You've correctly identified the three propositional variables:
- P1(x): "x presses a button."
- P2(x): "x receives one million dollars."
- P3(x): "x causes the death of a random person."
You want to express the sentence Q: "if someone presses the button, then they receive a million dollars and a person dies." At first glance, it seems like P1(x) ⇒ P2(x) ∧ P3(x) correctly expresses this. How can we be sure? Let's draw a truth table:
P1 P2 P3 P2 ^ P3 P1 --> P2 ^ P3
---- ---- ---- --------- ----------------
T T T T T
T T F F F
T F T F F
T F F F F
F T T T T
F T F F T
F F T F T
F F F F T
Notice that "you receive a million dollars and cause a death" is true only when both of the constituent parts are true. This makes sense; if both parts don't come true, the whole is not also true.
Notice also the truth values for the entire statement Q: it's false whenever the second part is false and the first part is true. This makes sense: if you press the button but either (1) the million dollars doesn't appear or (2) nobody dies, the prediction implied by Q is not true. So our assertion is correct.