I am doing linear regression with multiple variables/features. I try to get thetas (coefficients) by using **normal equation** method (that uses matrix inverse), Numpy least-squares **numpy.linalg.lstsq** tool and **np.linalg.solve** tool. In my data I have **n = 143** features and **m = 13000** training examples.

For **normal equation** method with **regularization** I use this formula:

*Regularization is used to solve the potential problem of matrix non-invertibility ( XtX matrix may become singular/non-invertible)*

**Data preparation code:**

```
import pandas as pd
import numpy as np
path = 'DB2.csv'
data = pd.read_csv(path, header=None, delimiter=";")
data.insert(0, 'Ones', 1)
cols = data.shape[1]
X = data.iloc[:,0:cols-1]
y = data.iloc[:,cols-1:cols]
IdentitySize = X.shape[1]
IdentityMatrix= np.zeros((IdentitySize, IdentitySize))
np.fill_diagonal(IdentityMatrix, 1)
```

For **least squares** method I use Numpy's *numpy.linalg.lstsq*. Here is Python code:

```
lamb = 1
th = np.linalg.lstsq(X.T.dot(X) + lamb * IdentityMatrix, X.T.dot(y))[0]
```

Also I used **np.linalg.solve** tool of numpy:

```
lamb = 1
XtX_lamb = X.T.dot(X) + lamb * IdentityMatrix
XtY = X.T.dot(y)
x = np.linalg.solve(XtX_lamb, XtY);
```

For **normal equation** I use:

```
lamb = 1
xTx = X.T.dot(X) + lamb * IdentityMatrix
XtX = np.linalg.inv(xTx)
XtX_xT = XtX.dot(X.T)
theta = XtX_xT.dot(y)
```

