# Dealing with outliers using the Z-Score method

This article was published as a part of the Data Science Blogathon.

## Introduction

Outlier detection is one of the widely used methods in any data science project, as its presence can lead **to the development of a bad machine learning model**. Let’s take a quick scenario of the linear regression problem statement, where suppose you have to predict the person’s weight from the height. In general, one with more height will also have more weight (linear positive trend), but what if rarely we have 3-4 people who have much less weight, but comparatively more height than that data will be treated as **bad data or the outliers.** Which, in the end, would not be a good fit for our regression model.

There are various ways through which we can deal with the outliers, though, in this article, we will have our complete focus on **the Z-Score** method. Here we will talk about the **limitations of this method**, **When to use and prefer other methods**, and of course, the **complete implementation using Python**.

## Limitations of Z-Score

Though Z-Score is a highly efficient way of detecting and removing outliers, we cannot use it with every data type. When we said that, we mean that it only works with the data which is completely or close to **normally distributed,** which in turn stimulates that this method is not for **skewed** data, either **left skew** or **right skew. For** the other data, we have something known as **Inter quartile range (IQR)** method, which we will cover in the next article in depth.

Enough of the theory. Let’s now jump to practically implement this method and see how we can **detect and remove the bad data** from the dataset to improve the model accuracy.

import numpy as np import pandas as pd import matplotlib.pyplot as plt import seaborn as sns

We prepare our stuff by importing all the essential libraries from Python’s supported package. Here we have imported four main libraries that we will use during the execution part:

**Numpy:**For performing mathematical calculations by simplifying the same from its predefined functions**Pandas**: Pandas is the data manipulation library that helps play with DataFrames.**Matplotlib:**This is one of the most common libraries used for visualization closest to the python backend.**Seaborn:**Another visualization library with better representation, look, and feel but built on top of matplotlib.

df_org = pd.read_csv('placement.csv') df_org.head()

**Output:**

**Inference:** We are using the simple placement dataset for this article where we will take **GPA** and **placement exam marks** as two columns and select one of the columns which will show the **normal distribution,** then will proceed further to remove outliers from that feature. Use the **head** function to show the top 5 rows.

df_org.shape

**Output:**

(1000, 3)

**Inference:** As the **shape** function stimulates, we have **1000 rows** of data with **3 columns** -> (1000,3).

df_org.sample(5)

**Output:**

**Inference:** Like head function returns the top 5 rows (by default). Similarly, the sample function returns the random sample of ‘n’ rows depending on what value we are giving in the parameter.

plt.figure(figsize=(16,5)) plt.subplot(1,2,1) sns.histplot(df_org['cgpa'], kde=True) plt.subplot(1,2,2) sns.histplot(df_org['placement_exam_marks'], kde=True) plt.show()

**Output:**

**Inference:** We chose **hist-plot** with **kernel density as a True** graph for both CGPA and **placement_exam_marks** column so that we can clearly understand that among them, which one has the **normal distribution**?

From the graph, we can see that CGPA is almost the right fit for the normal distribution, or we can say it is forming the correct **bell curve**. Meanwhile, the other one is slightly **skewed** towards the right. Hence, we are gonna take CGPA for our further analysis.

df_org['placement_exam_marks'].skew()

**Output:**

0.8356419499466834

df_org['cgpa'].skew()

**Output:**

-0.014529938929314918

**Inference:** We were lucky enough to spot the difference between a normal distribution and skewed distribution from the above graph, but sometimes, the graph might not give a clear understanding that we have the **skew function** from pandas which will give a **higher positive value** if the distribution seems to be **skewed** (**placement_exam_marks**) otherwise it will return the quite **lower value even in negative** if it is not skewed at all (CGPA).

print("Mean value of cgpa",df_org['cgpa'].mean()) print("Standard deviation of cgpa",df_org['cgpa'].std()) print("Minimum value of cgpa",df_org['cgpa'].min()) print("Maximum value of cgpa",df_org['cgpa'].max())

**Output:**

Mean value of cgpa 6.96124000000001 Standard deviation of cgpa 0.6158978751323894 Minimum value of cgpa 4.89 Maximum value of cgpa 9.12

**Inference:** Here are some different statistical measures for CGPA, which are printed out to compare the original values (from original data) to when the data will be **free of any outlier. The analysis will also be evident**.

