ICT Integration: So how did it go?

May 6, 2010 Leave a comment

Snake, Bye

I tried out this ICT task in class the today. The following are some notes on how it went and changes I would make.

  • Engagement – Students were quite excited by how the task was introduced. I made a reference to schoolies week (and the connection that had to accommodation options on the Gold Coast) which gained their attention. A few students had heard of the Q1 building and at least a few students were familiar with its status as the worlds tallest residential building and Australia’s tallest building. They also were energised as I suggested that the textbook exercises they had been doing were simply the same question, with cosmetic changes, ad nauseum. When I explained that they could actually work out the heights of structures in Google Earth by measuring the length of their shadows, a number of students were audibly excited by the prospect. So far so good.
  • On-task / Off-task – Roughly half the class was primarily engaged in on-task behaviour throughout the lesson. For the rest, any small hurdles to overcome quickly resulted in off-task behaviour. Some problems and attempted solutions are included;
    • Inexplicably, some student’s accounts didn’t have Google Earth installed (although it is meant to be on every student account). This was relatively easy to deal with as they were working in pairs and having the other student log in usually sorted this out. If not, I was able to log the students in on my account.
    • No internet credit. Yes, unfortunately the college I am placed at charges students for their internet access. I feel strongly about this inequity and had suggested to students before the task if they weren’t happy to use their own quota, I would log them in. This wasn’t an issue but it chewed through a little bit of time.
    • Uncertainty about how to calculate heights. Some of the weaker students struggled to calculate scale factors, let alone apply them. I directed these students to a modeled example on the whiteboard and asked them to query me again if they were still unsure. Using an IWB in this situation would have been great.

All of these small issues rapidly resulted in off-task behaviour such as checking email. re-skinning their student portal page, or searching for the house they were partying at one the weekend.

For next time ….

If I were to run this task again I would make sure I could get access to a room with an IWB or data projector such that I could model the task. Presenting a series of escalatingly challenging problems as a guided lesson with modelling at each step may have helped to reduce off-task behaviour and student engagement. This would not necessarily detract from the exploratory nature of the task as some time could be left for more open ended task, after the guided tasks were completed. Students would also be better equiped to deal with an open exploration and more comfortable working in the Google Earth environment.

Despite the issues I experienced, I would definitely teach this lesson again. Those students who engaged with the task were enjoying themselves whilst doing maths problems (a major breakthrough for some students) and I feel they satisfied the learning objectives (though I did not assess this formally). Improvements in classroom management, and structuring the task to give students greater direction would allow a greater fraction of the class to enjoy and gain understanding from the lesson. As previously stated, an IWB or computer with a data projector would have been a useful tool such that I could model tasks and capture student attention when required.

ICT Integration: Potential problems

May 5, 2010 3 comments

Error message

My mentor teacher suggested that he hated “computer classes” citing classroom management and on-task behaviour as the major reasons. In his experience, students are all too likely to spend their time surfing the internet, reading emails, or trying to bypass filters to access their Facebook accounts. This issue is real and if not managed, can lead to such a lesson becoming a waste of time, with minimal work completed by students, and no learning objectives met.

Fortunately, the physical layout of the computer lab I will be using will assist. The computers are on benches lining two adjacent walls of the room (in an L shape) such that the screens can all be seen at a glance, from a central position. I think that students will be willing to stay on task as it represents a break from the at-times monotonous task of mathematics book-work. As Yr12 students, I am able to speak frankly with the class on an adult level. They know what the learning objectives are, and know that in general, the tasks I set will help them accomplish them.

Another major concern is that students are simply not used to this style of learning and will have difficulty engaging with the task due to the medium. Survey data from the Australian Communications & Media Authority (ACMA) (2009) shows that 16-17 year old student (roughly the age of students in my class) use the internet primarily for socialising, recreation and entertainment. Will they be able to focus on the task when interacting with what they may consider an entertainment device?

