Answer :
let's say the two numbers are "a" and "b"
"a" being the smaller one, and "b" the larger one
so, their sum is 118, or a + b = 118
if 4 times the smallest, or 4*a or 4a
is subtracted from the largest, "b", so b - 4a
equals 18, so b - 4a = 18
thus [tex]\bf \begin{cases} a+b=118\implies \boxed{b}=118-a\\ b-4a=18\\ ----------\\ \left( \boxed{118-a} \right)-4a=18 \end{cases}[/tex]
solve for "a", to find the smaller one
what's b? well, b = 118 - a
"a" being the smaller one, and "b" the larger one
so, their sum is 118, or a + b = 118
if 4 times the smallest, or 4*a or 4a
is subtracted from the largest, "b", so b - 4a
equals 18, so b - 4a = 18
thus [tex]\bf \begin{cases} a+b=118\implies \boxed{b}=118-a\\ b-4a=18\\ ----------\\ \left( \boxed{118-a} \right)-4a=18 \end{cases}[/tex]
solve for "a", to find the smaller one
what's b? well, b = 118 - a