$
\newcommand{dist}{\operatorname{dist}}
\newcommand{B}{\mathbb{B}}
$

Let $\mathcal {M}$ be a Riemannian manifold, $p \in S \subset \mathcal{M}$ and $\delta>0$. Denote $S_{r} := S \cap\B(p,r)$.

**Question 1:** For small values of $r$, Is there a relation similar to the following
$$
\dist(\exp_p^{-1}(u);\exp_p^{-1}(S_r)) \leq C(r)\dist(u;S_r) \tag{1}
$$ 
for every $u \in \B(p,r)$.
Note that $C(r)$ may be related to the curvature.

I know that the inequality (1) holds with $C(r) = 1$, for a Hadamard manifold (since the exponential function has non-expansion property for a Hadamard manifold).

**Question 2:** Is there an asymptotic relation between $\dist(u;S_r)$ and LHS of (1) for small values of $r$.