An archaeologist discovers a ledger from an ancient merchant who traveled through multiple civilizations. The merchant recorded the number of olive oil jars in three different ways for three different cities:
City A (The Nile): Uses \(2\) coiled ropes, \(4\) heel bones, and \(8\) strokes.
City B (Mesopotamia): Uses a positional notation \(2, 0\) in base-\(60\).
City C (Yucatán): Uses a \(1\) dot and \(1\) bar on the top level and a shell symbol on the bottom level .
\(1.\) How many jars did the merchant record for City A (The Nile) in our modern decimal system?
\(2.\) What is the decimal value of the jars recorded for City B (Mesopotamia),
assuming \(2, 0\) represents a positional base-\(60\) value?
\(3.\) Calculate the total jars for City C (Yucatán) using the Mayan base-\(20\) logic described.
\(4.\) Based on the calculations above, which two cities have the exact same number of jars recorded in the merchant's ledger?