Elementary School
Math
Students are introduced to basics of number sense, helping them explore counting, basic operations, and simple equations. They develop logical thinking through activities involving patterns and relationships. A science component enriches the learning experience, encouraging curiosity across disciplines.
English
Students develop early literacy through phonics, sight words, and guided reading, while practicing writing simple words and sentences. Basic sentence structure and punctuation are introduced to build confidence and fluency.
Math
This program focuses on strengthening students’ number sense and developing computational skills through addition, subtraction, and multiplication. Students are introduced to adding and subtracting fractions, with an emphasis on solving word problems.
English
Building foundational skills, students strengthen reading comprehension and begin structured writing. They develop core grammar skills, including parts of speech and verb tenses, while learning to form clear, complete sentences with correct capitalization and punctuation.
Math
This program builds on students’ number sense by deepening their work with addition and subtraction through multi-step word problems and estimation. Students strengthen their multiplication skills and are introduced to division as the inverse of multiplication. They continue working with fractions, including operations with common denominators and representing improper fractions and mixed numbers, while also beginning to explore decimals through real-world applications.
English
This level expands students’ reading and writing skills through more complex texts and structured responses. Students deepen their understanding of grammar and style, including subject-verb agreement and sentence structure, while applying these skills to edit writing, use punctuation accurately, and construct more detailed and organized sentences.
Math
This program extends students’ understanding of multiplication and division through more advanced applications, including multi-digit division, patterns, and problem solving. Students apply these skills to area and input-output relationships while continuing to strengthen fluency with fractions, including operations with like and unlike denominators. They also develop their understanding of decimals and inequalities, including comparing, ordering, and rounding, while reinforcing estimation and multi-step reasoning across operations.
English
Building on structured reading and writing skills, students develop greater control over paragraphs and extended responses. They refine their understanding of grammar and conventions, including parts of speech, verb usage, and punctuation, while applying these skills through descriptive, narrative, and informational writing. Students also strengthen reading comprehension by interpreting texts, analyzing meaning in context, and organizing ideas with clarity and coherence
Math
This program builds on students’ work with fractions, decimals, and multi-step reasoning by developing fluency across all operations, including conversions between fractions, decimals, and percents. Students apply these skills in problem solving while being introduced to integers and the order of operations. They also explore number relationships such as prime factorization, GCF, and LCM, and begin formal algebraic thinking, including expressions and one- and two-step equations, alongside measurement concepts and unit conversions.
English
Building on paragraph-level writing, students develop more advanced composition skills by organizing and refining multi-paragraph pieces, including informational and compare/contrast writing. They deepen their understanding of sentence structure and grammar, including clauses, phrases, and conjunctions, while strengthening clarity, coherence, and revision skills. Students continue to build reading comprehension by analyzing texts, comparing ideas, and supporting their thinking with evidence.
Math
This program deepens students’ understanding of integers, including operations and applications in problem solving, while extending their work with exponents and the order of operations. Students strengthen their algebraic reasoning by writing and solving expressions and multi-step equations from real-world contexts. They are also introduced to ratios, rates, and proportions, applying these concepts to percent problems and unit conversions, while continuing to build fluency with fractions and decimals across multi-step problem solving.
English
Building on multi-paragraph writing, students develop more advanced composition skills across descriptive, narrative, persuasive, and research-based writing. They refine their use of grammar and sentence structure, including verb tenses, modifiers, and complex sentences, while strengthening organization, voice, and revision. Students also deepen reading comprehension by analyzing arguments, evaluating evidence, and engaging critically with more advanced texts.
Middle School
PreAlgebra curriculum focuses on advancing math concepts such as algebra in the form of variable expressions, single variable equations, and two variable equations. Students will also focus on geometry through different types of lines, perimeters and areas of polygons and circles, and surface areas and volumes of three-dimensional shapes in addition to graphing. Students will also delve further into algebra and geometry with arithmetic and geometric sequences; simple and compound interest problems; algebraic equations population and variation problems; and speed time and distance problems. Also introduces students to probability and statistics, exponents and square roots, and ratio, proportion, and percentage problems.
Algebra 1 curriculum covers an overview of the main Algebra- I concepts Adding/Subtracting/Multiplying/dividing Integers, Solving One-step/Multi-step equations, Inequalities, Absolute value, Functions, graphing, Exponents and polynomials, Linear equations, Systems of linear equations, Quadratic Functions.
This program focuses on Points, Lines, Planes, Angles and their measures, Segment and Angle bisectors, and Angle Pair relationship; Perimeter, Circumference and Area; Proof of Perpendicular Lines, Parallel Lines, and Transversal; Interior and Exterior angles in Polygons, Apothem concept of Area of Regular Polygons; Proving Triangles Congruent -SSS, SAS, ASA, and AAS; Triangle properties, Right Triangle, Pythagorean Theorem and Special Right Triangles; Similar Triangles and Proportions; Area of Triangles; Perpendicular Bisectors, Angle Bisectors, Medians, and Altitudes of a Triangle; Locus and constructions.
Circles - Congruent Chords; Arcs of a Circle; Secants and Tangents; Angle-Arc Theorems; Inscribed and Circumscribed Polygons; Power Theorems.
