noun a whole or entire unit
adjective necessary for completeness; essential
In mathematics, an integral is a mathematical object that can be interpreted as an area or a generalization of area. It is a fundamental concept in calculus.
In engineering, integrals are used in various applications such as signal processing, control systems, and fluid dynamics. They are crucial for analyzing and designing systems.
In economics, integrals are used in areas such as optimization, utility theory, and economic modeling. They help in calculating total revenue, cost, profit, and other economic quantities.
In physics, integrals are used to calculate quantities such as work, energy, momentum, and electric charge. They are essential for solving differential equations and modeling physical systems.
In writing, 'integral' may be used to describe a key component or essential element of a story or argument.
Psychologists may use 'integral' to refer to a fundamental aspect of a person's personality or behavior that is essential to understanding their mental health.
Architects may use 'integral' to describe a crucial part of a building's design that cannot be removed without affecting the overall structure.
Engineers may use 'integral' to refer to a necessary component of a system or process that is essential for its proper functioning.
Financial analysts may use 'integral' to describe a key factor or element that is crucial to the success of an investment or financial strategy.