TO FIND AREA UNDER THE CURVE USING INTEGRATION
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Definite integration is used to find the area under a curve defined by a function between bounds on the Cartesian plane. It is a fundamental concept in calculus that has applications in physics, engineering, and optimizing the use of space in a given area. The document provides an example of using definite integration to calculate the area under the function f(x) = x^2 + 4 between the bounds of -2 and 2.
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![MATHS MICROPROJECT
FINDING AREA USING INTEGRATION.
Finding the Area with Integration
Finding the area of space from the curve of a function to an axis on
the Cartesian plane is a fundamental component in calculus. Definite
integration finds the accumulation of quantities, which has become a
basic tool in calculus and has numerous applications in science and
engineering. While it is used to make formulas in physics more
comprehensible, often it is used to optimize the use of space in a
given area.
Definite Integration
Whenever we are calculating area in a given interval, we are using
definite integration. Lets try to find the area under a function for a
given interval.
(1) Integrate f(x) = — x2 4- 4 from [-2.2].](https://image.slidesharecdn.com/ampmp17158onwards-180404030458/85/TO-FIND-AREA-UNDER-THE-CURVE-USING-INTEGRATION-1-320.jpg)
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TO FIND AREA UNDER THE CURVE USING INTEGRATION
- 1. MATHS MICROPROJECT FINDING AREA USING INTEGRATION. Finding the Area with Integration Finding the area of space from the curve of a function to an axis on the Cartesian plane is a fundamental component in calculus. Definite integration finds the accumulation of quantities, which has become a basic tool in calculus and has numerous applications in science and engineering. While it is used to make formulas in physics more comprehensible, often it is used to optimize the use of space in a given area. Definite Integration Whenever we are calculating area in a given interval, we are using definite integration. Lets try to find the area under a function for a given interval. (1) Integrate f(x) = — x2 4- 4 from [-2.2].
- 9. MADE BY: 17158-MUNEEB ULDE 17159-PRATK VISHWASRAO 17160-ABDURRAHMAAN KAZI 17161-SHIVAM SAVANT 17162-MANISH MASURKAR