Ryan the trainer has two solo workout plans that he offers his clients: Plan A and Plan B. Each client does either one or the other (not both). On Wednesday there were 5clients who did Plan A and 3 who did Plan B. On Thursday there were 2 clients who did Plan A and 6 who did Plan B. Ryan trained his Wednesday clients for a total of 10hours and his Thursday clients for a total of 10 hours. How long does each of the workout plans last?

Answer:Both plans last for 1.25 hours (1 hour 15 minutes)Step-by-step explanation:Let x hours be the time needed for plan A and y hours be the time needed for plan B.On Wednesday there were 5 clients who did Plan A and 3 who did Plan B. Thus, 5x+3y=10.On Thursday there were 2 clients who did Plan A and 6 who did Plan B. Thus, 2x+6y=10.Solve the sytem of two equation. Multiply the first equation by 2, the second by 5 and subtract them:[tex]10x+6y-10x-30y=20-50,\\ \\-24y=-30,\\ \\y=\dfrac{30}{24}=\dfrac{5}{4}=1.25\ hours.[/tex]Therefore,[tex]5x+3\cdot 1.25=10,\\ \\5x=10-3.75=6.25,\\ \\x=1.25\ hours.[/tex]