act in Bulgarian
act in Bulgarian
де́йствие
(countable) Something done, a deed.
акт
(countable) Something done, a deed.
зако́н
(law, countable) A product of a legislative body, a statute.
деяние
The process of doing something.
постъпка
The process of doing something.
докуме́нт
(countable) A formal or official record of something done.
акт
(countable) A formal or official record of something done.
акт
(countable, drama) A division of a theatrical performance.
де́йствие
(countable, drama) A division of a theatrical performance.
въ́рша
(obsolete, transitive) To do (something); to perform.
пра́вя
(obsolete, transitive) To do (something); to perform.
държа
(intransitive) To behave in a certain manner for an indefinite length of time.
постъ́пвам
(intransitive) To behave in a certain manner for an indefinite length of time.
постъ́пя
(intransitive) To behave in a certain manner for an indefinite length of time.
възде́йствам
(intransitive, construed with on or upon) To have an effect (on).
държа
(intransitive, mathematics, construed with on or upon, of an algebraic structure) To possess an action onto (some other structure). Examples include the group action of a group on a set, the action of a ring on a module by scalar multiplication, and the action of a group or algebra on a vector space via a representation.
игра́я
(intransitive, mathematics, construed with on or upon, of an algebraic structure) To possess an action onto (some other structure). Examples include the group action of a group on a set, the action of a ring on a module by scalar multiplication, and the action of a group or algebra on a vector space via a representation.
постъ́пвам
(intransitive, mathematics, construed with on or upon, of an algebraic structure) To possess an action onto (some other structure). Examples include the group action of a group on a set, the action of a ring on a module by scalar multiplication, and the action of a group or algebra on a vector space via a representation.
постъ́пя
(intransitive, mathematics, construed with on or upon, of an algebraic structure) To possess an action onto (some other structure). Examples include the group action of a group on a set, the action of a ring on a module by scalar multiplication, and the action of a group or algebra on a vector space via a representation.
де́йствам
(obsolete, transitive) To move to action; to actuate; to animate.