Answer to Question #159250 in Real Analysis for Sylvia

Let "(i,j)" be an open interval. Let "a \\in (i, j)" . We show that, we can find "\\epsilon > 0 \\ni" "N(a, \\epsilon) \\sub (i,j)"

Since "a \\in (i,j)" we have that "i<a<j" this implies that "a-i > 0" and "j-a > 0"

Set "\\epsilon = min (a-i, j-a)"

Suppose further that "b \\in N(a, \\epsilon)" this implies that "|b-a| < \\epsilon"

"- \\epsilon < b - a< \\epsilon \\\\\na - \\epsilon < b < a + \\epsilon"

And since "\\epsilon" is as defined we have that "a - \\epsilon \\geq i \\\\\na + \\epsilon \\leq j"

This implies that "b \\in (i, j)"

Hence "N(a, \\epsilon ) \\sub (i,j)"