| EXTRA CREDIT |
|
Question: In 1992, a group of trains by the names of Jim (vocals/guitar) James [J(v/g)J], Aaron (guitar) Todavich [A(g)T], Ben (bass) Blandford [B(b)B], and Dave (drums) Givan [D(d)G] left Louisville, Kentucky on the Month of Sundays (MOS) line. If train [A(g)T] was rerouted in 1995, and train [J(v/g)J] separated from trains [B(b)B] and [D(d)G] in 1998, only to be rejoined on a different line in 2007, what station would the three remaining trains be reunited? Problem: [J(v/g)J] + [A(g)T] + [B(b)B] + [D(d)G] / 1991 = MOS - [A(g)T] / 1995 = MOS(2) - [J(v/g)J] - [B(b)B] - [D(d)G] / 1998 = x + [J(v/g)J] + [B(b)B] + [D(d)G] / 2007 = y Work: Answer: x = we don't know y = Mont De Sundua |