We explore the possibilities of categorizing $SU(3)_f$ representations of scalar mesons through $J/\psi\to SV$ and $\gamma S$, with $S$ ($V$) being the scalar(vector) mesons. We find that $f_0(500)$ and $f_0(980)$ are singlet and octet states, respectively; which both belong to a nonet of the $SU(3)_f$ flavor symmetry. In addition, we determine the singlet-octet mixing angle of $\theta = (84.2\pm13.9)^{\circ}$ between $f_0(500)$ and $f_0(980)$, which supports the quark-antiquark ($q\bar{q}$) hypothesis. For the scalar mesons in the range of 1-2 GeV, containing two of $f_0(1370,\ 1500,\ 1700)$, we discuss the mixings between $q\bar{q}$ and glueballs. Our numerical results suggest that $f_0(1370 (1500))$ has the a significant component of $n\bar{n}$ ($s\bar{s}$), while $f_0(1710)$ is likely composed of the scalar glueball.
Comment: 12 pages, 7 figures, 7 tables