# Algorithm to reform a sentence from sentence whose spaces are removed and alphabets of words are reordered?

I was looking around some puzzles online to improve my knowledge on algorithms...

I came upon below question:

"You have a sentence with several words with spaces remove and words having their character order shuffled. You have a dictionary. Write an algorithm to produce the sentence back with spaces and words with normal character order."

I do not know what is good way to solve this.

I am new to algorithms but just looking at problem I think I would make program do what an intellectual mind would do.

Here is something I can think of:

-First find out manually common short english words from dictionary like "is" "the" "if" etc and put in dataset-1.

-Then find out permutation of words in dataset1 (eg "si", "eht" or "eth" or "fi") and put in dataset-2

-then find out from input sentense what character sequence matches the words of dataset2 and put them in dataset-3 and insert space in input sentence instead of those found.

-for rest of the words i would perform permutations to find out word from dictionary.

I am newbie to algorithms...is it a bad solution?

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this seems like a perfectly fine solution,

In general there are 2 parameters for judging an algorithm.

1. correctness - does the algorithm provide the correct answer.

2. resources - the time or storage size needed to provide an answer.

usually there is a tradeoff between these two parameters.

so for example the size of your dictionary dictates what scrambled sentences you may reconstruct, giving you a correct answer for more inputs, however the whole searching process would take longer and would require more storage.

The hard part of the problem you presented is the fact that you need to compute permutations, and there are a LOT of them.

so checking them all is expensive, a good approach would be to do what you suggested, create a small subset of commonly used words and check them first, that way the average case is better.

note: just saying that you check the permutation/search is ok, but in the end you would need to specify the exact way of doing that.

currently what you wrote is an idea for an algorithm but it would not allow you to take a given input and mechanically work out the output.

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