Weekly Challenge 1: Inner Equality
Since $-5 < a, b, c, d < 5$ the inequalities $5< a+b<
10$ and $-10< c+d< -5$ show that
$$
0< a, b< 5\quad\quad -5< c, d < 0
$$
It is possible then to conclude that
$$ 10 < a+ b- c - d < 20 $$
$$ 0 < a- c < 10 $$
$$ -10 < a - c + d - b < 10 $$
$$ 0 < abcd < 625 $$
$$ 0 < \frac{|a|+|c|}{2}-\sqrt{|ac|} < 2.5$$
Note that the lower bound of the fourth inequality could be deduced
from the AM-GM inequality for two numbers.
Note also that, since it is not possible to set, for example, $a=5$
care must be taken to construct a really clear justification of the
results.