Question 288 of 1,755
ModelingeasyMultiple ChoiceObjective-mapped

Quick Answer

The answer is to apply L2 regularization to the model. This technique, also known as Ridge regression, directly combats high variance by adding a penalty term equal to the squared magnitude of the coefficients to the loss function, which shrinks the weights and forces the model to be less sensitive to noise in the training data. On the AWS Certified Machine Learning Specialty MLS-C01 exam, this scenario tests your understanding of the bias-variance tradeoff and the specific role of regularization in regression; a common trap is confusing L2 with L1 regularization (Lasso), which is used for feature selection and can increase bias more aggressively. To remember: L2 is the "smooth shrinker" that reduces variance by penalizing large coefficients without zeroing them out, so think of it as a gentle tug that keeps the model from overfitting.

MLS-C01 Modeling Practice Question

This MLS-C01 practice question tests your understanding of modeling. The scenario asks you to isolate a root cause — eliminate options that address a different problem before choosing. After answering, compare your reasoning against the explanation and wrong-answer breakdown below. Once you have made your selection, read the full explanation to reinforce the concept and understand why each distractor is designed to mislead on exam day.

A data scientist is building a regression model to predict house prices. The dataset has 10 features, and the model shows high variance with a low bias. Which technique should the data scientist use to reduce variance?

Question 1easymultiple choice
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Answer choices

Why each option matters

Answer the question above first, then reveal the full breakdown to understand why each option is right or wrong.

Correct answer & explanation

Apply L2 regularization to the model.

L2 regularization (Ridge regression) penalizes large coefficients by adding a squared magnitude term to the loss function, which shrinks the model's weights and reduces variance without substantially increasing bias. This directly addresses the high-variance, low-bias symptom, making the model less sensitive to fluctuations in the training data.

Key principle: Answer the scenario, not the keyword: identify the specific constraint before choosing the most familiar-sounding option.

Answer analysis

Option-by-option breakdown

For each option: why learners choose it and why it is or isn't the right answer here.

  • Apply L2 regularization to the model.

    Why this is correct

    L2 regularization reduces variance by penalizing large coefficients.

    Related concept

    Read the scenario before looking for a memorised answer.

  • Increase the depth of decision trees in the ensemble.

    Why it's wrong here

    Deeper trees increase variance.

  • Add more features to the model.

    Why it's wrong here

    Adding more features increases variance.

  • Reduce the amount of training data.

    Why it's wrong here

    Less training data increases variance.

Common exam traps

Common exam trap: answer the scenario, not the keyword

Cisco often tests the misconception that adding more data or features always reduces variance, but the trap here is that high variance is best addressed by regularization or simplifying the model, not by increasing complexity or reducing data.

Detailed technical explanation

How to think about this question

L2 regularization adds a penalty term λ * Σ(w_i²) to the loss function, where λ controls the regularization strength; a larger λ forces weights closer to zero, reducing model complexity. In practice, L2 regularization is particularly effective when features are correlated, as it distributes weight among them rather than selecting a single feature, which helps stabilize predictions. A real-world scenario is predicting house prices with many correlated features (e.g., square footage and number of rooms), where L2 regularization prevents the model from overfitting to noise in the training set.

KKey Concepts to Remember

  • Read the scenario before looking for a memorised answer.
  • Find the constraint that changes the correct option.
  • Eliminate answers that are true in general but not in this case.

TExam Day Tips

  • Watch for words such as best, first, most likely and least administrative effort.
  • Review why wrong options are wrong, not only why the correct option is correct.

Key takeaway

Answer the scenario, not the keyword: identify the specific constraint before choosing the most familiar-sounding option.

Real-world example

How this comes up in practice

A cloud solutions architect for a retail company is evaluating services for a new workload. The correct answer here reflects best practice for the specific scenario described — not a general cloud recommendation. Answer the scenario, not the keyword: identify the specific constraint before choosing the most familiar-sounding option. Cloud exam questions reward reading the constraint carefully: the same technology can be right or wrong depending on the use case.

What to study next

Got this wrong? Here's your next step.

Identify which exam domain this question belongs to, review the core concept, then practise similar questions from the same domain.

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FAQ

Questions learners often ask

What does this MLS-C01 question test?

Modeling — This question tests Modeling — Read the scenario before looking for a memorised answer..

What is the correct answer to this question?

The correct answer is: Apply L2 regularization to the model. — L2 regularization (Ridge regression) penalizes large coefficients by adding a squared magnitude term to the loss function, which shrinks the model's weights and reduces variance without substantially increasing bias. This directly addresses the high-variance, low-bias symptom, making the model less sensitive to fluctuations in the training data.

What should I do if I get this MLS-C01 question wrong?

Identify which exam domain this question belongs to, review the core concept, then practise similar questions from the same domain.

What is the key concept behind this question?

Read the scenario before looking for a memorised answer.

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Same concept, more angles

2 more ways this is tested on MLS-C01

These questions test the same concept from different angles. Work through them to make sure you can recognise it however the exam phrases it.

Variation 1. A data scientist is building a regression model to predict house prices. The dataset contains 10 features, including 'number_of_bedrooms' and 'square_footage'. The scientist observes that the model has high variance. Which TWO actions are most appropriate to reduce overfitting? (Choose TWO.)

medium
  • A.Reduce model complexity by using a simpler model
  • B.Add L2 regularization to the model
  • C.Increase the number of training epochs
  • D.Decrease the amount of training data
  • E.Add more polynomial features

Why A: Options A and C are correct. Adding L2 regularization penalizes large weights, reducing variance. Reducing model complexity (e.g., using a simpler model) also reduces overfitting. Option B is wrong because adding more features increases complexity. Option D is wrong because increasing training epochs may lead to more overfitting. Option E is wrong because decreasing training data increases variance.

Variation 2. A data scientist is building a regression model to predict house prices. The dataset contains features like number of bedrooms, square footage, and location. After training, the model has high variance. Which technique should the data scientist use to reduce variance without significantly increasing bias?

hard
  • A.Use bagging
  • B.Increase the number of features
  • C.Apply L2 regularization
  • D.Use fewer training examples

Why C: Option D is correct because L2 regularization (Ridge) penalizes large coefficients, reducing variance while keeping bias low. Option A is wrong because increasing model complexity increases variance. Option B is wrong because removing features may increase bias. Option C is wrong because bagging reduces variance but may not be appropriate for all cases; regularization is more direct.

Last reviewed: Jun 24, 2026

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This MLS-C01 practice question is part of Courseiva's free Amazon Web Services certification practice question bank. Courseiva provides original exam-style practice questions with explanations, topic-based practice, mock exams, readiness tracking, and study analytics to help learners prepare for the MLS-C01 exam.