This is a level 3 activity from the Figure It Out series.
A PDF of the student activity is included.
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Statistical thinking involves the exploration and use of patterns and relationships in data. There are four key processes:
In these activities, the students explore data related to the durability of plastic bags.
2 types of plastic bags
twine
In these activities, students interpret the results of a statistical investigation and then conduct a similar investigation themselves. For their investigation, have them discuss and then apply the PPDAC statistical enquiry cycle: problem, plan, data, analysis, conclusion. (See www.census@school.org.nz)
It can be hard to see a pattern within a list of numbers, but when the information is displayed as a dot plot, patterns within the data are revealed. A dot plot shows how the data is grouped and whether there are any outliers.
Understanding variation is central to the development of statistical thinking. Variation occurs in every aspect of life: the amount of cereal in a bowl, the time it takes to get to school, the weather. Most students will have an intuitive understanding of variation. They will understand, for example, that not all 10-year-olds are exactly the same height. Whatever the source of the data, some variation is to be expected. It would be unusual if all the bags in the investigation had ripped at the same time unless this was the result of extreme weather.
Although variation is to be expected, it can be useful to compare the amount of variation within two data sets. For example, there is greater variation in the supermarket bag data than in the bin liner data. This tells us that the bin liners were more consistent in durability than the supermarket bags. (Note that, in reality, we would want a much larger sample before making such comparisons.)
Outliers are data values that are significantly smaller or larger than the rest of the data. When analysing data, it is important to treat outliers with care. It can be tempting to dismiss them as abnormalities, but an examination of outliers can provide useful information. Points to consider in this example include:
It is important to keep in mind the purpose of the investigation. Isabella and Eseta investigated one aspect of the bird scarers, namely, their durability. The question they posed informed the way they set about gathering data. Discuss with the students how they could gather data related to other attributes of effective bird scarers.
See Chilling Out in Measurement, Figure It Out, Level 4+, for an activity involving students making an anemometer and measuring wind speed. See also Wind Chill in Energy, Figure It Out, Levels 3+–4+.
Related information:
By learning how to interpret statistical information, students are developing the key competency using language, symbols, and texts.
Suggesting adaptations for products or objects is a useful exercise for students, as imagination and creativity are required.
People often use objects and materials in creative and new ways. They recognise that the performance properties of a particular object may be suitable to solve a different problem or meet a new need. This could save time and money and could even benefit the environment.
1. a.
b. i. The bag that lasted the longest was a supermarket bag. However, if we ignore this bag and the bin liner that only lasted 2 days, it does seem that, overall, the bin liners lasted a bit longer than the supermarket bags.
ii. The statement is true. The worst bin liner only lasted 2 days, and all the supermarket bags lasted longer than this.
c. Answers will vary depending on how much notice you take of the ones that are different from most of the rest – the best supermarket bag (15 days) and the worst bin liner (2 days). Overall, bin liners were stronger and there was less variation in how long they lasted. There was much more variation in the supermarket bags and, apart from the 15-day one, they lasted fewer days.
2. a. The supermarket bag that lasted 15 days is an outlier because it lasted so much longer. The bin liner that only lasted 2 days could also be an outlier. Perhaps it was faulty.
b. Answers will vary. Isabella and Eseta might choose to ignore the bag that lasted 15 days on the grounds that it was unusually strong, and therefore not typical. But the experiment didn’t use many bags, so the outliers may not be as unusual as they look. (In other words, if they had trialled a lot more bags, they would have had a clearer picture.)
1. a. Practical activity
b. Other factors besides strength might include noise, movement, whether the bags get easily tangled, or their position on the pole (it might be windier at the top). (You might also want to check that you only choose bags that don’t already have a hole in the bottom of them.)
c. Decisions will vary.
Printed from https://nzmaths.co.nz/resource/bird-scarers at 2:15pm on the 7th May 2024