Ok, Now lets go through the documentation I gave in comments step by step:

Documents:

```
`ખુબ વખાણ કરે છે
ખુબ વધારે છે`
```

- Get all unique terms (
`features`

): `['કરે', 'ખુબ', 'છે.', 'વખાણ', 'વધારે']`

Calculate frequency of each term in documents:-

a. Each term present in document1 `[ખુબ વખાણ કરે છે]`

is present once, and વધારે is not present.`

b. So the term frequency vector (sorted according to features): `[1 1 1 1 0]`

c. Applying steps a and b on document2, we get `[0 1 1 0 1]`

d. So our final term-frequency vector is `[[1 1 1 1 0], [0 1 1 0 1]]`

**Note**: This is the term frequency you want

Now find IDF (This is based on features, not on document basis):

`idf(term) = log(number of documents/number of documents with this term) + 1`

1 is added to the idf value to prevent zero divisions. It is governed by `"smooth_idf"`

parameter which is True by default.

```
idf('કરે') = log(2/1)+1 = 0.69314.. + 1 = 1.69314..
idf('ખુબ') = log(2/2)+1 = 0 + 1 = 1
idf('છે.') = log(2/2)+1 = 0 + 1 = 1
idf('વખાણ') = log(2/1)+1 = 0.69314.. + 1 = 1.69314..
idf('વધારે') = log(2/1)+1 = 0.69314.. + 1 = 1.69314..
```

**Note**: This corresponds to the data you showed in question.

Now calculate TF-IDF (This again is calculated document-wise, calculated according to sorting of features):

a. For document1:

```
For 'કરે', tf-idf = tf(કરે) x idf(કરે) = 1 x 1.69314 = 1.69314
For 'ખુબ', tf-idf = tf(કરે) x idf(કરે) = 1 x 1 = 1
For 'છે.', tf-idf = tf(કરે) x idf(કરે) = 1 x 1 = 1
For 'વખાણ', tf-idf = tf(કરે) x idf(કરે) = 1 x 1.69314 = 1.69314
For 'વધારે', tf-idf = tf(કરે) x idf(કરે) = 0 x 1.69314 = 0
```

So for document1, the final tf-idf vector is `[1.69314 1 1 1.69314 0]`

b. Now normalization is done (l2 Euclidean):

```
dividor = sqrt(sqr(1.69314)+sqr(1)+sqr(1)+sqr(1.69314)+sqr(0))
= sqrt(2.8667230596 + 1 + 1 + 2.8667230596 + 0)
= sqrt(7.7334461192)
= 2.7809074272977876...
```

Dividing each element of the tf-idf array with dividor, we get:

`[0.6088445 0.3595948 0.3595948548 0.6088445 0]`

**Note:** This is the tfidf of firt document you posted in question.

c. Now do the same steps a and b for document 2, we get:

`[ 0. 0.453294 0.453294 0. 0.767494]`

**Update: About **`sublinear_tf = True OR False`

Your original term frequency vector is `[[1 1 1 1 0], [0 1 1 0 1]]`

and you are correct in your understanding that using sublinear_tf = True will change the term frequency vector.

```
new_tf = 1 + log(tf)
```

Now the above line will only work on non zero elements in the term-frequecny. Because for 0, log(0) is undefined.

And all your non-zero entries are 1. `log(1)`

is 0 and 1 + log(1) = 1 + 0 = 1`.

You see that the values will remain unchanged for elements with value 1. So your `new_tf = [[1 1 1 1 0], [0 1 1 0 1]] = tf(original)`

.

Your term frequency is changing due to the `sublinear_tf`

but it still remains the same.

And hence all below calculations will be same and output is same if you use `sublinear_tf=True`

OR `sublinear_tf=False`

.

Now if you change your documents for which the term-frequecy vector contains **elements other than 1 and 0**, you will get differences using the `sublinear_tf`

.

Hope your doubts are cleared now.