Answer:
the cost per yard of the wool carpet is $54.
Explanation:
ure! We can solve this problem using a system of two equations. Let's denote the cost per yard of the nylon carpet as $x$, and the cost per yard of the wool carpet as $y$. Then we can set up two equations:
$16x + 18y = 1740$ (from the first purchase)
$16x + 21y = 1902$ (from the second purchase)
Now we can use any method we prefer to solve the system. One common method is to use elimination, which involves subtracting one equation from the other to eliminate one variable. In this case, we can subtract the first equation from the second equation:
$(16x + 21y) - (16x + 18y) = 1902 - 1740$
$3y = 162$
$y = 54$
Therefore, the cost per yard of the wool carpet is $54.