- communicating ideas and listening to the reflections of others
- estimating and reasoning to see the “big picture” of a problem
- organizing information to promote problem solving
- using modeling and representations to visualize abstract concepts
- reflecting on, revising, justifying, and extending the work.
Powerful Problem Solving shows what’s possible when students become active doers rather than passive consumers of mathematics. Max argues that the process of sense-making truly begins when we create questioning, curious classrooms full of students’ own thoughts and ideas. By asking “What do you notice? What do you wonder?” we give students opportunities to see problems in big-picture ways, and discover multiple strategies for tackling a problem. Self-confidence, reflective skills, and engagement soar, and students discover that the goal is not to be “over and done,” but to realize the many different ways to approach problems.