nikkor180 said:Wow really really amazing
Unfortunately, there is something puzzling me which is:-
How did you get the idea of substituting u=tan(x/2)
Integration is a mathematical process that involves finding the area under a curve. It is the reverse operation of differentiation and is used to solve many real-world problems in fields such as physics, engineering, and economics.
The formula for integration is ∫f(x)dx, where f(x) is the function being integrated and dx indicates the variable of integration. In simpler terms, integration is the sum of infinitely small rectangles under a curve.
Yes, the integration of 1/(c+cos(x)) by dx can be solved analytically. However, it can be a challenging problem and may require the use of advanced techniques such as trigonometric substitutions or integration by parts.
The purpose of integrating 1/(c+cos(x)) by dx is to find the area under the curve of the function 1/(c+cos(x)). This can be useful in solving problems related to periodic motion, such as the oscillations of a pendulum or a spring.
Integration has many real-world applications, such as in calculating the volume of irregularly shaped objects, determining the work done by a variable force, and finding the average value of a function. It is also used in fields such as economics to calculate the total profit or revenue of a business over a period of time.