Решение в MathCAD
Consider a network with a ring topology, link bandwidths of 100 Mbps, and propagation speed 2×108 m/s. What would the circumference of the loop be to exactly contain one 1500-byte packet, assuming nodes do not introduce delay? What would the circumference be if there was a node every 100 m, and each node
introduced 10 bits of delay?
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)
Consider a network with a ring topology, link bandwidths of 100 Mbps, and propagation speed 2×108 m/s. What would the circumference of the loop be to exactly contain one 1500-byte packet, assuming nodes do not introduce delay? What would the circumference be if there was a node every 100 m, and each node
introduced 10 bits of delay?