Pick out the functions which are Riemann integrable on $[0,1]$
(a) $f(x)= 1$ , if $x$ is rational and $f(x)=0$, if $x$ is irrational
(b) $f(x)= 1$ , if $x∈{\alpha_1, \alpha_2, ….,\alpha_n}$ is rational and $f(x)=0$, otherwise, where $\alpha_1, \alpha_2, ….,\alpha_n$ are fixed , but arbitrarily chosen numbers in $[0,1]$
(c) and $f(x)=0$, if $x$ is irrational or if $x=0$ And $f(x)=\sin(q\pi)$, if $x=\frac{p}{q}$ , and $q$ positive and coprime integers.
(d) $f(x) = \lim_{n\to\infty} \cos^{2n}(24\pi x)$.
(e) $f(x)= \cos x$ , if $0≤x≤\frac{1}{2}$ and $f(x)=\sin x $, if $\frac{1}{2}<x≤1$
(a) is not true and it it a very common example.
(b) since only finitely many dis continuities so it is true.
(c) no idea
(d) no idea
(e) true. Since only one point of discontinuity.
Can anybody help me please.
