode | 1 |
| durability_min | 125 |
| durability_max | 125 |
| levelup_addon | 1764 |
| material_need | 2 |
| price | 77480 |
| shop_price | 154960 |
| repairfee | 77480 |
| drop_probability_socket1 | 0.8999999761581421 |
| drop_probability_socket2 | 0.10000000149011612 |
| make_probability_socket1 | 0.8999999761581421 |
| make_probability_socket2 | 0.10000000149011612 |
| probability_addon_num3 | 1.0 |
| addons_1_id_addon | 821 |
| addons_1_probability_addon | 0.05721144378185272 |
| addons_2_id_addon | 990 |
| addons_2_probability_addon | 0.02860572189092636 |
| addons_3_id_addon | 991 |
| addons_3_probability_addon | 0.019103819504380226 |
| addons_4_id_addon | 992 |
| addons_4_probability_addon | 0.01430286094546318 |
| addons_5_id_addon | 832 |
| addons_5_probability_addon | 0.05721144378185272 |
| addons_6_id_addon | 989 |
| addons_6_probability_addon | 0.02860572189092636 |
| addons_7_id_addon | 988 |
| addons_7_probability_addon | 0.019103819504380226 |
| addons_8_id_addon | 987 |
| addons_8_probability_addon | 0.01430286094546318 |
| addons_9_id_addon | 1321 |
| addons_9_probability_addon | 0.03430686146020889 |
| addons_10_id_addon | 1322 |
| addons_10_probability_addon | 0.02290458045899868 |
| addons_11_id_addon | 1323 |
| addons_11_probability_addon | 0.01720344088971615 |
| addons_12_id_addon | 1341 |
| addons_12_probability_addon | 0.02860572189092636 |
| addons_13_id_addon | 1342 |
| addons_13_probability_addon | 0.019103819504380226 |
| addons_14_id_addon | 1331 |
| addons_14_probability_addon | 0.03430686146020889 |
| addons_15_id_addon | 1332 |
| addons_15_probability_addon | 0.02290458045899868 |
| addons_16_id_addon | 1333 |
| addons_16_probability_addon | 0.01720344088971615 |
| addons_17_id_addon | 1470 |
| addons_17_probability_addon | 0.02860572189092636 |
| addons_18_id_addon | 1471 |
| addons_18_probability_addon | 0.01430286094546318 |
| addons_19_id_addon | 1475 |
| addons_19_probability_addon | 0.02860572189092636 |
| addons_20_id_addon | 1476 |
| addons_20_probability_addon | 0.01430286094546318 |
| addons_21_id_addon | 1477 |
| addons_21_probability_addon | 0.011402281001210213 |
| addons_22_id_addon | 1485 |
| addons_22_probability_addon | 0.04580916091799736 |
| addons_23_id_addon | 1486 |
| addons_23_probability_addon | 0.02290458045899868 |
| addons_24_id_addon | 1480 |
| addons_24_probability_addon | 0.02860572189092636 |
| addons_25_id_addon | 1481 |
| addons_25_probability_addon | 0.01430286094546318 |
| addons_26_id_addon | 1482 |
| addons_26_probability_addon | 0.011402281001210213 |
| addons_27_id_addon | 1483 |
| addons_27_probability_addon | 0.011402281001210213 |
| addons_28_id_addon | 472 |
| addons_28_probability_addon | 0.33336666226387024 |
| rands_1_id_rand | 821 |
| rands_1_probability_rand | 0.08579141646623611 |
| rands_2_id_rand | 990 |
| rands_2_probability_rand | 0.04289570823311806 |
| rands_3_id_rand | 991 |
| rands_3_probability_rand | 0.028597140684723854 |
| rands_4_id_rand | 992 |
| rands_4_probability_rand | 0.021497851237654686 |
| rands_5_id_rand | 832 |
| rands_5_probability_rand | 0.08579141646623611 |
| rands_6_id_rand | 989 |
| rands_6_probability_rand | 0.04289570823311806 |
| rands_7_id_rand | 988 |
