Decision Tree AssignmentPlay now? Play later?You can become a millionaire! Thats what the junk mail said. But then there was the fine print:If you send in your entry before midnight tonight, then here are your chances:0.1% that you win $1,000,00075% that you win nothingOtherwise, you must PAY $1,000But wait, theres more! If you dont win the million AND you dont have to pay on your first attempt,then you can choose to play one more time. If you choose to play again, then here are your chances:2% that you win $100,00020% that you win $500Otherwise, you must PAY $2,000What is your expected outcome for attempting this venture? Solve this problem usinga decision tree and clearly show all calculations and the expected monetary value at each node.Use maximization of expected value as your decision criterion.Answer these questions:1) Should you play at all? (5%) If you play, what is your expected (net) monetary value? (15%)2) If you play and dont win at all on the first try (but dont lose money), should you try again? (5%) Why? (10%)3) Clearly show the decision tree (40%) and expected net monetary value at each node (25%)
Obtain the general solution of the following DEs: i. y′′′ + y′′ − 4y′ + 2y = 0 ii. y(4) + 4y(2) = 0 iii. x(x − 2)y′′ + 2(x − 1)y′ − 2y = 0; use y1 = (1 − x) iv. y′′ − 4y = sin2(x) v. y′′ − 4y′ + 3y = x ; use y1 = e3x vi. y′′ + 5y′ + 6y = e2xcos(x) vii. y′′ + y = sec(x) tan(x)
Obtain the general solution of the following DEs: i. y′′′ + y′′ − 4y′ + 2y = 0 ii. y(4) + 4y(2) = 0 iii. x(x − 2)y′′ + 2(x − 1)y′ − 2y = 0; use y1 = (1 − x) iv. y′′ − 4y = sin2(x) v. y′′