Assume that $A$ is a $n\times n$ positive matrix, whose eigenvalues are $a_1\ge a_2\ldots \ge a_n>0;$  $B$ is a $p \times p$ positive matrix, whose eigenvalues are $b_1\ge b_2\ldots \ge b_p>0.$ For $n\times p$ full rank matrix $X$ with $n\ge p,$

**Question**: Is there a similar inequality, such that
$$|X'AX+B|\ge c(X)\prod_{i=1}^p(a_i+b_{p-i+1}),$$
or 
$$|X'AX+B|\ge c(X)\prod_{i=1}^p(a_{p-i+1}+b_i)$$
or something else.


where $|\cdot|$ stands for determinant, $c(X)$ is a postive constant, only denpends on $X.$