Answer is B.
Equation of line joining the points ($x_{1}$, $y_{1}$) and ($x_{2}$, $y_{2}$) is $\frac{y-y_{1}}{y_{2}-y_{1}} =\frac{x-x_{1}}{x_{2}-x_{1}}$
Here, two points are (2, -1) and (5, -3), so equation of the line will be $\frac{y+1}{-3+1} =\frac{x-2}{5-2}$
2x+3y-1=0 is the equation of line. ($x_{1},4$) and $(-2,y_{1})$ lies on this line, so
2*$x_{1}$ + 3*4 -1 = 0 → On solving, we get $x_{1}$ = $-\frac{11}{2}$. Similarly,
2*-2+3*$y_{1}$ -1 = 0 → On solving, we get $y_{1}$ = $\frac{5}{3}$. So point is ($x_{1}$,$y_{1}$) = ($-\frac{11}{2}$, $\frac{5}{3}$)
Only option B 2x + 6y + 1 = 0 satisfies the point ($x_{1}$,$y_{1}$).
2*$-\frac{11}{2}$ + 6*$\frac{5}{3}$ + 1 = 0