Access to technology is an issue. Although the classroom I regularly teach in does contain almost roughly 20desktop computer, it unfortunately does not have an IWB. Gaining access to a room with both at an appropriate time may be an issue. Not having the IWB restricts my ability to model tasks and I must rely on a regular whiteboard and verbal instructions. Will it fly?


Australian Communications & Media Authority (ACMA). (2009). Click & connect: Young Australian’s use of online social media. 02: Quantitative research report. Sydney: Commonwealth of Australia. Retrieved from ACMA website: http://www.acma.gov.au/webwr/aba/about/recruitment/click_and_connect-02_quantitative_report.pdf

ICT Integration: Why use Google Earth?

May 4, 2010 1 comment

Google God?

Why ICT?

It is increasingly important for students to gain exposure to computer use as part of their mathematics education. This statement is reflected in the Board of Senior Secondary Studies (2009) unit outline, which states that “Technology, its selection and appropriate use, is an integral part” of students mathematical achievement, and that “computational fluency” is an essential skill inherent in mathematics. Further, evidence suggests that students who regularly use computers in an educational content have better assessment outcomes (O’Dwyer et al. 2008)

In mathematics education, technology has long played a role (in terms of calculators and spread sheets) however, as the wealth offered by ICT swells, so must its incorporation into mathematics lessons increase. Goos et al. (2003) have proposed a model for ICT integration into mathematics education in terms of a series of metaphors of student and teacher relationships with technology. Namely,

Technology as;

  • master
    • occurs when users have only a limited limited abilities with the technology
    • students may not lack mathematical understanding to make sense of computer generated content or output
  • servant
    • technology as an efficiency tool.
    • replaces pen and paper calculations but doesn’t change the nature of the task
  • partner
    • creative uses of technology provide new kinds of tasks or new ways of approaching existing tasks
    • allows exploration of different perspectives and allows deeper understanding
  • an extension of self
    • freedom afforded by an expert command of technologies
    • permeates all facets of pedagogy and student learning approaches

I believe that this task represents a partnership with technology. The reformulation of the task to the Google Earth environment is not merely cosmetic but further, allows a new way of engaging with the problem and the course content. Although the task is structured, it allows some open exploration which will afford a deeper understanding of the mathematical concepts and their application.

Why Google Earth?

Google Earth is gaining recognition as an educational tool (see for example RealWorldMath.org, Google Earth Lessons, or Designing and Creating Earth Science Lessons with Google EarthTM) and rightly so. The combination of an enormous dataset combined with an easily navigable visualisation environment, has made Google Earth a popular option for science and geography teachers wanting to integrate ICT into their lessons. Increasingly, mathematics teachers are using Google Earth’s built in ruler and protractor as tools to engage students in their learning of topics such as mensuration, coordinate geometry, plane geometry and trigonometry. I was however, surprised that I was unable to find any mention of lessons using Google Earth in a ‘shadow reckoning’ task such as the one described here.Google Earth ruler toolbox

The ruler tool allows students to quickly measure the length and true bearing of real world objects from their photos captured in Google Earth objects. Using the Google Earth ruler is valuable in itself as it provides experience using yet another tool for measurement, but further it models conventions of measurement such as units and significant figures. The opportunity for learning from the instant feedback given by computer-based tools such as this is noted by Goos, Stillman and Vale (2007)

The constant necessity for zooming in and out also gives students exposure to concrete examples of scaling and similar figures

The range of visualisation tools provides opportunities for students to view the problem from a number of perspectives and affords exploration and reformulation of the question into a form which is more intuitive for them.

