Stats for students: Simple steps for passing your statistics courses

Stats of studentsTheory of statistics

  • The first years that you follow statistics, it is often a case of taking knowledge for granted and simply trying to pass the courses. Don't worry if you don't understand everything right away: in later years it will fall into place and you will see the importance of the theory you had to know before.
  • The book you need to study may be difficult to understand at first. Be patient: later in your studies, the effort you put in now will pay off.
  • Be a Gestalt Scientist! In other words, recognize that the whole of statistics is greater than the sum of its parts. It is very easy to get hung up on nit-picking details and fail to see the forest because of the trees
  • Tip: Precise use of language is important in research. Try to reproduce the theory verbatim (ie. learn by heart) where possible. With that, you don't have to understand it yet, you show that you've been working on it, you can't go wrong by using the wrong word and you practice for later reporting of research.
  • Tip: Keep study material, handouts, sheets, and other publications from your teacher for future reference.

Formulas of statistics

  • The direct relationship between data and results consists of mathematical formulas. These follow their own logic, are written in their own language and can therefore be complex to comprehend.
  • If you don't understand the math behind statistics, you don't understand statistics. This does not have to be a problem, because statistics is an applied science from which you can also get excellent results without understanding. None of your teachers will understand all the statistical formulas.
  • Please note: you will have to know and understand a number of formulas, so that you can demonstrate that you know the principle of how statistics work. Which formulas you need to know differs from subject to subject and lecturer to lecturer, but in general these are relatively simple formulas that occur frequently and your lecturer will tell you (often several times) that you should know this formula.
  • Tip: if you want to recognize statistical symbols you can use: Recognizing commonly used statistical symbols
  • Tip: have fun with LaTeX! LaTeX code gives us a simple way to write out mathematical formulas and make them look professional. Play with LaTeX. Wit that, you can include used formulas in your own papers and you learn to understand how a formula is built up – which greatly benefits your understanding and remembering that formula. See also (in Dutch): How to create formulas like a pro on JoHo WorldSupporter?
  • Tip: Are you interested in a career in sciences or programming? Then take your formulas seriously and go through them again after your course.

Practice of statistics

Selecting data

  • Your teacher will regularly use a dataset for lessons during the first years of your studying. It is instructive (and can be a lot of fun) to set up your own research for once with real data that is also used by other researchers.
  • Tip: scientific articles often indicate which datasets have been used for the research. There is a good chance that those datasets are valid. Sometimes there are also studies that determine which datasets are more valid for the topic you want to study than others. Make use of datasets other researchers point out.
  • Tip: Do you want an interesting research result? You can use the same method and question, but use an alternative dataset, and/or alternative variables, and/or alternative location, and/or alternative time span. This allows you to validate or falsify the results of earlier research.
  • Tip: for datasets you can look at Discovering datasets for statistical research


  • For the operationalization, it is usually sufficient to indicate the following three things:
    • What is the concept you want to study?
    • Which variable does that concept represent?
    • Which indicators do you select for those variables?
  • It is smart to argue that a variable is valid, or why you choose that indicator.
  • For example, if you want to know whether someone is currently a father or mother (concept), you can search the variables for how many children the respondent has (variable) and then select on the indicators greater than 0, or is not 0 (indicators). Where possible, use the terms 'concept', 'variable', 'indicator' and 'valid' in your communication. For example, as follows: “The variable [variable name] is a valid measure of the concept [concept name] (if applicable: source). The value [description of the value] is an indicator of [what you want to measure].” (ie.: The variable "Number of children" is a valid measure of the concept of parenthood. A value greater than 0 is an indicator of whether someone is currently a father or mother.)

