It was interesting to watch the leaving ceremony for the year 12's. It gives you a lot to think about for times where you are helping set up such an event and things that kids really need to do to make these events successful.
Firstly all kids need to feel included in the ceremony - not just the popular kids. Photo montages need to include everyone, memorable events need to cover the full spectrum of students academic, sporting, VET; dominant personalities need to celebrate and value the achievements of all, not just the popular few.
Perhaps we need to consider how we could create photo libraries for all years, mini yearbooks documenting events as they occur as part of the various handshaking ceremonies throughout the year.
There was a clear lack of thanks from the current year group. There was a brief thanks to all our teachers and then a celebration of all the events where misbehaviour had occurred and had perhaps caused embarrassment to students, the school or disrupted classes. This left a sour taste in the mouths of the senior teachers as a lot of effort had gone into getting this cohort over the line. Many have decided to give the graduation ceremony and dinner a miss. Maybe this is an indication that we need to focus on those that appreciate our efforts and that the efforts at 'inclusive' education have gone too far. Maybe students beliefs are right and we are not doing enough! I don't know but somehow I doubt that our efforts are best spent on students that perform at a very low level (even with all the help in the world) and take away time from students that could really use extra help. There needs to be further authority given to schools to move students that will not respond to learning opportunities to free up time for those ready. Perhaps it is just my utilitarian tendencies showing through.
When all graduate there is a clear diminishing of value placed on secondary graduation. With graduation rates of 80-100% and all students needing to continue school to year 12, graduation for many has limited worth. Many leave with little more knowledge than they had at year 10. It has diminished the achievements of those attempting TEE courses, there is little recognition of the difference in effort required. I feel for those that attempt TEE courses and get fails on their certificates due to external circumstance instead of taking the easy option and doing VET or alternate education courses.
Another clear transformation is the knowledge that these kids will probably communicate with their cohort for some time unlike any cohort from my time. The advent of Facebook and mySpace will mean that they can have instant communication with their cohort and an instant network to resolve issues and celebrate success. I don't know if this is a good thing as coming of age was about new times and new people, the removal of negative reinforcers and a new beginning.
The lack of concern of students for their TEE exams and the haphazard attitude to study borne through portfolio entry and low TEE scores is definitely to their detriment. The baptism of fire is now more dip in a warm pool. These students have managed to leave school without any anxiety of security and self worth - how will I support myself, what occupation can I do, how will I be worthy of my life partner, how will I be a valid contributor to society? Resilience is something borne of experience and these students lack any real concept of the difficulty of gaining true independence.
Saturday, October 25, 2008
Casio Classpad 330, Finding the mean and missing values
I posed the following question to my year 10's in order to continue our learning of the new calculator. It is an example of solving a problem where the mean is known but a value in the sample is not. "Q: A class had 5 students. Student results in the last test was {50,56,64,72,81}. Isabella joined the class and the new mean became 68. Did Isabella score higher than the old mean and what was her score?"
H: If the mean of {50,56,64,72,81} is less than 68 then Isabella has scored higher as a higher score by Isabella will raise the mean. Since we know the new mean (68) we can work out Isabella's score by working backwards.
Set up a working pane with a main application and a list editor. Title a column 'list1'. Add the 5 student results to the list editor.
Click in the main application and type mean(list1) using the soft keyboard. Hit the blue exe button. The answer is 64.6 .
A: The old mean 64.6 is less than 68 therefore Isabella has scored higher.
A: The old mean 64.6 is less than 68 therefore Isabella has scored higher.
To find Isabella's score click in the list editor and tap the next empty cell in list1. Press the x button. Click in the main application pane on the line that says mean(list1). Press the blue exe button.
This will return a sum to work out the mean of the list for values of and value of x i.e. (x+323)/6.
As we know the new mean alter the first line to read mean(list1)=68. Highlight the solution sum and tap Edit in the menu bar and then Copy. Paste the sum on the next line in the main application pane. Highlight the sum, tap Interactive on the menu bar, then tap Advanced on the sub menu and then tap solve. Tap ok at the base of the dialog box. The answer is x=85.