An example is the inclusion of 3D buildings with Google Earth. This provides students the option of seeing the problem as it conventionally presented in terms of a horizontal view. Note, I have overlayed the ghosted-yellow right-triangle as a representation of the geometric visualisation that must occur in students’ minds such that they can formulate an approach to the problem. This direct visualisation aid is not available to students in contrast to the traditional formulation of this question as discussed in another post. Google Earth shadow reckoning


Board of Senior Secondary Studies (BSSS). (2009). Mathematical Applications unit outline. Retrieved from the BSSS website: http://www.bsss.act.edu.au/__data/assets/word_doc/0019/123319/Mathematical_Applications_T_08­12_v2.doc

Goos, M., Galbraith, P., Renshaw, P. & Geiger, V. (2003). Perspectives on technology mediated learning in secondary school mathematics classrooms. Journal of Mathematical Behavior, 22, 73-89

Goos, M., Stillman, G. & Vale, C. (2007). Teaching secondary mathematics: Research and practice for the 21st century. Crows Nest, Australia: Allen & Unwin.

O’Dwyer,L,.M., Russell,M.,  Bebell,D. & Seeley,K. (2008). Examining the Relationship between Students’ MathematicsTest Scores and Computer Use at Home and at School.  The Journal of Technology, Learning, and Assessment. 6, 5, pp. 1-45.

ICT Integration: Justifying the task

May 3, 2010 1 comment

Shadow reckoning

Mathematical justification

The use of ‘shadow reckoning’ to determine the height of an unknown object based on simultaneous measurements of the length of its shadow and that cast by an object of known height is a classic textbook question found in almost all textbooks on applied  geometry. The technique apparently dates back to the 6th century BC when the Ancient Greek philosopher, Thales of Miletu, is said to have used this method to measure the height of the Great Pyramids (Swetz, 1994).

The selection of various incarnations of this problem depicted in the header graphic and the image below suggest not much has changed since then.

Chinese shadow reckoning

Problem Solving?

In all of these classic examples, the information is presented to the student in the same format; a side-on view clearly depicting a pair of similar triangles.

Whilst this may not immediately seem like an issue, this formulation of the question precludes students from engaging in any true problem solving. In mathematics, the crux of problem solving is identifying or creating techniques which can be used obtain the desired outcome. Once a method has been determined, everything else is merely mechanical. Yet, in the classic problems (see again, the header picture above) students are presented with a ‘problem’ scenario overlaid with two geometrical figures, a pair of similar triangles. Combine this with the fact that the question is likely found in the imaginatively titled “Problem Solving” section of the “Similar Triangles” chapter, it would take a remarkable student to ignore all the prompts for an appropriate method to solve the problem.

Using Google Earth as an alternative environment for this problem will not address the latter issue. That is, most students will realise that an exercise placed at the end of a week of lessons regarding similar triangles will likely be related to similar triangles. Yet the question of which triangles is left unanswered and students are required to formulate the real world problem into a mathematical problem for themselves, an importnat skill.

Further, this objection goes to the core of geometry as an abstract form of thinking and reasoning. The geometer deals with triangles, not made of steel, brick or wood, but of imagination. Lines have zero thickness, points are of zero size, and triangles emerge between any three points the geometer care to imagine. The visual representation of this problem given to students (a horizontal cross section, does not require imagination, or abstraction, the triangles are on the page and not in the mind. It is linking the abstractions of geometry to solid, real-world situations which we should celebrate as problem solving, not turning the crank on a pre-prepared exercise.

Learning in Geometry

Models of learning in geometry are largely based on the concept of van Hiele levels, loosely analogous to Piaget’s stages of cognitive developments. The van Hieles, were contemporaries and colleagues of Piaget and their work is similarly, a foundation for constructivist approaches to learning in the area of geometry. Pierre van Hiele (1999) has criticised teaching of geometry in schools as it is structured and presented in a way baed on axioms, theorems and other such generalisations. This approach necessarily assumes that students are operating at a formal deductive level (c.f. Piaget’s formal operations stage) yet many students lack foundational understandings about geometry that is achive through play, exploration and interaction with real-world geometric objects (Crowley, 1987). I would argue that although exploring geometrical objects using computer software lacks the tangibility of blocks or cardboard shapes, yet students’ use of computers, mobile phones and iPods has made the manipulation of objects through their depiction on a screen an everyday, ‘real-world’ experience. This task based in ‘Google Earth’ will give students an opportunity to explore real-world geometry.