Running analyses and drawing conclusions

  • The choice of your analyses depends, among other things, on what your research goal is, which methods are often used in the existing literature, and practical issues and limitations.
  • The more you learn, the more independently you can choose research methods that suit your research goal. In the beginning, follow the lecturer – at the end of your studies you will have a toolbox with which you can vary in your research yourself.
  • Try to link up as much as possible with research methods that are used in the existing literature, because otherwise you could be comparing apples with oranges. Deviating can sometimes lead to interesting results, but discuss this with your teacher first.
  • For as long as you need, keep a step-by-step plan at hand on how you can best run your analysis and achieve results. For every analysis you run, there is a step-by-step explanation of how to perform it; if you do not find it in your study literature, it can often be found quickly on the internet.
  • Tip: Practice a lot with statistics, so that you can show results quickly. You cannot learn statistics by just reading about it.
  • Tip: The measurement level of the variables you use (ratio, interval, ordinal, nominal) largely determines the research method you can use. Show your audience that you recognize this.
  • Tip: conclusions from statistical analyses will never be certain, but at the most likely. There is usually a standard formulation for each research method with which you can express the conclusions from that analysis and at the same time indicate that it is not certain. Use that standard wording when communicating about results from your analysis.
  • Tip: see explanation for various analyses: Introduction to statistics
Related content or attachment:
Hoe maak je formules als een pro op JoHo WorldSupporter?

Hoe maak je formules als een pro op JoHo WorldSupporter?

JoHo WorldSupporter kan formules tonen die in LaTeX zijn geschreven. LaTeX code geeft een simpele manier om mathematische formules uit te schrijven en er professioneel uit te laten zien.

Aan de slag met LaTeX

Een snelle introductie voor beginners:

Een handige startplek voor gevorderden:

LaTeX integratie op JoHo WorldSupporter

De geschreven LaTeX code wordt door JoHo WorldSupporter herkend als code (en niet als tekst) door de formule te openen met:


en te sluiten met:



Een voorbeeld:

LaTeX code:


Auteur schrijft:


JoHo WorldSupporter toont:


LaTeX codes voor veelgebruikte formules

Hieronder vind je een paar veelgebruikte formules binnen de statistiek en hun opbouw in LaTeX. Kan je de verschillende elementen herkennen in de code die terugkomen in de formule?

Tip: lopen de letters in elkaar over? Zoom dan even uit.

NaamLaTeX codeFormule
z-score\[\text{z = \frac{(x - \mu)}{\sigma}}\]\[z = \frac{(x - \mu)}{\sigma}\]
standaarddeviatie\[\text{\sqrt{N\cdot p\cdot q}}\]\[\sqrt{N\cdot p\cdot q}\]
standaarddeviatie\[\text{σ= \sqrt {\frac{\sum {(x-μ)^{2}}}{N}}}\]\[σ= \sqrt {\frac{\sum {(x-μ)^{2}}}{N}}\]
Chi kwadraat\[\text{x^2=\sum\frac{(O-E)^2}{E}}\]\[x^2=\sum\frac{(O-E)^2}{E}\]
Speaman's correlation\[\text{\rho = r_s = 1 - \frac{6\sum{d^2_i}}{n(n^2-1)}}\]\[\rho = r_s = 1 - \frac{6\sum{d^2_i}}{n(n^2-1)}\]
Regressie analyse\[\text{Y = a + bX + e}\]\[Y = a + bX + e\]
Multipele regressie\[\text{y = b_0 + b_1 x_1 + b_2 x_2 + ... + b_p x_p}\]\[y = b_0 + b_1 x_1 + b_2 x_2 + ... + b_p x_p\]
Adjusted R2\[\text{adjusted\:R2=1-\frac{(1-R2)(N-1)}{N-p-1}}\]\[adjusted\:R2=1-\frac{(1-R2)(N-1)}{N-p-1}\]

Contact opnemen met JoHo WorldSupporter

Vond je deze blog nuttig? Wil je eigengemaakte formules laten zien? Of zijn er dingen niet helder? Laat een berichtje achter bij deze blog, dan komen we daar graag op terug.

Alvast hartelijk dank!

Discovering datasets for statistical research
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