Why does fundamental theorem of calculus not work for this integral $\int_0^{2\pi}\frac1{(3+\cos x)(2+\cos x)}$?

Because $$\frac{2\arctan(\frac{\tan(\frac x2)}{\sqrt3})}{\sqrt3} - \frac{\arctan(\frac{\tan(\frac x2)}{\sqrt2})}{\sqrt2}\tag1$$is not an antiderivative of $\frac1{(3+\cos x)(2+\cos x)}$. Such an antiderivative would have to be defined at every point of $[0,2\pi]$, but $(1)$ is undefined at $\pi$.


The anti-derivative $F(x)$ should be a Differentiable function over $(a,b)$.

Before using FTC, use Even symmetry Property which says that:$$\int_{0}^{2a}f(x)dx=2\int_{0}^{a}f(x)dx$$ When $f(2a-x)=f(x)$

Tags:

Integration

Calculus

Related

If $AB\parallel DC$, $BC\parallel AD$, and $AC\parallel DQ$, find $\Bbb X$ in terms of the areas $\Bbb A$, $\Bbb B$, and $\Bbb C$. Given $\lambda$ regular cardinal, $\left(\kappa^{<\lambda}\right)^{<\lambda}=\kappa^{<\lambda}$? Square Matrix Inequality Rotman's Introduction to the Theory of Groups Exercise 1.27 $ \models A$ vs. $ A \models$ Identity relating coefficients of degrees $0$ and $1$ from characteristic polynomials CH holds in V if and only if CH is actually true, for V a model of ZFC2 Examples of the events for which we cannot assign "meaningful" probabilities How to prove $\lim_{n\to\infty}\frac{1}{\Gamma(n/2+1)}\int_{0}^{n} t^{n/2}e^{-t}dt = 1$? Condition for $L^r(\mu)=L^\infty(\mu)$ where $\mu(X)=1$ Motivating the Implication Operator Calculating the volume of a restaurant take-away box that is circular on the bottom and square on the top

Recent Posts