Let the first car travel east (to the right) and the second car west (to the left). Call the distances traveled e and w respectively.
The first car starts out an hour before the second car (that is, at hour 0), traveling at 55 mph. During the first hour, this car travels 55 miles east. A general equation for the distance traveled from the starting point as a function of x (time) is e=(55 mph)(1 hour) + (55mph)x
The other car starts out at time = 1 hour, at 75 mph. A general equation for the distance traveled from the same starting point as a function of x is then w = (75 mph)x.
We want to know when the total distance traveled in opposite directions by the two cars is e + w = (55 miles) + (55 mph)x + (75 mph)x = 380 mi
Solve for x. 55 miles + (55+75)(mph)x = 380 miles
(130 mph)x = 325 miles
Divide both sides by (130 mph):
(130 mph) x 325 miles
------------------ = -------------------- = 2.5 hours (answer)
(130 mph) 13 mph
