I have the following situation:
A machine takes on average c cycles per instruction without considering memory stalls, and has a miss penalty p for all misses. Let i and d be respectively the instruction cache miss rate and data cache miss rate for a program with n instructions and f memory references per instruction. Assume that the hit time is not a factor in determining cache performance.
I have worked out that the number of cycles required to run the program with memory stalls taken into account is n(c + ip + fdp).
The next part says:
If we want to improve the execution time of this pro- gram by a factor of k, how much do we need to reduce the number of cycles that each instruction takes? Another way to improve the execution time is to reduce the cycle time of the machine. If we want to improve the execution time by a factor of k, how much do we need to improve the cycle time?
I have got n(c + ip + fdp) / k so I'm thinking that the answer must be 1/k for the first part, but that seems too obvious. And surely if the cycle time is t then n(c + ip + fdp) * t gives the overall execution time, so it must be 1/k again?