Crowley, M. L. (1987). The van Hiele Model of the Development of Geometric Thought. In M.Montgomery Lindquist (Ed.) Learning and Teaching Gemretry, K­12, 1987 Yearbook of the National Council of Teachers of Mathematics, (pp.1­16). Reston, Va.: National Council of Teachers of Mathematics.

Swetz, F. J. (1994). Learning activities from the history of mathematics. Portland, ME: J. Weston Walch

van Hiele, P.M. (1999). “Developing Geometric Thinking through Activities That Begin with Play.” Teaching Children Mathematics,  6, 310–316.

ICT Integration: Learning outcomes

May 3, 2010 1 comment

Earth

This teaching episode falls within a unit of teaching for a Year 12 Mathematical Applications class.  The unit “MA Financial Modelling and Trigonometry” includes a four-five week segment focusing on the content areas of ratio & proportion, and applications of geometry and trigonometry.

The ‘specific unit goals’ related to this content area are reproduced below from the Board of Senior Secondary Studies unit outline (BSSS, 2009).

This unit should enable students to:

  • apply an understanding of ratio and proportion to practical situations
  • apply geometric and trigonometric procedures in real-life contexts

Further, the teaching guidelines for this content area explicitly calls for a  Focus on applications of the techniques in contexts where direct measurement is not feasible e.g. shadow reasoning” (BSSS,2009)

This task and supporting teaching episode clearly falls within the scope of this scope and appropriately support students achievement of the unit goals.

Specifically, this task is designed such that by the end of the lesson, students should be able to;

  • Make measurements using software-based tools when direct measurement is not possible
  • Calculate the height of unknown objects using a ‘shadow reckoning’ method.
  • Identify opportunities to apply knowledge of similar triangles to solve problems.
  • Interpret information from a ‘top-down’ graphical representation and represent it in a more conventional geometrical setting.

This lesson will go towards building the skills described in the BSSS(2009) unit outline (relevant skills are reproduced below)

  • Mensuration
    • employ appropriate techniques and a variety of technologies, tools and formulae to determine measurements in various contexts to suitable degrees of accuracy
  • Computational fluency
    • confidently use computational technology
    • employ efficient and accurate methods of calculation
  • Problem solving
    • formulate different kinds of mathematical problems by various means – including extensions of existing problems
    • apply and adapt a variety of strategies to solve problems
  • Communication
    • communicate their mathematical thinking coherently and clearly to peers, teachers and others
    • use appropriate representations to express their mathematical ideas precisely.

Board of Senior Secondary Studies (BSSS). (2009). Mathematical Applications unit outline. Retrieved from the BSSS website: http://www.bsss.act.edu.au/__data/assets/word_doc/0019/123319/Mathematical_Applications_T_08­12_v2.doc

ICT Integration: Description of teaching episode

May 2, 2010 1 comment

Gold coast panorama

This entry will provide a description of a teaching episode designed for a Year 12 Mathematical Applications class. The teaching is focused on similar figures and scale factors, and their applications, mainly in mensuration. The task I will describe provides an opportunity for students to engage in a task designed to allow a series of guided investigations using computer software.

Specifically, students will be using measurement tools in the Google Earth software package to determine heights of buildings based on the lengths of the shadows that they cast. In this kind of mathematical problem, an object of known height is necessary (typically a meter stick or a persons height is used).

In this task, the known height is that of the Q1 buliding, Australia’s tallest building, and the tallest residential building in the world (according to wikipedia) however any known building or structure height (possibly near by the school) could be used. I chose this building for a number of reasons.

