Kendall Hunt Publishing

Discovering Mathematics

Discover Mathematics Programs that Build Proficiency

Kendall Hunt's Discovering Mathematics series is aligned to the Common Core and designed to engage all students in active learning through a discovery-based, technology-rich approach, building and reinforcing essential skills as they progress. It fully incorporates problem solving, real-world applications, conceptual understanding, and mathematics as sense making.

Discovering Algebra, Discovering Mathematics


Balancing Conceptual and Procedural Understanding

With Discovering Algebra, students solve problems, make sense of complex situations, and develop mathematical skills in a meaningful and retrievable way. Written to the CCSS, its strength lies in the way it connects mathematical content and practices. Students will not only learn a mathematical procedure, but will be able to justify why it works.

Visit the Discovering Algebra product page.

Discovering Geometry Discovering Mathematics


Building your Students’ Reasoning and Proof Abilities

Discovering Geometry helps students develop inductive and deductive reasoning skills by creating conjectures, and reporting and justifying conclusions as they explore the principles of geometry. Congruence, similarity, and symmetry are studied from the perspective of geometric transformation to create connections within the mathematics.

Visit the Discovering Geometry product page.

Discovering Advanced Algebra Discovering Mathematics


Modeling with Mathematics

Discovering Advanced Algebra builds upon the foundation of Discovering Algebra to help all learners further develop algebraic skills along with a strong, conceptual understanding of Algebra 2. The investigative approach keeps students engaged as they use mathematical functions to model real-world data, answer questions, and make predictions.

Visit the Discovering Advanced Algebra page.

Explore the Discovering Mathematics geometry and algebra programs today. Request a free Discovering Mathematics trial here.