The beta function is the best idea. \beta(a, b) = \int_{0}^{1} x^{a-1}(1-x)^{b-1} dx For here I, let a = 4, b = 7 Using: \beta(a, b) = \frac{\Gamma(a)\Gamma(b)}{\Gamma(a+b)} \beta(4, 7) = \frac{\Gamma(4)\Gamma(7)}{\Gamma(11)} = \frac{3!6!}{10!} ...

Substitute u=(1-x). We then have du=-dx and when x=0, we have u=1, x=1 gives u=0. Thus \int_0^1x^a(1-x)^bdx=-\int_1^0(1-u)^au^bdu=\int_0^1(1-u)^au^bdu No integration by parts ...

Euler's beta function gives: \int_{0}^{1}x^n(1-x)^n\,dx = \frac{\Gamma(n+1)^2}{\Gamma(2n+2)} = \frac{n!^2}{(2n+1)!}=\color{red}{\frac{1}{(2n+1)\binom{2n}{n}}} and the integrand function is ...

Yes, you are correct. This works in the general case : find m that minimizes the integral \int_I | f(x) - m| The solution m is the median, a value so for exactly half the values of x we ...

Hint: \int_0^1 t^{x-1}(1-t)^{y-1}dt=B(x,y)=\frac{\Gamma(x)\Gamma(y)}{\Gamma(x+y)}

First note that a\binom{a+b}{b}=\frac{(a+b)!}{(a-1)!b!} To prove that a {a+b \choose b} | LCM(b+1, ..., b+a) it is enough to prove that for each prime p we have p^n | LCM(b+1, ..., b+a) ...