Solve the problem.R chooses one, two, or three. C chooses one, two, or three. If the sum of the numbers is odd, R receives the amount equal to the sum. If the numbers match, C receives $3. Otherwise, C receives $1.(a) Give the payoff matrix.(b) Suppose R chooses one 30% of the time, two 40% of the time, and three 30% of the time, and C chooses one 40% of the time, two 20% of the time, and three 40% of the time. Calculate the expected value for this strategy.

R1 = 2.2 Kê, R2 = 3.3 Kê, RL = 1.2 Kê, and E = 20 V. What is the value of IR2 ?

a. 2.09 mA
b. 5.88 mA
c. 8.92 mA
d. 15.19 mA
e. 16.67 mA

Solve the problem.If P = (7, -10) and Q = (x, 74), find all numbers x such that the vector represented by  has length 91.

A. {-28, 49} B. {-42, 42} C. {-42, -28} D. {-28, 42}

Use the bar graph to answer the question.The bar graph below shows the number of students by major in the College of Arts and Sciences.About how many students are in the College of Arts and Sciences?

A. 1225 students B. 1050 students C. 1325 students D. 1100 students

Use the relation's graph to determine its domain and range. -  = 1 

A. Domain: (-?, ?) Range: (-?, -3] or [3, ?) B. Domain: (-?, -3] and [3, ?) Range: (-?, ?) C. Domain: (-?, ?) Range: (-?, -3] and [3, ?) D. Domain: (-?, -3] or [3, ?) Range: (-?, ?)