oh sorry for thatDr. Courtney said:Integrating position does not give velocity.
Wow ! I never thought this analogy for integration . Can you please further elaborate with giving some more examples.Dr. Courtney said:Integrating position does not give velocity.
I think of integration as accumulation. A moving object accumulates change in position, so the integral of velocity is the total change in position.
Hamza Abbasi said:Can some one explain me what is physical insight of integration ?
You would need to integrate over an appropriate quantity. In this case, it would be time ∫v(t) dt = s. Integration (the definite integral) involves two things. It is the reverse of differentiation and it is calculated between limits ( start and end values) The limits are important where Physics is concerned. There is often but not necessarily the idea of an area 'under a graph' involved, which is how the idea is mostly approached when you learn about Calculus.Dr. Courtney said:so the integral of velocity is the total change in position.
The physical interpretation of integration is the calculation of the area under a curve on a graph. It can also be thought of as finding the accumulation of a quantity over a given interval.
Integration is used in science to analyze and model various physical phenomena. It is particularly useful in physics, where it is used to calculate quantities such as work, energy, and motion.
Definite integration involves calculating the area under a curve between two specific points, while indefinite integration involves finding the general antiderivative of a function.
Yes, integration can be applied to non-linear functions. In fact, integration is a powerful tool for analyzing and understanding non-linear relationships and systems.
Integration and differentiation are inverse operations. Integration is used to find the area under a curve, while differentiation is used to find the slope of a curve at a specific point. They are connected by the fundamental theorem of calculus.