let $ \overrightarrow{QL}\cap \overrightarrow{PK}=R$ and $ AK=k, AL=l$... we have that $ AKRL$ is a parallelogram and that $ PR=c-k+l$ and $ QR=b+k-l$.. then, we have to prove that $ PQ^2=(c-k+l)^2+(b+k-l)^2+(c-k+l)(b+k-l)\geq \dfrac{3(b+c)^2}{4}$, or equivalently, $ (b+c)^2-(c-k+l)(b+k-l)\geq \dfrac{3(b+c)^2}{4}$... this one can be rewritten as $ ((b+k-l)-(c-k-l))^2\geq 0$ which is true, and we're done