  • It has that ‘Guinness Book ‘ feel to it and is relatively well known.
  • The link between the Gold Coast, apartment accommodation, and ‘Schoolies Week’ (which is fast approaching) makes this task thematically interesting for students.
  • Information on the height of the Q1 building is readily available on the internet
  • The Q1 building is available to view as a ‘3D Building’ in Google Earth
  • This geographical area features a high density of high-rise structures with clear, obscured shadows cast onto relatively flat ground.

Google Earth screenshot

As seen in the screen capture above, the necessary features (shadow lengths) are clearly visible and relatively well defined.

The teaching episode will take place in a one hour lesson at the end of a unit on similar triangles. I will revise the theory and model a problem on the board (unfortunately I don’t have access to an IWB for this lesson, which would be ideal), after which students will be working in small groups on computers to solve a series of problems which have been set, and to create and solve some problems of their own. Students will be encouraged to extend this method to measure objects of interest to them. Suggestions of buildings around the college, monuments in Canberra, and a tower in a local shopping centre will be made but are suggestions for the unimaginative and not strict guidelines. Students will be encouraged to communicate their ideas to me and their peers via a table on the board, where the height of various objects are tabulated.

Research Summary 3: Teacher PD in ICT

April 5, 2010 1 comment

bash shell

That teacher quality is a major influence on student learning is generally accepted (ACER, 2005; ACT DET, 2009). Beyond pre-service training and previous education, continuing professional development (PD) is one of the major tools available to influence teacher quality. PD is a successful instrument to implement educational reform and importantly, improve student outcomes (CCA, 2008; QLD DET, 2010; Robinson, 2008). The rapid pace of change which typifies the ICT landscape, combined with the huge potential afforded by truly engaging with the technologies makes ICT-related PD a critically important element of curriculum reform.

The broad aim of this review is “to find out why it is that, despite considerable resources being dedicated to developing the use of ICT in schools in recent years, there is a lack of impact on teachers’ everyday practice”(Becta, 2009. p.4). Of particular interest is the shift from away from PD for re-tooling towards a pedagogical focus, and challenges in implementing such change. Where appropriate, I have written with a focus on recent developments in Australia.

Is there a problem?

The issue of ICT teacher PD in Australia is very current due to new education reform policy relating to ICT, the so-called Digital Education Revolution (DER). The recent announcement of $40 million funding for a ‘Digital Strategy for Teachers and School Leaders’ is an indication that PD will be used as an instrument to effect change in teaching practices to support implementation of the DER policy (DEEWR, 2010; Gillard, 2010). The trends in teacher ICT use warrant this action, as according to 2008 survey results only 28% of Australian primary and secondary teachers are making effective use of ICT (Black, 2008; education.au, 2008a,b,c). This disappointing statistic is attributed to “a lack of investment in providing teachers with the techniques and strategies to use computers in their classrooms (Black, 2008)” and as such, Gillard’s announcement is, broadly speaking, an informed response to policy advice.

Challenges in ICT PD

There are numerous challenges in providing teachers with effective PD which are peculiar to ICT and it’s implementation in the classroom. Superficial issues such as lack of time and ease of access to technology are frequently cited, despite the emphasis on access to hardware that has been observed over the past decade (Becta, 2009; Strategic ICT Advisory Service [SICTAS], 2009). Further, due to the fast pace of change in ICT and students’ rapid adoption rates, there is a perception that teachers are being left behind (SICTAS, 2009).

The flurry of activity to address this perceived skills deficit has failed on a number of fronts. Firstly, the typical model for PD through infrequent, one-off courses, is inadequate for mastery of new skills (Becta, 2009; SICTAS, 2009). Secondly, and of fundamental concern, is that a re-tooling approach to ICT PD simply misses the point (Becta, 2009; Prestridge, 2010; SICTAS, 2009): “The separation of how to use the technology in education from why it should be used is a major issue” (SICTAS, 2009, p.21). In the rush to ensure teachers are keeping up with students, administrators have neglected pedagogical concerns despite the fact that is “very evident that a focus on skills is not sufficient to help teachers to develop their pedagogy” (Becta, 2009, p.6). These issues are compounded by negative teacher attitudes towards technology and change (Phelps & Graham, 2008; SICTAS, 2009).

