Use the following information to estimate and fill in the payoff matrix for a Hawks vs. Doves game (see matrix below). Remember that the payoff for each interaction is:E=(P win V)−(Plose 1)−D. We will assume the following benefits and costs for this game: Payoff values: Benefit of Loss (L): 0 Benefit of Victory(V):60Cost of Injury (i): 90 Cost of Display (D): 25 We will also use the same rules or probabilities we used in class as follows: 1. Question 1: Fill in the bianks in the following Payoff matrix for the Hawks vs. Doves game. Click on the corresponding cell to write your answer. 1. Question 1: Fill in the blanks in the following Payoff matrix for the Hawks vs. Doves game. Click on the corresponding cell to write your answer. 2. Question 2: Estimate the equilibrium frequencies and fill in the blanks. Remember that at equilibrium, the frequency of Hawks is:he=E D,D−E H,D/EH,H−E H,D−E D,H+ED,Dand the frequency of Doves is:de =(1−he). Based on the previous payoff matrix you estimated in Question 1, the equilibrium frequency of Hawks is and Doves is Use two decimal places only (e.g.,0.92), and do not include extra spaces in your answer. Based on the previous Hawks vs. Doves game, what is the evolutionary stable strategy for this game? The ESS depends on initial number of Hawks and Doves There is no ESS Mixed Hawk and Dove Pure Hawk According to the above game, what would be the expected mean fitness for each player? Doves will have higher fitness than Hawks Hawks will have higher fitness