OUR RESULTS
The results are transformative - families will see measurable changes in attitude, confidence, and school progress.
See Our ResultsFor decades the Mathnasium Method™ has transformed the way kids learn maths. We build a foundation for maths mastery through deep understanding by starting with what they already know, addressing any learning gaps, expanding their mathematical thinking, and adding new concepts in sequence. This proprietary method works for kids of all ages and skill levels, whether they’re struggling in maths, doing okay but could be doing better, or are already excelling but need more of a challenge. When kids see what they can achieve because of their proficiency in maths, it can alter the course of their entire lives.
This is the key to success in maths—the understanding of what numbers mean and how they work together. And Number Sense isn't just for young kids. We work on these topics through the levels shown below before moving on to Algebra and other higher maths disciplines.
Counting is the key to unlocking addition and subtraction in early maths development. At Mathnasium, our initial goal is to have a student become comfortable with counting to any number, from any number, by any number, forwards and backwards.
As students begin to understand the relationship between a whole and the parts, a world of mathematical concepts and exercises can be explored. Once students have mastered these skills, they have little trouble with algebraic problem solving.
The quantity and denomination construct examine two aspects of numerical value. Quantity asks “how many” and denomination asks “of what.”
Proportional thinking establishes a fundamental base that leads to a stronger understanding of critical concepts like ratios, direct and indirect variation and algebraic reasoning.
The Law of SAMEness is a concept students naturally apply in their reasoning without being aware of it. For example, quantities of apples and bananas cannot be added together unless first being changed so that they have the same name, which is fruit.
Counting is the key to unlocking addition and subtraction in early maths development. At Mathnasium, our initial goal is to have a student become comfortable with counting to any number, from any number, by any number, forwards and backwards.
As students begin to understand the relationship between a whole and the parts, a world of mathematical concepts and exercises can be explored. Once students have mastered these skills, they have little trouble with algebraic problem solving.
The quantity and denomination construct examine two aspects of numerical value. Quantity asks “how many” and denomination asks “of what.”
Proportional thinking establishes a fundamental base that leads to a stronger understanding of critical concepts like ratios, direct and indirect variation and algebraic reasoning.
The Law of SAMEness is a concept students naturally apply in their reasoning without being aware of it. For example, quantities of apples and bananas cannot be added together unless first being changed so that they have the same name, which is fruit.
Counting is the key to unlocking addition and subtraction in early maths development. At Mathnasium, our initial goal is to have a student become comfortable with counting to any number, from any number, by any number, forwards and backwards.
As students begin to understand the relationship between a whole and the parts, a world of mathematical concepts and exercises can be explored. Once students have mastered these skills, they have little trouble with algebraic problem solving.
The quantity and denomination construct examine two aspects of numerical value. Quantity asks “how many” and denomination asks “of what.”
Proportional thinking establishes a fundamental base that leads to a stronger understanding of critical concepts like ratios, direct and indirect variation and algebraic reasoning.
The Law of SAMEness is a concept students naturally apply in their reasoning without being aware of it. For example, quantities of apples and bananas cannot be added together unless first being changed so that they have the same name, which is fruit.
Counting is the key to unlocking addition and subtraction in early maths development. At Mathnasium, our initial goal is to have a student become comfortable with counting to any number, from any number, by any number, forwards and backwards.
As students begin to understand the relationship between a whole and the parts, a world of mathematical concepts and exercises can be explored. Once students have mastered these skills, they have little trouble with algebraic problem solving.
The quantity and denomination construct examine two aspects of numerical value. Quantity asks “how many” and denomination asks “of what.”
Proportional thinking establishes a fundamental base that leads to a stronger understanding of critical concepts like ratios, direct and indirect variation and algebraic reasoning.
The Law of SAMEness is a concept students naturally apply in their reasoning without being aware of it. For example, quantities of apples and bananas cannot be added together unless first being changed so that they have the same name, which is fruit.
Counting is the key to unlocking addition and subtraction in early maths development. At Mathnasium, our initial goal is to have a student become comfortable with counting to any number, from any number, by any number, forwards and backwards.
As students begin to understand the relationship between a whole and the parts, a world of mathematical concepts and exercises can be explored. Once students have mastered these skills, they have little trouble with algebraic problem solving.
The quantity and denomination construct examine two aspects of numerical value. Quantity asks “how many” and denomination asks “of what.”
Proportional thinking establishes a fundamental base that leads to a stronger understanding of critical concepts like ratios, direct and indirect variation and algebraic reasoning.
The Law of SAMEness is a concept students naturally apply in their reasoning without being aware of it. For example, quantities of apples and bananas cannot be added together unless first being changed so that they have the same name, which is fruit.
Counting is the key to unlocking addition and subtraction in early maths development. At Mathnasium, our initial goal is to have a student become comfortable with counting to any number, from any number, by any number, forwards and backwards.
As students begin to understand the relationship between a whole and the parts, a world of mathematical concepts and exercises can be explored. Once students have mastered these skills, they have little trouble with algebraic problem solving.
The quantity and denomination construct examine two aspects of numerical value. Quantity asks “how many” and denomination asks “of what.”
Proportional thinking establishes a fundamental base that leads to a stronger understanding of critical concepts like ratios, direct and indirect variation and algebraic reasoning.
The Law of SAMEness is a concept students naturally apply in their reasoning without being aware of it. For example, quantities of apples and bananas cannot be added together unless first being changed so that they have the same name, which is fruit.
Counting is the key to unlocking addition and subtraction in early maths development. At Mathnasium, our initial goal is to have a student become comfortable with counting to any number, from any number, by any number, forwards and backwards.
As students begin to understand the relationship between a whole and the parts, a world of mathematical concepts and exercises can be explored. Once students have mastered these skills, they have little trouble with algebraic problem solving.
The quantity and denomination construct examine two aspects of numerical value. Quantity asks “how many” and denomination asks “of what.”
Proportional thinking establishes a fundamental base that leads to a stronger understanding of critical concepts like ratios, direct and indirect variation and algebraic reasoning.
The Law of SAMEness is a concept students naturally apply in their reasoning without being aware of it. For example, quantities of apples and bananas cannot be added together unless first being changed so that they have the same name, which is fruit.
Counting is the key to unlocking addition and subtraction in early maths development. At Mathnasium, our initial goal is to have a student become comfortable with counting to any number, from any number, by any number, forwards and backwards.
As students begin to understand the relationship between a whole and the parts, a world of mathematical concepts and exercises can be explored. Once students have mastered these skills, they have little trouble with algebraic problem solving.
The quantity and denomination construct examine two aspects of numerical value. Quantity asks “how many” and denomination asks “of what.”
Proportional thinking establishes a fundamental base that leads to a stronger understanding of critical concepts like ratios, direct and indirect variation and algebraic reasoning.
The Law of SAMEness is a concept students naturally apply in their reasoning without being aware of it. For example, quantities of apples and bananas cannot be added together unless first being changed so that they have the same name, which is fruit.
We use a combination of mental, verbal, visual, tactile, and written techniques to build maths knowledge level by level, so they understand it, master it, and enjoy it.
The results are transformative - families will see measurable changes in attitude, confidence, and school progress.
See Our Resultsof parents report an improvement in their child’s maths skills and understanding.
of parents report improved attitude toward maths after attending Mathnasium.
of students saw an improvement in their school grades.
Maths went from being a seemingly insurmountable challenge for our son to being one of his strongest subjects in school.
Loreana C., Parent
Our son did a lot improvements to his math skills
Wonderful engaging team with the teaching expertise that show reasults.
We are growing rapidly in the AU.