Where do we go?

If our definition of effective use of ICT by teachers is that of transforming practice to engage students in new ways (education.au, 2008a), then surely our model for PD must reflect this. The features of successful or idealised models of ICT PD all centre around a “move from ‘re-tooling’ with infrequent curriculum integration to a model that will enable teachers to see the ‘transforming’ possibilities of ICT” (Prestridge, 2010, p.252), promoting a introspective profession focused on pedagogical concerns.

To achieve this, PD must be continuous, necessitating a rethink of our current short-course approach to PD provision (SICTAS, 2009). The claim that “teachers need to be at the centre of their own learning if they are to change their deep-seated beliefs and habits regarding the use of technology” (Becta, 2009, p.6) forms a common theme (MacDonald, 2008; Prestridge, 2010; SICTAS,2009). MacDonald (2008) notes that 90% of teachers cite colleagues as their primary source of professional learning, in developing his argument for a collaborative, collegial approach to PD; another common theme (Becta, 2009; Prestridge 2010; SICTAS,2009). A range of models have been suggested, including; the Community of Practice (MacDonald, 2008); pre-service/in-service teacher mentoring dyads (Robertshaw, Leary, Walker, Bloxham, & Recker, 2009); students acting as teacher PD mentors (Ingham, 2008); and collaborative groups using ICT (Prestridge, 2010; Robinson, 2008).

I see great value in the Communities of Practice (CoP) model discussed by MacDonald (2008), arguing for the development of “persistent, sustained social network[s] of individuals who share and develop an overlapping knowledge base, set of beliefs, [and] values” (MacDonald, 2008, p.430). This model ticks all the boxes; it is by definition collaborative; focused on teacher needs; and ongoing.  CoP encourages teacher reflection, a vital component of engaging with pedagogical (not just skill-based) concerns. MacDonald also highlights the benefits of a synergistic relationship between education researchers and teachers working together in a CoP. This model promotes the idea that PD facilitators (or education researchers) form a vital part of a CoP, with heightened importance at the inception, asking probing questions to give direction, yet not taking ownership of learning. This model is that of a quality teacher in a constructivist classroom, broadly steering a course, yet allowing enquiry to be the engine of group learning. It is quite remarkable that education administrations which promote this model for learning in schools, are yet to embrace it for professional learning.

Prestridge’s (2010) contribution to the literature is also valuable, not only through an evaluation of using ICT to facilitate a CoP, but further, elucidating the dual role of discussion in this model. She attributes the development of a community to collegial discussion, a vital yet uncomfortable co-requisite to critical discussion, the element of a CoP which can effect change in teachers’ pedagogical beliefs. Prestridge acknowledges the natural tension between collegiality and critique in a CoP, but highlights the necessity for both in transforming attitudes to technology and pedagoigcal beliefs.

Further challenges.

In Australia, there is a move to impose national teacher ICT proficiency standards (DEEWR, 2010; DEST, 2002; SICTAS, 2009) as an instrument to effect policy change:

The slow progress in the uptake of ICT in education requires additional strategies and more accountability. National teacher standards are needed to match the new national curriculum and ensure that we achieve a critical mass in the incorporation of ICT in education. (SICTAS, 2009).

Such a top-down, accountability approach is at odds with a learner-centred, bottom-up approach to teacher PD. This conflict between the constructivist approach to curriculum and teacher PD (Prestridge & Watson, 2002) based on accountability to low-level competencies is absurd. Similarly, the simultaneous desire for small-scale, collaborative, Communities of Practice engaging in professional learning based on teacher needs; and a set of national proficiency standards, is untenable. Perhaps, the ability to measure teacher ICT skills is too tempting for administrators, yet the effect on encouraging meaningful, pedagogical professional development, is quite destructive.

