A father and his son can clean the house together in 9 hours. When the son works​ alone, it takes him an hour longer to clean than it takes his dad alone. Find how long it takes the son to clean alone.

Answer: It will take the son 18.55 hoursStep-by-step explanation:It takes 9 hours for the father and son to clean the house if they work together. This means that their unit rate of working together will be 1/9When the son works​ alone, it takes him an hour longer to clean than it takes his dad alone. Let x = the time it takes the father to clean the house. This means that it takes the son (x+1) hours to clean the house alone.The unit rate if working of the son will be 1/+1The unit rate of working of the father will be 1/xSince they are working simultaneously, their unit rates are additive. Therefore 1/(x+1) + 1/x = 1/9(x + x + 1)/x(x+1) = 1/9(2x+1)/(x^2 + x)= 1/918x + 9 = x^2 + xx^2 + x - 18x-9x°2 - 17x - 9 = 0Applying the general formula for quadratic equations,x = [-b+-√b^2-4ac)]/2ax =[ - -17 +-√-17^2-4(2×1)]/2×1x = (17+-18.03)/2x = (17 + 18.03)/2 or x = (17 - 18.03)/2x = 17.55 or x = -0.515.The time cannot be negative so it is 17.55It takes the father 17.55 hours if he works alone.It will take the son 17.55 + 1 = 18.55 hours