Respuesta :
Answer:
Select the answer that best describes the strategies in this game.
- Both companies dominant strategy is to add the train.
Does a Nash equilibrium exist in this game?
- A Nash equilibrium exists where both companies add a train. (Since I'm not sure how your matrix is set up I do not know the specific location).
Explanation:
we can prepare a matrix to determine the best strategy:
Swiss Rails
add train do not add train
$1,500 / $2,000 /
add train $4,000 $7,500
EuroRail
do not add train $4,000 / $3,000 /
$2,000 $3,000
Swiss Rails' dominant strategy is to add the train = $1,500 + $4,000 = $5,500. The additional revenue generated by not adding = $5,000.
EuroRail's dominant strategy is to add the train = $4,000 + $7,500 = $11,500. The additional revenue generated by not adding = $5,000.
A Nash equilibrium exists because both companies' dominant strategy is to add a train.
In behavioral economics, tactical supremacy happens when one strategy outperforms another for a single player, irrespective of how their opponents play.
Dominance may be used to solve a variety of basic games.
The answers to the different parts of the questions are:
- Both the company's dominant strategy is to put on the train.
- When both firms construct a train, they reach an equilibrium state.
The calculation of matrix to estimate the best strategy:
Swiss Rails add train do not add train
$1,500 / $2,000 /
$4,000 $7,500
EuRail $4,000 / $3,000 /
$2,000 $3,000
Swiss Rails' dominant strategy is to add the train = $1,500 + $4,000 = $5,500.
The additional revenue generated by not adding = $5,000.
EuroRail's dominant strategy is to add the train = $4,000 + $7,500 = $11,500.
The additional revenue generated by not adding = $5,000.
Because both firms' dominating goal is to add a train, a Perfect equilibrium exists.
To know more about the equilibrium of both the railways, refer to the link below:
https://brainly.com/question/15451903