Conclusions

That it is necessary to shift away from ICT-skills centred PD, towards reflective, pedagogically focused learning, is clear. Unless we, as teachers, can justify using ICT and make pedagogical changes to enhance student outcomes, then efforts to ‘teach’ ICT will be superficial. Embracing a Communities of Practice model for ICT PD incorporates the ubiquitous recommendations; that ICT PD should be collaborative; ongoing; focused on teacher needs;and facilitate critical discussion amongst colleagues. Further, it embraces a learner-centred, constructivist approach consistent with our best-practice models for schooling.  Yet, such bottom-up approaches are jeopardised by the desire of administrators to use standards-based accountability systems to ensure a consistent implementation of education policy. This desire to wield this stick is disappointing and surprising given that the carrot (increased student engagement and outcomes) is so juicy.


Is there a problem?

The issue of ICT teacher PD in Australia is very current due to new policy relating to ICT in education, such as the Digital Education Revolution (DER). The recent announcement of $40 million funding for a ‘Digital Strategy for Teachers and School Leaders’ is an indication that PD will be used as an instrument to effect change in teaching practices to support implementation of the DER policy (DEEWR, 2010; Gillard, 2010). The trends in teacher ICT use warrant this action, as according to 2008 survey results only 28% of Australian primary and secondary teachers are making effective use of ICT (Black, 2008; education.au, 2008a,b,c). This disappointing statistic is attributed to “a lack of investment in providing teachers with the techniques and strategies to use computers in their classrooms (Black, 2008)” and as such, Gillard’s announcement is an informed response to policy advice.

Challenges in ICT PD

There are numerous challenges in providing teachers with effective PD which are peculiar to ICT and it’s implementation in the classroom. Superficial issues such as lack of time and ease of access to technology are frequently cited, despite the emphasis on access to hardware that has been observed over the past decade (Becta, 2009; Strategic ICT Advisory Service [SICTAS], 2009). Further,due to the fast pace of change in ICT, and rapid adoption rate by students, there is a perception that teachers are being left behind (SICTAS, 2009).

The flurry of activity to address this perceived skills deficit has failed on a number of fronts. Firstly, the typical model for PD through infrequent, one-off courses has proven to be inadequate to master new skills (Becta, 2009; SICTAS, 2009). Secondly, and of greater concern, is that a re-tooling approach to ICT PD simply misses the point (Becta, 2009; Prestridge, 2010; SICTAS, 2009): “The separation of how to use the technology in education from why it should be used is a major issue”(SICTAS, 2009, p.21). In the rush to ensure teachers are keeping up with students, administrators have neglected pedagogical concerns despite the fact that is “very evident that a focus on skills is not sufficient to help teachers to develop their pedagogy” (Becta, 2009, p.6). These issues are compounded by negative attitudes towards technology and change (Phelps & Graham, 2008; SICTAS, 2009).

Where do we go?

If our definition of effective use of ICT by teachers is that of transforming practice to engage students in new ways (education.au, 2008a), then surely our model for PD must reflect this. The features of successful or idealised models of ICT PD all centre around a “move from ‘re-tooling’ with infrequent curriculum integration to a model that will enable teachers to see the ‘transforming’ possibilities of ICT” (Prestridge, 2010,p.252), promoting a introspective profession focused on peadgogical concerns.

To achieve this PD must be continuous, necessitating a rethink of our current short-course approach (SICTAS, 2009). The claim that “teachers need to be at the centre of their own learning if they are to change their deep-seated beliefs and habits regarding the use of technology” (Becta, 2009, p.6) forms a common theme (Becta, 2009; MacDonald, 2008; Prestridge, 2010; SICTAS,2009). MacDonald (2008) notes that 90% of teachers cite colleagues as their primary source of professional learning in developing his argument for a collaborative, collegial approach to PD; another common theme (Becta, 2009; Prestridge 2010; Robertshaw et al. 2009; SICTAS,2009).

I see great value in the Communities of Practice model discussed by MacDonald (2008).