A: Isabella's test score was 85.
Click here for other CAS calculator articles
Labels:
CAS calculator,
mathematics,
teaching
Revisiting fractions
My 10D class has revisited fractions over the last week. For many fractions is like another language others have managed it in the past but have forgotten basic principles. The sequence I have used leading up to percentages of amounts is as follows
Drawing and identifying numerators and denominators
First exercise was identifying a variety of numerical fractions from pictorial form and then constructing pictorial fractions from numerical forms. We spent a lot of time looking at mixed numerals and converting between mixed numerals and improper fractions using pictorial means.
eg. for 3 2/3: draw 3 lots of 3 boxes with all boxes coloured and 1 lot of 3 boxes with two boxes coloured. When students counted the coloured boxes they had 11/3.
Investigating fractions of amounts
It seemed strange to do this here, but funnily enough it worked well as it established relevancy of the topic for many students. We started with a problem 3/4 of $24 is to be given to John and 1/4 to Mary.
I explained it as:
3/4 of 24 is: $6 per part (24/4)
I drew a box and split it into 4 equal parts (drawing attention to the denominator)
I put $6 in each box.
I coloured in three sections that represented John's portion
then counted $6 x 3 parts = $18 for John
I then repeated the same steps for Mary
1/4 of 24 is: $6 per part (24/4) then $6 x 1 part = $6 for Mary
We checked our answer to ensure all the money had been accounted for ($18+$6=$24). Students then completed a number of examples.
Investigating multiples and factors & Equivalent fractions
Next day we looked at multiples and factors. I explained this through examples, showing them examples of multiples and factors, then getting them to find the first five multiples for 2,3,4,7 and then the first five multiples for 2,3,5,7 over 100. After this they found factors of 10, 15, 24 and 42. We investigated patterns in factors (none greater than 1/2 the original valure other than itself, how it helped knowing your tables, factor pairs, 2 is always a factor for even numbers)
Students were then given a fraction wall and identified equivalent fractions in preparation for adding and subtracting fractions. The idea was put forward that fractions rely on parts to be equal otherwise the idea of equivalency would not be able to be used.
Adding and subtracting fractions
In the third lesson we looked at the problem of 1/3 + 1/2 using paper strips. The aim was to establish why equal parts is essential to an understanding of fractions. We used our fraction wall to look for equivalent fractions that allow us to add equal parts. After a few pictorial examples I started to show students how to use multiples and factors to assist in finding common denominators.
Next lesson we look at multiplying fractions...
Drawing and identifying numerators and denominators
First exercise was identifying a variety of numerical fractions from pictorial form and then constructing pictorial fractions from numerical forms. We spent a lot of time looking at mixed numerals and converting between mixed numerals and improper fractions using pictorial means.
eg. for 3 2/3: draw 3 lots of 3 boxes with all boxes coloured and 1 lot of 3 boxes with two boxes coloured. When students counted the coloured boxes they had 11/3.
Investigating fractions of amounts
It seemed strange to do this here, but funnily enough it worked well as it established relevancy of the topic for many students. We started with a problem 3/4 of $24 is to be given to John and 1/4 to Mary.
I explained it as:
3/4 of 24 is: $6 per part (24/4)
I drew a box and split it into 4 equal parts (drawing attention to the denominator)
I put $6 in each box.
I coloured in three sections that represented John's portion
then counted $6 x 3 parts = $18 for John
I then repeated the same steps for Mary
1/4 of 24 is: $6 per part (24/4) then $6 x 1 part = $6 for Mary
We checked our answer to ensure all the money had been accounted for ($18+$6=$24). Students then completed a number of examples.
Investigating multiples and factors & Equivalent fractions
Next day we looked at multiples and factors. I explained this through examples, showing them examples of multiples and factors, then getting them to find the first five multiples for 2,3,4,7 and then the first five multiples for 2,3,5,7 over 100. After this they found factors of 10, 15, 24 and 42. We investigated patterns in factors (none greater than 1/2 the original valure other than itself, how it helped knowing your tables, factor pairs, 2 is always a factor for even numbers)
Students were then given a fraction wall and identified equivalent fractions in preparation for adding and subtracting fractions. The idea was put forward that fractions rely on parts to be equal otherwise the idea of equivalency would not be able to be used.
