Answer:
we can prepare a matrix to determine the best strategy:
firm A
buy filter not buy filter
-$4,000 / -$3,000 /
buy filter -$4,000 -$7,000
firm B
not buy filter -$7,000 / -$6,000 /
-$3,000 -$6,000
Firm A's expected value for buying the filters = -$4,000 - $7,000 = -$11,000
Firm A's expected value for not buying the filters = -$3,000 - $6,000 = -$9,000 ⇒ LOWER EXPECTED COST = DOMINANT STRATEGY
Firm B has he same expected values as Firm A.
So both firms' dominant strategy is not to buy the filters, then both firms will probably not buy them. But that action will also result in the highest total cost = -$6,000 - $6,000 = - $12,000
In this situation the Nash equilibrium would be that both firms purchase the filters, but since the dominant strategies for both firms tell them not to, it will not happen.
