External authorities, such as education departments and other statutory bodies, may develop a curriculum or syllabus that provides guidelines teachers are expected to use to develop their work programs, and to undertake assessment and reporting of students' learning. The development of curriculum documents is influenced by demands from groups including parents, employers and governments. In the Australian context, the Australian federal government developed an agreement among the states and territories for the development and implementation of a national curriculum, which began in mathematics in 2012. Documents relating to mathematics in the Australian national curriculum can be accessed through the Australian Curriculum, Assessment and Reporting Authority (ACARA) website (www.australiancurriculum.edu.au/f-10-curriculum/mathematics/). Documents relating to the New Zealand National Curriculum can be found at the New Zealand Curriculum Online website (http://nzcurriculum.tki.org.nz/The-New-Zealand-Curriculum/Mathematics-and-statistics). When all variables are considered, the curriculum guidelines that appear in mathematics classrooms have been created through a highly negotiated (and often hotly contested) process. In addition to curricula, many jurisdictions around the world now utilise some form of high-stakes testing. Examples include, but are not limited to, the Trends in International Mathematics and Science Study (TIMSS), the Programme for International Student Assessment (PISA) and, in Australia, the National Assessment Program—Literacy and Numeracy (N A PLAN). The use of these external, high-stakes assessments affect how teachers teach, and students learn, mathematics.

In some cases, curriculum shaping is a reciprocal process, where the benefits of change are two-way. Consider the impacts of technology within society, and of numeracy expectations. In the current context, employers are demanding that students exit schools with high levels of numeracy (and literacy). As a result, there is a much heavier emphasis on numeracy in education. Similarly, schools recognise the value of technology as a learning tool that enables students to exit schools with a strong appreciation of how technology can be used to enhance mathematical work and thinking.

In the times in which our students live, technology, globalisation, the information age and very different patterns of family, leisure and work have brought changes to society, work, schools and life. We use the term 'modern society' to provoke thinking about the age in which we live and the quite different lives of contemporary young people, and to consider how these have changed since 'the old days'. Educational researchers have underscored that modern society is different. Many cultures—such as those that embrace Eastern philosophies, or indigenous cultures seeking to gain access to contemporary ways of thinking and learning—also live in the modern world. Curricula in schools must reflect the changes occurring in the wider society to ensure that schools adequately prepare students for the world beyond compulsory schooling.

One of the biggest growth areas in employment is self-employment, which means that many young people will be creating jobs for themselves in positions that will not even exist when they exit school. Our students are growing up immersed in an information-rich society—they no longer have to search through the relatively few books in a school or a local library, but can instead undertake searches on computers or handheld devices that may yield thousands or even millions of hits. The skills they require in order to be able to search for and identify key information are very different from those they needed when only 'page-based' texts were available.

Students growing up in this technology-rich world have become used to multiple sources of information input—they are constantly bombarded with short bursts of infotainment, as well as brief snippets of information from television and other media. They are able to fragment and reconstruct images (such as maps) in ways unimaginable in former times (Lowrie 2003), as well as practise algebraic thinking through the study of curves made possible by dynamic modelling software (Padula 2014). Commonly used terms to describe contemporary students, such as 'cyberkids' or 'digital natives', although contested, recognise that their dispositions towards learning have been formed by the wider social conditions in which they have grown up. Traditional models of teaching and learning need to reflect, and sometimes to challenge, these changed circumstances.

The mathematics education of the students of modern society must be considered in light of this. Students need to develop mathematical ways of seeing and interpreting the world; they need to develop strong problem-solving skills; they need to be numerate; and, most importantly, they must have a disposition towards using mathematics to solve the problems they confront. School mathematics needs to adopt pedagogies that will cater for diversity within a classroom. The old models of seated individual work—found in what might be termed 'traditional mathematics teaching'—are possibly contributing to the problems that emerge as students progress through school. For considerable numbers of students in the years of upper primary and lower secondary school, the teaching that they encounter can lead to many negative feelings and misleading learnings about mathematics (Larkin & Jorgensen 2016).

Eastern philosophies that focus more on the wellbeing of learners are impacting the pedagogies used in Western classrooms. Notions of happiness and mindfulness, as per Buddhist philosophy, are gaining traction in teaching approaches. Yoga is finding a place in the classroom, too. These approaches are assisting learners to focus and be 'in the moment', rather than be distracted by the numerous stimuli that abound in the contemporary world.

In more recent times, there has been a growing awareness that such approaches are not resulting in positive learning outcomes. Indeed, as Clements (1989) argues, all that students learn from ten years of compulsory schooling (which, in most countries, may be extended to twelve to thirteen years) is that they cannot do mathematics! However, not all countries have bought into this approach to teaching. Research, while somewhat dated, emanating from these countries, particularly the Netherlands (see Anghileri 2001, 2006; Beishuizen 1999; Buys 2001; Treffers & Beishuizen 1999; van den Heuvel-Panhuizen 2001), has focused on developing new methods and approaches to teaching mathematics. This research is now being adopted in many countries, as it has been shown to enhance the understandings of numbers, particularly seeing numbers, in a very flexible way (Anghileri 2006; Revina & Leung 2018). The program, referred to as 'Realistic Mathematics' (van den Heuvel-Panhuizen & Drijvers 2014), has sought to develop deep number sense from real-world examples.

The Netherlands did not embrace the New Mathematics movement, instead focusing its efforts on how students think mathematically (Treffers 1991). There is now a substantive body of knowledge drawing on students' thinking that has not been constrained by New Mathematics. From this, curricula have been developed that draw on students' understandings, build on them, and move progressively towards abstract and formal mathematical processes. Dutch mathematics reformers call this 'progressive mathematisation'. Occurring in parallel with this work has been the development of constructivist theory and a general awareness, that students actively construct meaning from their experiences. This latter work has had a powerful influence on mathematics education, with it increasingly being recognised that students' individual understandings are based on their lived experiences.

These twin movements have emerged at a time when it was being recognised that many of the old, 'traditional' methods of teaching mathematics were failing too many students. This made the moment ripe for identifying more valid methods of teaching mathematics, and many countries, states and provinces adopted new methods of mathematics teaching and learning. More recently, methods such as direct or explicit instruction have seen a resurgence in traditiona...