Let $(M,g)$ be a Riemannian manifold. Let $S_g$ be the corresponding Sasaki metric on $TM$. For every $p\in M$, $V_p\in T_pM$, is it true and obvious that $0_p$ is the closest point of the zero section to $V_p$?
With some abuse of terminology a rephrase of the question would be: Is the height of a right triangle shorter than its hypotenuse?
Let me expand my comment to remove the question from unanswered.
Any point in $w\in\mathrm{T}M$ is a pair $w=(V,p)$ where $p\in M$ and $V\in\mathrm{T}_pM$.
Let $t\mapsto w(t)=(V(t),\gamma(t))$ be a curve in $\mathrm{T}M$. Let $V=V(0)$ and $p=\gamma(0)$. Note that $$w'(0)=\nabla_{\gamma'(0)}V\oplus \gamma'(0)\in \mathrm{T}_{p}M\oplus\mathrm{T}_{p}M=\mathrm{T}_{(V,p)}\mathrm{T}M.$$
Therefore $$ \begin{aligned} \langle V\oplus 0,w'(0)\rangle &=\langle V,\nabla_{\gamma'(0)}V\rangle= \\ &=\tfrac12\cdot\langle V,V\rangle'(0). \end{aligned} $$ It follows that $(V,p)\mapsto V\oplus 0$ is the gradient of the function $f\colon(V,p)\mapsto \tfrac12\cdot\langle V,V\rangle$. Whence the statement follows.
