Known eight primitives Herons triangles with natural area, sides and two medians, see A181928.
Let $a,b,c$ is half-sides, $s$ is area and $m_a,m_b,m_c$ is medians.
General properties such triangles:
$$s=(a + b + c) (b + c - a) (a + c - b) (a + b - c)$$ $$9s=(m_a + m_b + m_c) (m_b + m_c - m_a) (m_a + m_c - m_b) (m_a + m_b - m_c)$$ $$3\cdot5\cdot7\cdot8\mid s$$ $$m_a^2=2 (b^2 + c^2) - a^2$$ $$m_b^2=2 (c^2 + a^2) - b^2$$ $$m_c^2=2 (a^2 + b^2) - c^2$$ $$9a^2=2 (m_b^2 + m_c^2) - m_a^2$$ $$9b^2=2 (m_c^2 + m_a^2) - m_b^2$$ $$9c^2=2 (m_a^2 + m_b^2) - m_c^2$$ $$m_a^2 - 3 a^2 = 2 (3 b^2 - m_c^2) = 2 (3 c^2 - m_b^2) = x$$ $$m_b^2 - 3 b^2 = 2 (3 c^2 - m_a^2) = 2 (3 a^2 - m_c^2) = y$$ $$m_c^2 - 3 c^2 = 2 (3 a^2 - m_b^2) = 2 (3 b^2 - m_a^2) = z$$ $$x+y+z=0$$ $$m_a^2 + 3 a^2 = m_b^2 + 3 b^2 = m_c^2 + 3 c^2 = w$$ $$m_a^2 + m_b^2 + m_c^2 = 3 (a^2 + b^2 + c^2)=\frac{3}{2}w$$
where $x,y,z$ is some integers, $w$ is some positive integer.
Exact two half-sides is odd and one is even, exact two medians is odd and one is even.
$w$ is number of form $(km \pm 3ln)^2+3(kn \mp lm)^2=(k^2+3l^2)(m^2+3n^2)$, where $k,l,m,n$ is any positive integers.
Some relations between known primitives Herons triangles, selected by colors:
1) $s=1680$
$a=26, b = 73, c = 51$
$m_a= 123.2233, m_b = 35, m_c = \color{red}{97}$
$x = 13156, y = -14762, z = 1606, w = 17212$
2) $s=221760$
$a = 626, b = 875, c = 291\vdots\color{red}{97}$
$m_a = 1144, m_b = \color{blue}{433}, m_c = 1493.4259$
$x = 133108, y = -2109386, z = 1976278\vdots\color{red}{97}, w = 2484364\vdots\color{red}{97}$
3) $s = 8168160$
$a = 3673, b = 4368, c = 1241$
$m_a = 5267.6447, m_b = 3314, m_c = 7975$
$x = -12724706, y = -46255676, z = 58980382, w = 68220868$
4) $s = 95726400$
$a = 13816, b = 28779, c = 15155\vdots\color{blue}{433}$
$m_a = 43874\vdots\color{magenta}{21937}, m_b = 3589\vdots\color{red}{97}, m_c = 42527.0663$
$x = 1352282308, y = -2471811602, z = 1119529294\vdots\color{blue}{433}, w = 2497573444\vdots\color{blue}{433}$
5) $s = 302793120$
$a = 11257, b = 14791, c = 14384$
$m_a = 26918.8823, m_b = 21177, m_c = 22002$
$x = 344466078, y = -207855714, z = -136610364, w = 1104786372$
6) $s = 569336866560$
$a = 1823675, b = 1930456\vdots\color{magenta}{21937}, c = 185629$
$m_a = 2048523\vdots\color{blue}{433}, m_b = 1730270.7575, m_c = 3751059\vdots\color{orange}{13\cdot96181}$
$x = -5780925035346, y = -8186144209212\vdots\color{magenta}{21937}, z = 13967069244558, w = 14173817998404\vdots\color{magenta}{21937}$
7) $s = 8548588738240320$
$a = 46263061\vdots\color{orange}{13\cdot96181}, b = 2442655864, c = 2396426547$
$m_a = 4839082088.5150, m_b = 2350198558\vdots\color{magenta}{21937}, m_c = 2488886435\vdots\color{#0a0}{661\cdot107581}$
$x = 23410294646947500526\vdots\color{orange}{13\cdot96181}, y = -12376269747775480124, z = -11034024899172020402, w = 23423136271826038852\vdots\color{orange}{13\cdot96181}$
8) $s = 17293367819066194215360$
$a = 31982445133, b = 356388643246, c = 336426334971\vdots\color{#0a0}{661\cdot107581}$
$m_a = 692364218455\vdots\color{orange}{13\cdot96181}, m_b = 318430912888, m_c = 378006355503.1853$
$x = 476299580606746896423958, y = -279640348821488939749004, z = -196659231785257956674954\vdots\color{#0a0}{661\cdot107581}, w = 482436841386859028750092\vdots\color{#0a0}{661\cdot107581}$
Is it possible to use these relations to search next Herons triangles with natural two/three medians?