In all methods I used regularization. Here is results (theta coefficients) to see difference between these three approaches:

```
Normal equation: np.linalg.lstsq np.linalg.solve
[-27551.99918303] [-27551.95276154] [-27551.9991855]
[-940.27518383] [-940.27520138] [-940.27518383]
[-9332.54653964] [-9332.55448263] [-9332.54654461]
[-3149.02902071] [-3149.03496582] [-3149.02900965]
[-1863.25125909] [-1863.2631435] [-1863.25126344]
[-2779.91105618] [-2779.92175308] [-2779.91105347]
[-1226.60014026] [-1226.61033117] [-1226.60014192]
[-920.73334259] [-920.74331432] [-920.73334194]
[-6278.44238081] [-6278.45496955] [-6278.44237847]
[-2001.48544938] [-2001.49566981] [-2001.48545349]
[-715.79204971] [-715.79664124] [-715.79204921]
[ 4039.38847472] [ 4039.38302499] [ 4039.38847515]
[-2362.54853195] [-2362.55280478] [-2362.54853139]
[-12730.8039209] [-12730.80866036] [-12730.80392076]
[-24872.79868125] [-24872.80203459] [-24872.79867954]
[-3402.50791863] [-3402.5140501] [-3402.50793382]
[ 253.47894001] [ 253.47177732] [ 253.47892472]
[-5998.2045186] [-5998.20513905] [-5998.2045184]
[ 198.40560401] [ 198.4049081] [ 198.4056042]
[ 4368.97581411] [ 4368.97175688] [ 4368.97581426]
[-2885.68026222] [-2885.68154407] [-2885.68026205]
[ 1218.76602731] [ 1218.76562838] [ 1218.7660275]
[-1423.73583813] [-1423.7369068] [-1423.73583793]
[ 173.19125007] [ 173.19086525] [ 173.19125024]
[-3560.81709538] [-3560.81650156] [-3560.8170952]
[-142.68135768] [-142.68162508] [-142.6813575]
[-2010.89489111] [-2010.89601322] [-2010.89489092]
[-4463.64701238] [-4463.64742877] [-4463.64701219]
[ 17074.62997704] [ 17074.62974609] [ 17074.62997723]
[ 7917.75662561] [ 7917.75682048] [ 7917.75662578]
[-4234.16758492] [-4234.16847544] [-4234.16758474]
[-5500.10566329] [-5500.106558] [-5500.10566309]
[-5997.79002683] [-5997.7904842] [-5997.79002634]
[ 1376.42726683] [ 1376.42629704] [ 1376.42726705]
[ 6056.87496151] [ 6056.87452659] [ 6056.87496175]
[ 8149.0123667] [ 8149.01209157] [ 8149.01236827]
[-7273.3450484] [-7273.34480382] [-7273.34504827]
[-2010.61773247] [-2010.61839251] [-2010.61773225]
[-7917.81185096] [-7917.81223606] [-7917.81185084]
[ 8247.92773739] [ 8247.92774315] [ 8247.92773722]
[ 1267.25067823] [ 1267.24677734] [ 1267.25067832]
[ 2557.6208133] [ 2557.62126916] [ 2557.62081337]
[-5678.53744654] [-5678.53820798] [-5678.53744647]
[ 3406.41697822] [ 3406.42040997] [ 3406.41697836]
[-8371.23657044] [-8371.2361594] [-8371.23657035]
[ 15010.61728285] [ 15010.61598236] [ 15010.61728304]
[ 11006.21920273] [ 11006.21711213] [ 11006.21920284]
[-5930.93274062] [-5930.93237071] [-5930.93274048]
[-5232.84459862] [-5232.84557665] [-5232.84459848]
[ 3196.89304277] [ 3196.89414431] [ 3196.8930428]
[ 15298.53309912] [ 15298.53496877] [ 15298.53309919]
[ 4742.68631183] [ 4742.6862601] [ 4742.68631172]
[ 4423.14798495] [ 4423.14765013] [ 4423.14798546]
[-16153.50854089] [-16153.51038489] [-16153.50854123]
[-22071.50792741] [-22071.49808389] [-22071.50792408]
[-688.22903323] [-688.2310229] [-688.22904006]
[-1060.88119863] [-1060.8829114] [-1060.88120546]
[-101.75750066] [-101.75776411] [-101.75750831]
[ 4106.77311898] [ 4106.77128502] [ 4106.77311218]
[ 3482.99764601] [ 3482.99518758] [ 3482.99763924]
[-1100.42290509] [-1100.42166312] [-1100.4229119]
[ 20892.42685103] [ 20892.42487476] [ 20892.42684422]
[-5007.54075789] [-5007.54265501] [-5007.54076473]
[ 11111.83929421] [ 11111.83734144] [ 11111.83928704]
[ 9488.57342568] [ 9488.57158677] [ 9488.57341883]
[-2992.3070786] [-2992.29295891] [-2992.30708529]
[ 17810.57005982] [ 17810.56651223] [ 17810.57005457]
[-2154.47389712] [-2154.47504319] [-2154.47390285]
[-5324.34206726] [-5324.33913623] [-5324.34207293]
[-14981.89224345] [-14981.8965674] [-14981.89224973]
[-29440.90545197] [-29440.90465897] [-29440.90545704]
[-6925.31991443] [-6925.32123144] [-6925.31992383]
[ 104.98071593] [ 104.97886085] [ 104.98071152]
[-5184.94477582] [-5184.9447972] [-5184.94477792]
[ 1555.54536625] [ 1555.54254362] [ 1555.5453638]
[-402.62443474] [-402.62539068] [-402.62443718]
[ 17746.15769322] [ 17746.15458093] [ 17746.15769074]
[-5512.94925026] [-5512.94980649] [-5512.94925267]
[-2202.8589276] [-2202.86226244] [-2202.85893056]
