A little about Central Limit Theorem

All A-level students should know that when you have a non-normal distribution and a sufficiently large sample size n, we can approximate it to a normal distribution.

$X \sim N(\mu , {\sigma}^{2})&s=3$
$\bar{X} \sim N(\mu , \frac{{\sigma}^{2}}{n})&s=3$

So what happens here? Why is such an approximation even legit or allowed? It sounds so loose.

This link contains a simple simulation that allows students to observe what happens when n gets larger. And if you play with it a bit, you may realise that the distribution will tend to that of a normal distribution. This makes some intuitive sense, if we actually are capable of getting more and more n, our distribution should get more and more accurate.

About

KS Teng

KS has been teaching H2/H1 Mathematics and IB mathematics for the more than 10 years. Having taught students from all various Junior Colleges, KS adapts to students' abilities and help them better understand the topics. As someone who loves to teach mathematics and sees it as a truly useful tool in life, KS seeks to enable students to appreciate math. Therefore, his tuition mission is to motivate and cultivate students to be independent and confident thinkers.

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A little about Central Limit Theorem

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