# Why the predicted value by LinearRegression is exactly the same as the true value?

I'm doing a regression by `LinearRegression` and get the mean squared error 0. I think there should be some deviation(at least small). Could you please explain this phenomenon?

``````## Import packages
import numpy as np
import pandas as pd
from sklearn.linear_model import LinearRegression
from sklearn.metrics import mean_squared_error
import urllib.request

## Import dataset
urllib.request.urlretrieve('https://raw.githubusercontent.com/Data-Science-FMI/ml-from-scratch-2019/master/data/house_prices_train.csv',
'house_prices_train.csv')
x = df_train['GrLivArea'].values.reshape(1, -1)
y = df_train['SalePrice'].values.reshape(1, -1)
print('The explanatory variable is', x)
print('The variable to be predicted is', y)

## Regression
reg = LinearRegression().fit(x, y)
mean_squared_error(y, reg.predict(x))
print('The MSE is', mean_squared_error(y, reg.predict(x)))
print('Predicted value is', reg.predict(x))
print('True value is', y)
``````

The result is

``````The explanatory variable is [[1710 1262 1786 ... 2340 1078 1256]]
The variable to be predicted is [[208500 181500 223500 ... 266500 142125 147500]]
The MSE is 0.0
Predicted value is [[208500. 181500. 223500. ... 266500. 142125. 147500.]]
True value is [[208500 181500 223500 ... 266500 142125 147500]]
``````
• you never seem to split your data, so you are training and testing on the same sample set hence perfect results. Have you heard of `train_test_split` ? Sep 24, 2020 at 8:28
• textbook case of OVERFITTING. you need to split the data into training and test sets and then go on. now you fit the whole dataset into the model Sep 24, 2020 at 8:31
• Thank you @GhandiFloss and seralouk. I can not image that the overfitting in this case is such serious. Sep 24, 2020 at 8:33
• @LAD you are fitting on (x,y) and then predicting on x again, which you just used for training your model. This is overfitting. As the others suggested, you need to split your data into training and testing subsets. Sep 24, 2020 at 8:47

Your problem is that you've reshaped the data incorrectly: `reshape(1, -1)` makes an array of shape `(1, n)`, so your model thinks it has `n` features and `n` outputs with only a single sample, and so is a multiple linear regression with a perfect fit. Try instead with `reshape(-1, 1)` for `x` and no reshaping for `y`.