Rational valued functions on the Cantor set with $\int_{C} f^{3}d\mu=1 $

Question

Let $C$ be the Cantor set as a compact Abelian topological group, isomorphic to countable product of $\mathbb{Z}/2\mathbb{Z}$.

Its normalized Haar measure is denoted by $\mu$.

Is there a positive continuous map $f:C \to \mathbb{Q}$ which is not a locally constant map but satisfy $\int_{C} f^{2}d\mu=1 $?

Is there a positive continuous map $f:C \to \mathbb{Q}$ which is not a locally constant map but satisfy $\int_{C} f^{3}d\mu=1 $?

In the other word does $\int_{C} f^{2}d\mu=1 $ or $\int_{C} f^{3}d\mu=1 $ imply that $f$ is locally constant?

This question can be considered as a generalization of the equation $\sum_{i=1}^{n} x_{i}^{2}=1$ or $\sum_{i=1}^{n} x_{i}^{3}=1$ on $\mathbb{Q}^{n}$.

Answer 1

No. For example, let $S_n=\{x\in C\colon x_1=x_2=\ldots=x_{n-1}=0; x_n=1\}$. Now inductively choose a sequence of rationals $q_n$ such that $\sum_{n=1}^N q_n^2\mu(S_n)\in (1-2\cdot 3^{-N},1-3^{-N})$. You can check you have $q_n=\Theta(2^n/3^n)$, so that 1) $f$ takes countably many values; 2) $f(x)\to 0$ as $x\to 0$, whence $f$ is continuous.