For this case we have that by definition:
1 pound is equivalent to 16 ounces.
We make a rule of three to determine the ounces of butter:
1lb ------------------------> 16onzas
[tex]\frac {1} {12}[/tex]----------> x
Where "x" represents the ounces of butter
[tex]x = \frac {\frac {1} {12} * 16} {1}\\x = \frac {16} {12}\\x = \frac {8} {6}\\x = \frac {4} {3}[/tex]
Thus, there are [tex]\frac {4} {3}[/tex]ounces of butter.
Now we must find the amount of eggs that remain:
[tex]92- (43+ \frac {1} {5}) =\\92 - (\frac {43 * 5 + 1} {5}) =\\92 - (\frac {215 + 1} {5}) =\\92 - (\frac {216} {5}) =\\92-43.2 =\\48.8[/tex]
Round down. There are 48 eggs left.
Answer:
There are [tex]\frac {4} {3}[/tex] ounces of butter.
48 eggs left
