After trying to add some insights as comments to the accepted answer but not being able to properly write them down due to general restrictions upon comments, I decided to put my two cents in as a full answer.

First let's formulate our investigative question properly. The data we are investigating is

```
A = np.array([0.19826790, 1.36836629, 1.37950911, 1.46951540, 1.48197798, 0.07532846])
B = np.array([0.6383447, 0.5271385, 1.7721380, 1.7817880])
```

with the sample means

```
A.mean() = 0.99549419
B.mean() = 1.1798523
```

I assume that since the mean of B is obviously greater than the mean of A, you would like to check if this result is statistically significant.

So we have the Null Hypothesis

```
H0: A >= B
```

that we would like to reject in favor of the Alternative Hypothesis

```
H1: B > A
```

Now when you call `scipy.stats.ttest_ind(x, y)`

, this makes a Hypothesis Test on the value of `x.mean()-y.mean()`

, which means that in order to get positive values throughout the calculation (which simplifies all considerations) we have to call

```
stats.ttest_ind(B,A)
```

instead of `stats.ttest_ind(B,A)`

. We get as an answer

`t-value = 0.42210654140239207`

`p-value = 0.68406235191764142`

and since according to the documentation this is the output for a two-tailed t-test we must divide the `p`

by 2 for our one-tailed test. So depending on the Significance Level `alpha`

you have chosen you need

```
p/2 < alpha
```

in order to reject the Null Hypothesis `H0`

. For `alpha=0.05`

this is clearly not the case so **you cannot reject** `H0`

.

An alternative way to decide if you reject `H0`

without having to do any algebra on `t`

or `p`

is by looking at the t-value and comparing it with the critical t-value `t_crit`

at the desired level of confidence (e.g. 95%) for the number of degrees of freedom `df`

that applies to your problem. Since we have

```
df = sample_size_1 + sample_size_2 - 2 = 8
```

we get from a statistical table like this one that

```
t_crit(df=8, confidence_level=95%) = 1.860
```

We clearly have

```
t < t_crit
```

so we obtain again the same result, namely that **we cannot reject** `H0`

.