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Help required for improving the program.
Given an integer input of Length N A set is formed of numbers 1 to N like {1,2,3,4,...,N} Find the length of longest subset S1 that can be formed such that if S1 contains x then it should not contain 2x. I made an attempt at solving it and was able to complete 7/9 test cases but the last 2 test cases ended as time limit error and segmentation fault. How can I improve the code to complete the remaining test cases.
14 Answers
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Sorry, I just somehow missed it.
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And how exactly are people supposed to help improve a program without seeing it?
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I found optimizations to your implementation, though I did not verify whether the algorithm correctly meets the challenge.
Line 14 can skip even numbers and double the speed. Change from
for(int i=0;i<a;i++){
to
for(int i=1;i<a;i+=2){
Maybe better yet, empirically I observed the resulting answer seems to be always round(2N/3). If that is a general rule, then you could shorten your main code to 3 lines!
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Thank you very much for your suggestion
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What happens if you try the rounded calculation approach? And just to be safe, try using long instead of int in the declarations.
For example,
printf("%ld", (long)(2.0*a/3.0 + 0.5));
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The problem in deriving a general rule is if 2N/3 is a float value it sometimes takes ceil value while other times it takes floor values
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*decimal value
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My observation was that the answer was neither ceil nor floor, but consistently the rounded decimal value.
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Yess it always ends up close it. Nice observation🙂
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Also I made the necessary modifications but it still gives time limit error
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In case of rounded calculation for half of the test case the formula mentioned by you works and for others 2*a/3-0.5 works
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sanjit jha you mentioned getting a segmentation fault. That happens when accessing memory out of bounds. I suspect that they are giving very large numbers for N, which might cause overflow when storing N into int a and it becomes negative. Try using unsigned int, or long, or unsigned long.
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I had tried it but it only results in time limit error.