[-5549.05250407] [-5549.05416936] [-5549.05250669]
[-1675.87329493] [-1675.87995809] [-1675.87329255]
[-5274.27756529] [-5274.28093377] [-5274.2775701]
[-5424.10246845] [-5424.10658526] [-5424.10247326]
[-1014.70864363] [-1014.71145066] [-1014.70864845]
[ 12936.59360437] [ 12936.59168749] [ 12936.59359954]
[ 2912.71566077] [ 2912.71282628] [ 2912.71565599]
[ 6489.36648506] [ 6489.36538259] [ 6489.36648021]
[ 12025.06991281] [ 12025.07040848] [ 12025.06990358]
[ 17026.57841531] [ 17026.56827742] [ 17026.57841044]
[ 2220.1852193] [ 2220.18531961] [ 2220.18521579]
[-2886.39219026] [-2886.39015388] [-2886.39219394]
[-18393.24573629] [-18393.25888463] [-18393.24573872]
[-17591.33051471] [-17591.32838012] [-17591.33051834]
[-3947.18545848] [-3947.17487999] [-3947.18546459]
[ 7707.05472816] [ 7707.05577227] [ 7707.0547217]
[ 4280.72039079] [ 4280.72338194] [ 4280.72038435]
[-3137.48835901] [-3137.48480197] [-3137.48836531]
[ 6693.47303443] [ 6693.46528167] [ 6693.47302811]
[-13936.14265517] [-13936.14329336] [-13936.14267094]
[ 2684.29594641] [ 2684.29859601] [ 2684.29594183]
[-2193.61036078] [-2193.63086307] [-2193.610366]
[-10139.10424848] [-10139.11905454] [-10139.10426049]
[ 4475.11569903] [ 4475.12288711] [ 4475.11569421]
[-3037.71857269] [-3037.72118246] [-3037.71857265]
[-5538.71349798] [-5538.71654224] [-5538.71349794]
[ 8008.38521357] [ 8008.39092739] [ 8008.38521361]
[-1433.43859633] [-1433.44181824] [-1433.43859629]
[ 4212.47144667] [ 4212.47368097] [ 4212.47144686]
[ 19688.24263706] [ 19688.2451694] [ 19688.2426368]
[ 104.13434091] [ 104.13434349] [ 104.13434091]
[-654.02451175] [-654.02493111] [-654.02451174]
[-2522.8642551] [-2522.88694451] [-2522.86424254]
[-5011.20385919] [-5011.22742915] [-5011.20384655]
[-13285.64644021] [-13285.66951459] [-13285.64642763]
[-4254.86406891] [-4254.88695873] [-4254.86405637]
[-2477.42063206] [-2477.43501057] [-2477.42061727]
[ 0.] [ 1.23691279e-10] [ 0.]
[-92.79470071] [-92.79467095] [-92.79470071]
[ 2383.66211583] [ 2383.66209637] [ 2383.66211583]
[-10725.22892185] [-10725.22889937] [-10725.22892185]
[ 234.77560283] [ 234.77560254] [ 234.77560283]
[ 4739.22119578] [ 4739.22121432] [ 4739.22119578]
[ 43640.05854156] [ 43640.05848841] [ 43640.05854157]
[ 2592.3866707] [ 2592.38671547] [ 2592.3866707]
[-25130.02819215] [-25130.05501178] [-25130.02819515]
[ 4966.82173096] [ 4966.7946407] [ 4966.82172795]
[ 14232.97930665] [ 14232.9529959] [ 14232.97930363]
[-21621.77202422] [-21621.79840459] [-21621.7720272]
[ 9917.80960029] [ 9917.80960571] [ 9917.80960029]
[ 1355.79191536] [ 1355.79198092] [ 1355.79191536]
[-27218.44185748] [-27218.46880642] [-27218.44185719]
[-27218.04184348] [-27218.06875423] [-27218.04184318]
[ 23482.80743869] [ 23482.78043029] [ 23482.80743898]
[ 3401.67707434] [ 3401.65134677] [ 3401.67707463]
[ 3030.36383274] [ 3030.36384909] [ 3030.36383274]
[-30590.61847724] [-30590.63933424] [-30590.61847706]
[-28818.3942685] [-28818.41520495] [-28818.39426833]
[-25115.73726772] [-25115.7580278] [-25115.73726753]
[ 77174.61695995] [ 77174.59548773] [ 77174.61696016]
[-20201.86613672] [-20201.88871113] [-20201.86613657]
[ 51908.53292209] [ 51908.53446495] [ 51908.53292207]
[ 7710.71327865] [ 7710.71324194] [ 7710.71327865]
[-16206.9785119] [-16206.97851993] [-16206.9785119]
```

As you can see normal equation, least squares and np.linalg.solve tool methods give to some extent different results. The question is why these three approaches gives noticeably different results and which method gives **more efficient** and **more accurate** result?

**Assumption:**
Results of Normal equation method and results of **np.linalg.solve** are very close to each other. And results of **np.linalg.lstsq** differ from both of them. Since normal equation uses inverse we do not expect very accurate results of it and therefore results of np.linalg.solve tool also. Seem to be that better results are given by **np.linalg.lstsq**.

**Upd:**

*As Dave Hensley mentioned:*

*After the line*

`np.fill_diagonal(IdentityMatrix, 1)`

*this code*

`IdentityMatrix[0,0] = 0`

*should be added.*

*DB2.csv** is available on DropBox: DB2.csv*

*Full Python code is available on DropBox: Full code*