The principles of number operations can be applied to algebraic situations.
Computational fluency and flexibility with numbers extend to operations with rational numbers.
Linear relationships can be identified and represented in many connected ways, and can be used to identify regularities and make generalizations.
Similar shapes have proportional relationships that can be described, measured and compared.
Analyzing the validity, reliability, and representation of data enables us to compare and interpret.
Reasoning and Analyzing
use reason and logic to analyze and apply mathematical ideas
estimate reasonably
demonstrate fluent and flexible thinking of number
use tools or technology to analyze relationships, test conjectures, and check solutions
model contextualized situations
Understanding and Solving
develop a conceptual understanding of ideas through play, inquiry and problem solving
visualize to explore and illustrate concepts and relationships
apply flexible strategies to solve problems
engage in problem-solving experiences that are connected to place, story, cultural practices, and perspectives relevant to local First Peoples communities, the local community, and other cultures
Communicating and Representing
communicate mathematical thinking in many ways
use mathematical language to contribute to mathematical discussions
represent ideas in various ways (written, symbolic, pictorial)
explain and justify ideas
Connecting and Reflecting
reflect on mathematical thinking
connect mathematical concepts to each other
use mathematical arguments to support personal choices
incorporate First Peoples worldviews and perspectives to make connections to mathematical concepts
operations with real numbers
exponents
exponent laws
operations on polynomials
two-variable linear relations
multi-step one variable linear equations
spatial proportional reasoning
statistics
financial literacy