Adding and subtracting fractions
In the third lesson we looked at the problem of 1/3 + 1/2 using paper strips. The aim was to establish why equal parts is essential to an understanding of fractions. We used our fraction wall to look for equivalent fractions that allow us to add equal parts. After a few pictorial examples I started to show students how to use multiples and factors to assist in finding common denominators.
Next lesson we look at multiplying fractions...
Labels:
fractions,
mathematics,
teaching
Thursday, October 23, 2008
Recharging students for success in mathematics
Being in a low socio-economic school sometimes is disheartening. The students don't believe that they are able to achieve academically. This is reinforced by parents, teachers and the school in subtle ways throughout the year.
A parent complains that the student is only doing lower maths and does not need a $175 calculator. The timetable allows many non-TEE subject to run, but only a few TEE subject selections are available. Portfolio entry is seen as a primary pathway to university rather than a backdoor entry for extreme cases. Lower school programmes lack the rigour of programmes in more academic schools. A single student or groups of students can disrupt classrooms for an entire year, but little coordinated effort can be made to limit the damage being caused. The idea of secondary graduation is diminished by the idea that 'anyone' can graduate. Cohorts of students are labelled challenging and good students lose opportunities as classes are aimed to manage the lower students and keep them engaged to detriment of academic achievement by top students.
Charging academic students for success is a mentality that must be driven - it doesn't just happen. Kids need to be told that they have the ability to succeed, shown possible outcomes, be given opportunity to try/fail/succeed and be mentored as they go along. Setting clear standards sets the groundwork for success.
Things that I consider serious issues in my A class:
Things that I do to promote positive attitudes towards mathematics and address issues:
A parent complains that the student is only doing lower maths and does not need a $175 calculator. The timetable allows many non-TEE subject to run, but only a few TEE subject selections are available. Portfolio entry is seen as a primary pathway to university rather than a backdoor entry for extreme cases. Lower school programmes lack the rigour of programmes in more academic schools. A single student or groups of students can disrupt classrooms for an entire year, but little coordinated effort can be made to limit the damage being caused. The idea of secondary graduation is diminished by the idea that 'anyone' can graduate. Cohorts of students are labelled challenging and good students lose opportunities as classes are aimed to manage the lower students and keep them engaged to detriment of academic achievement by top students.
Charging academic students for success is a mentality that must be driven - it doesn't just happen. Kids need to be told that they have the ability to succeed, shown possible outcomes, be given opportunity to try/fail/succeed and be mentored as they go along. Setting clear standards sets the groundwork for success.
Things that I consider serious issues in my A class:
- Not being quiet and ready to start work within 2 minutes of entering the room
- Being late for class and not entering the room quietly
- Complaining, whining and whinging before attempting work
- Not paying attention when instruction is given
- Relying on friends or personal attention of the teacher for instruction rather than some level of personal investigation
- Not attempting homework
- Failing a test or assignment ( lower than 1 standard deviation from mean)
- Not seeking assistance when required
Things that I do to promote positive attitudes towards mathematics and address issues:
- Look for opportunities to congratulate students on achievement
- Attempt to talk to each student each class
- Allow friendship groups to remain together only when learning is occurring
- Ensure that new topics include new material
- Promote the A class as being a privilege and a responsibility
- Reinforce that attitude is as important as aptitude
- Change the difficulty level regularly to allow for opportunities for success/failure and stretching of the mind.
- Question their own beliefs of their ability and remind them of progress made
- Use personal experiences to enhance class material
- Focus the basis of enjoyment in mathematics in achievement rather than entertainment by the teacher (though the converse may be more important in lower classes)
- Encourage students to self monitor behaviour and provide peer feedback
- Create opportunities for students to see the different rapport with yr 11/12 TEE students than with yr 10 students
Labels:
mathematics,
success,
teaching
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