## Approach for Outliers

From here onwards, our main task starts, but before implementing the same, let’s first discuss the game plan and how we will approach **dealing with bad data using Z-Score:**

- The very first step will be setting the
**upper**and**lower**limit. This range stimulates that**every data point will be regarded as an outlier out of this range**. Let’s see the formulae for both upper and lower limits.**Upper:**Mean + 3 * standard deviation.**Lower:**MEan – 3 * standard deviation.

print("Upper limit",df_org['cgpa'].mean() + 3*df_org['cgpa'].std()) print("Lower limit",df_org['cgpa'].mean() - 3*df_org['cgpa'].std())

**Output:**

Upper limit 8.808933625397177 Lower limit 5.113546374602842

**Inference:** In the output, we see that the highest value is **8.80** while the lowest value is **5.11**. Hence any value out of this range is the **bad data point**

- The second step is to detect
**how many outliers are there in the dataset**based on the upper and lower limit that we set up just

df_org[(df_org['cgpa'] > 8.80) | (df_org['cgpa'] < 5.11)]

**Output:**

**Inference:** Now, we are performing the **filtering using pandas** where we are passing in two conditions keeping in mind that if either condition is **True,** then our objective will be attained. In the output, we can see that it returned **5 rows, i.e.,** **5 outliers** in the dataset.

- Now, we are gonna start with the third and the last step, where we will finally
**remove the detected outliers in step 2**using two techniques; we can either go for**Trimming**or**Capping**, and we will discuss both techniques more closely separately.

## Trimming for Outliers

The first technique for dealing with outliers is **trimming,** and this is regardless of what kind of data distribution you are working with, trimming is an applicable and proven technique for most data types. We pluck out all the outliers using the filter condition in this technique.

new_df_org = df_org[(df_org['cgpa'] 5.11)] new_df_org

**Output:**

**Inference:** So, as we can see, we applied that condition where all the data should be in the range of our upper and lower limit. As a result, instead of **1000 rows,** it returned **995 rows** which indicate that we have successfully **removed 5 outliers**.

## Capping

Capping is another technique for dealing with bad data points; it is useful when we have many outliers, and removing a good amount of data from the dataset is not good. In that case, capping comes into the picture as it won’t remove them. Instead, it brings back those data points **within the range** we specified according to our **Z-Score value**.

upper_limit = df_org['cgpa'].mean() + 3*df_org['cgpa'].std() lower_limit = df_org['cgpa'].mean() - 3*df_org['cgpa'].std() df_org['cgpa'] = np.where( df_org['cgpa']>upper_limit, upper_limit, np.where( df_org['cgpa']<lower_limit, lower_limit, df_org['cgpa'] ) )

**Inference:** The first thing is setting the **upper and lower bound**. Then comes the part of **np. Where** the function that will help to implement the logic behind capping, the basic syntax is as, **np.where(condition, True, False)** i.e., if the condition is true, then that data point will be getting the **upper limit value** (within range) if not, it will go to check the lower limit, and if that’s true, then it will give that data point **lower limit value** (within range).

df_org.shape

**Output:**

(1000, 3)

**Inference:** As we did capping, no data was lost, and we still have **1000 rows**.

df_org['cgpa'].describe()

**Output:**

**Inference:** Now, if we compare the minimum and maximum values before outlier removal and after, we can see that **the minimum value is increased** and **the maximum value is decreased**.

## Conclusion

In this article, we discussed one of the efficient ways of dealing with and removing the bad data for our further analysis, i.e., removing outliers, also known as **Anamoly detection**. Here we saw how statistical measures such as Z-Score can help deal with such problems.

- Firstly we started by
**importing libraries**,**reading the dataset**, and having a brief look over it. Before that, we also discussed the**limitations of Z-Score**and when we should prefer it. - Then we analyze the data distribution of the columns to choose the normally distributed column as Z-Score only applies to that type. As a result,
**GPA**seems to be fit for further analysis. - At last, we discussed two methods via which we can do the
**Anamoly detection: Trimming**(removing outliers) and**Capping**(imputing outliers).

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