Subtract.(9x6 - 11x3 + 17) - (-18x3 + 5x6 + 6)

Evaluate the expression.(-2)0

A. 0 B. 1 C. -2 D. -1

A small country consists of four states (State 1, State 2, State 3, and State 4). The total population of the country is 400,000. The standard quotas are q1 = 179.8, q2 = 129.6, q3 = 79.2, and q4 = 11.4 respectively.The final apportionment to each state under Hamilton's method is

A. State 1: 179 seats; State 2: 131 seats; State 3: 79 seats; State 4: 11 seats. B. State 1: 179 seats; State 2: 130 seats; State 3: 79 seats; State 4: 12 seats. C. State 1: 180 seats; State 2: 129 seats; State 3: 80 seats; State 4: 11 seats. D. State 1: 180 seats; State 2: 130 seats; State 3: 79 seats; State 4: 11 seats. E. none of these

For the given functions f and g , find the indicated composition.f(x) = 7x + 12,g(x) = 3x - 1(f?g)(x)

A. 21x + 11 B. 21x + 35 C. 21x + 19 D. 21x + 5

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.

What will be an ideal response?