I give an answer here using only elementary algebraic geometry.

We know that the Grassmannian $\operatorname{Gr}(2,5)$ is defined by $5$ linearly independent quadrics in $\mathbb{P}^9$ and $V(5)$  can  be viewed  as defined by $5$ linearly independent quadrics in $\mathbb{P}^6$. 

Given a point $p=[1,0,\dots,0]\in X$ for  $X\subset \mathbb{P}^6$  defined by $Q_i, 1\leq i\leq 5$, where $Q_i$ are homogeneous of degree $2$. 
Write $$Q_i= q_{i,2}(x_1,\dots, x_6)+ x_0 q_{i,1}(x_1,\dots, x_6)$$
with $q_{i,k}$  homogeneous of degree $k$. 

I claim that 
there there is a line contained in $X$ passing through $p$ if and only if $$q_{i,k}=0, \quad 1\leq i \leq 5, k=1,2 \quad (*)$$ have  a common zero in $\mathbb{P}^{5}=\mathbb{P}(k[x_1,\dots x_6])$.  To see this, note that given a common zero $[a_1,a_2,\dots,a_6]\in\mathbb{P}^{5}$, the line joining $p$ to $[0, a_1,a_2,\dots,a_6]$ is contained in $X$ and the line joining $[1,0,\dots,0]$ and $[1,-a_1,\dots,-a_n]$ is the same as the  line joining $[1,0,\dots,0]$ and $[0, a_1,\dots,a_n]$.  

Since $Q_i$ are linearly independent, we see that the linear part $q_{i,1}, 1\leq i\leq 5$ are linearly independent.  By the geometric version of Krull’s Principal Ideal Theorem[[11.3.2, Vakil’s notes], the dimension of the subvariety in $\mathbb{P}^5$ defined by $(*)$ is $\leq 0$.  This means $(*)$ has finitely many common zeros, that is, there are at most finitely many lines passing through a given point. 

Now back to $X=V(5)$, as suggested by Enrico in the comment. We take $3$ hyperplanes ''general enough'' to get explicit defining equations of $V(5)$. Consider the Plucker coordinate $w_{ij}$ in $\mathbb{P}^9$,  take $w_{12}=w_{34}$, $w_{13}=w_{45}$, $w_{23}=w_{15}$, the defining equations for $V(5)$ are

\begin{cases}
w_{34}^2-w_{45}w_{24}+w_{14}w_{15}=0\\
w_{45}^2-w_{14}w_{35}+w_{15}w_{34}=0\\
w_{15}^2-w_{45}w_{25}+w_{34}w_{35}=0\\
w_{15}w_{45}-w_{24}w_{35}+w_{25}w_{34}=0\\
w_{34}w_{45}-w_{14}w_{25}+w_{15}w_{24}=0
\end{cases}


By the above argument, choose $p$ to be the point with the only nonzero entry $ij$ for $\{i,j\}\neq \{3,4\},\{4,5\},\{1,2\}$ we can have some lines. For example,
we can find two nonintersecting lines: one joining $[ x_{14}=1,x_{ij}=0]$ and $[x_{12}=1,x_{ij}=0]$, the other joining $[ x_{24}=1,x_{ij}=0]$ and $[ x_{25}=1,x_{ij}=0]$. This has solved the question. 




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**Remark.**
Suppose we are given the fact that for every point, there is at least one line passing through it, we can show that the subvariety in $\operatorname{Gr}(2,7)$ characterising lines on $V(5)$ has dimension $\geq 2$.  Consider the following incidence correspondence, as we have discussed above, for any $p\in V(5)$ the fibre $\operatorname{pr}_1^{-1} (p)$ has dimension $0$. 


[![enter image description here][1]][1]

By Upper Semicontinuity of Fibre Dimension, we have $\operatorname{dim} \Phi= \operatorname{dim} V(5)=3$. Take a line $l\in V(5)$,  $\operatorname{dim}pr_2^{-1}([l])=1$, by Upper Semicontinuity again, $\operatorname{dim}\Phi -\operatorname{dim} pr_2\Phi \leq 1$ thus $\operatorname{dim} pr_2\Phi \geq 2$. Now we conclude that the subvariety of $\operatorname{Grass}(2,7)$ characterising lines on $V(5)$ has dimension $\geq 2$.    

A stronger result than $\operatorname{dim }pr_2\Phi\geq 2$ is that the Hilbert scheme of lines on $V(5)$ is isomorphic to $\mathbb{P}^2$ as in Sasha's answer and the reference is [Theorem 1, 2].  And the number of lines passing through a point is $3$ when counted with multiplicity [P.26, 1].                  



$[1]$
<cite authors="Takagi, Hiromichi; Zucconi, Francesco">_Takagi, Hiromichi; Zucconi, Francesco_, [**Geometries of lines and conics on the quintic del Pezzo 3-fold and its application to varieties of power sums**](http://dx.doi.org/10.1307/mmj/1331222846), Mich. Math. J. 61, No. 1, 19-62 (2012). [ZBL1262.14048](https://zbmath.org/?q=an:1262.14048).

$[2]$</cite><cite authors="Furushima, Mikio; Nakayama, Noboru">_Furushima, Mikio; Nakayama, Noboru_, [**The family of lines on the Fano threefold \(V_ 5\)**](http://dx.doi.org/10.1017/S0027763000001719), Nagoya Math. J. 116, 111-122 (1989). [ZBL0731.14025](https://zbmath.org/?q=an:0731.14025).</cite> 
  [1]: https://i.sstatic.net/M6cjS.png