# work out f(n), the exact number of unit-time operations the procedure requires as a function of the input size n

I have this question to solve, but despite my efforts, there is no result so far.

``````for i  <− 1 to n do
for j  <− 2 to (n+i) do
// a unit cost operation
``````

and also

``````for i  <− 1 to n do
for j  <− 1 to n do
for k <− 1 to (i+1) do
``````

Any suggestions for solving it are welcome.

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Try this: pick some small n (say n = 5), and for each "unit cost operation" put a tally mark on a piece of paper. Count them. As you are tallying, you should notice the pattern that you need to solve it.

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1st one

first lets format.

``````for i: 1 to n do:
for j: 2 to n + i do:
unit
``````

now, let's say n=1

• i=1; j: 2 to 2 = 1 times

total: 1 units

n=2

• i=1; j: 2 to 3 = 2 times
• i=2; j: 2 to 4 = 3 times

total: 2 + 3 = 5 units

n=3

• i=1; j: 2 to 4 = 7 times
• i=2; j: 2 to 5 = 8 times
• i=3; j: 2 to 6 = 9 times

total: 7 + 8 + 9 = 24 units

Pattern emerging yet?..

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This looks very helpful, but for n=3 I cannot understand.Shouldn't it be 4+5+6 times = 15 times? –  Theremin Mar 15 '11 at 12:54