| rands_7_probability_rand | 0.028597140684723854 |
| rands_8_id_rand | 987 |
| rands_8_probability_rand | 0.021497851237654686 |
| rands_9_id_rand | 1321 |
| rands_9_probability_rand | 0.05149485170841217 |
| rands_10_id_rand | 1322 |
| rands_10_probability_rand | 0.03429656848311424 |
| rands_11_id_rand | 1323 |
| rands_11_probability_rand | 0.025797421112656593 |
| rands_12_id_rand | 1341 |
| rands_12_probability_rand | 0.04289570823311806 |
| rands_13_id_rand | 1342 |
| rands_13_probability_rand | 0.028597140684723854 |
| rands_14_id_rand | 1331 |
| rands_14_probability_rand | 0.05149485170841217 |
| rands_15_id_rand | 1332 |
| rands_15_probability_rand | 0.03429656848311424 |
| rands_16_id_rand | 1333 |
| rands_16_probability_rand | 0.025797421112656593 |
| rands_17_id_rand | 1470 |
| rands_17_probability_rand | 0.04289570823311806 |
| rands_18_id_rand | 1471 |
| rands_18_probability_rand | 0.021497851237654686 |
| rands_19_id_rand | 1475 |
| rands_19_probability_rand | 0.04289570823311806 |
| rands_20_id_rand | 1476 |
| rands_20_probability_rand | 0.021497851237654686 |
| rands_21_id_rand | 1477 |
| rands_21_probability_rand | 0.01719828136265278 |
| rands_22_id_rand | 1485 |
| rands_22_probability_rand | 0.0686931312084198 |
| rands_23_id_rand | 1486 |
| rands_23_probability_rand | 0.03429656848311424 |
| rands_24_id_rand | 1480 |
| rands_24_probability_rand | 0.04289570823311806 |
| rands_25_id_rand | 1481 |
| rands_25_probability_rand | 0.021497851237654686 |
| rands_26_id_rand | 1482 |
| rands_26_probability_rand | 0.01719828136265278 |
| rands_27_id_rand | 1483 |
| rands_27_probability_rand | 0.01719828136265278 |
| uniques_1_id_unique | 467 |
| uniques_1_probability_unique | 0.1429142951965332 |
| uniques_2_id_unique | 467 |
| uniques_2_probability_unique | 0.1429142951965332 |
| uniques_3_id_unique | 469 |
| uniques_3_probability_unique | 0.1429142951965332 |
| uniques_4_id_unique | 468 |
| uniques_4_probability_unique | 0.0952095240354538 |
| uniques_5_id_unique | 470 |
| uniques_5_probability_unique | 0.0476047620177269 |
| uniques_6_id_unique | 475 |
| uniques_6_probability_unique | 0.0048004803247749805 |
| uniques_7_id_unique | 473 |
| uniques_7_probability_unique | 0.02380238100886345 |
| uniques_8_id_unique | 474 |
| uniques_8_probability_unique | 0.009500949643552303 |
| uniques_9_id_unique | 1254 |
| uniques_9_probability_unique | 0.07140713930130005 |
| uniques_10_id_unique | 1255 |
| uniques_10_probability_unique | 0.07140713930130005 |
| uniques_11_id_unique | 1268 |
| uniques_11_probability_unique | 0.07140713930130005 |
| uniques_12_id_unique | 1269 |
| uniques_12_probability_unique | 0.07140713930130005 |
| uniques_13_id_unique | 1273 |
| uniques_13_probability_unique | 0.02380238100886345 |
| uniques_14_id_unique | 1272 |
| uniques_14_probability_unique | 0.0476047620177269 |
| uniques_15_id_unique | 442 |
| uniques_15_probability_unique | 0.009500949643552303 |
| uniques_16_id_unique | 441 |
| uniques_16_probability_unique | 0.02380238100886345 |
| durability_drop_min | 125 |
| durability_drop_max | 125 |
| decompose_price | 100000 |
| decompose_time | 15 |
| element_id | 11208 |
| element_num | 20 |
| pile_num_max | 1 |
| has_guid | 1 |