Let $A$ be a unital *-ring. Let us put, $A^+=\{\sum_1^N x^*_ix_i: x_i\in A , N\in \mathbb{N} \}$. We write $x\geq0$ if $x\in A^+$. 

Suppose that 

1- For every $n\in \mathbb{N}$ and $a\in A$, there exsits $x\in A$ with $a=nx$.

2- For every $x\in A$ 
$$ a\geq0 \Rightarrow x^*ax\geq0.$$ 

Let us assume for natural numbers $m,n$ we have $mx^*x-n\geq0$. Can we conclude that  $mxx^*-n\geq0$ as well?