Area - Areas of Parallelograms, triangles, Trapezoid, Kites and Related Figures; Areas of Circles, Sectors, and Segments; Ratios of Areas; Hero's and Brahmagupta's Formulas.
Surface Area and Volume - Surface Areas of Prisms, Pyramids, Circular Solids; Volumes of Prisms, Cylinders, Pyramids, Cones, and Spheres.
Coordinate Geometry - Graphing Equations and Inequalities; Equations of Lines; Systems of Equations.
This program curriculum focuses on - Review of Basic Concepts of Algebra, Solving Compound Inequalities, Solving Absolute value Sentences Graphically; Linear Equations and Functions - Solving System of Linear Equations and Linear Inequalities; Functions and Relations.
Products and factors of Polynomials - Factoring Quadratic Polynomials; Solving Polynomial Equations; Solving Polynomial Inequalities.
Rational Expressions - Laws of Exponents; Sums & Differences, Products & Quotients of Rational Expressions, Complex Fractions; Problem Solving Using Fractional Equations; Irrational and complex numbers: Properties of Radicals, Rational and Irrational Numbers, The Imaginary number i, Complex Numbers.
Quadratic Equations and Functions - Completing the Square, The Quadratic formula, The discriminant; Quadratic functions and Their Graphs. Variation and Polynomial Equations - Direct variation and proportion, Inverse and Joint Variation; Dividing Polynomials, Synthetic Division, The Remainder and factor Theorem; Finding Rational Roots, Approximating Irrational Roots, Linear Interpolation.
Conic Sections - Circles, Parabolas, Ellipses, and hyperbolas Exponential and Logarithmic Functions - Rational and Real Number Exponents; Laws of Logarithms, Applications of Logarithms; The Natural Logarithm function; Problem Solving: Exponential Growth and Decay Sequences and Series: Arithmetic, Geometric Sequences; Series and Sigma Notation; Sums of Arithmetic and Geometric Series; Infinite Geometric Series; Binomial Expansions.
Triangle Trigonometry: -Trigonometric Functions; Solving Right Triangles, The Law of Cosines, The Law of Sines, Areas of Triangles. Trigonometric Graphs and Identities - Radian Measure, Circular functions, Periodicity and Symmetry, Graphs of all Trigonometric functions; Trigonometric Addition Formulas, Double-Angle and half-Angle Formulas. Trigonometric Applications: Vectors in a Plane, Polar Coordinates, De Moire's Theorem; Inverse functions.
Matrices and determinants - Addition and Scalar Multiplication, Matrix Multiplication, Applications of Matrices; Determinants, Solving System of equations using Cramer's Rule; Inverses of Matrices; Expansion of Determinants by Minors, and Properties of Determinants.
Building on advanced composition skills, students refine their ability to write structured, multi-paragraph essays and develop clear, persuasive arguments supported by evidence. They deepen their understanding of complex grammar, including verb forms, voice, and conditionals, while strengthening precision, style, and revision. Students also enhance reading comprehension by analyzing nuanced texts, evaluating arguments, and synthesizing ideas across sources.
Contact Us for more details about the program.
Contact Us for more details about the program.
High School
This program focuses on -Â Points, Lines, Planes, Angles and their measures, Segment and Angle bisectors, and Angle Pair relationship; Perimeter, Circumference and Area; Proof of Perpendicular Lines, Parallel Lines, and Transversal; Interior and Exterior angles in Polygons, Apothem concept of Area of Regular Polygons; Proving Triangles Congruent -SSS, SAS, ASA, and AAS; Triangle properties, Right Triangle, Pythagorean Theorem and Special Right Triangles; Similar Triangles and Proportions; Area of Triangles; Perpendicular Bisectors, Angle Bisectors, Medians, and Altitudes of a Triangle; Locus and constructions.
Circles - Congruent Chords; Arcs of a Circle; Secants and Tangents; Angle-Arc Theorems; Inscribed and Circumscribed Polygons; Power Theorems.
Area - Areas of Parallelograms, triangles, Trapezoid, Kites and Related Figures; Areas of Circles, Sectors, and Segments; Ratios of Areas; Hero's and Brahmagupta's Formulas.
Surface Area and Volume - Surface Areas of Prisms, Pyramids, Circular Solids; Volumes of Prisms, Cylinders, Pyramids, Cones, and Spheres.
Coordinate Geometry - Graphing Equations and Inequalities; Equations of Lines; Systems of Equations
Algebra 2 and Trigonometry curriculum focuses on - Review of Basic Concepts of Algebra, Solving Compound Inequalities, Solving Absolute value Sentences Graphically; Linear Equations and Functions - Solving System of Linear Equations and Linear Inequalities; Functions and Relations.
Products and factors of Polynomials - Factoring Quadratic Polynomials; Solving Polynomial Equations; Solving Polynomial Inequalities.
Rational Expressions - Laws of Exponents; Sums & Differences, Products & Quotients of Rational Expressions, Complex Fractions; Problem Solving Using Fractional Equations; Irrational and complex numbers: Properties of Radicals, Rational and Irrational Numbers, The Imaginary number i, Complex Numbers.
Quadratic Equations and Functions - Completing the Square, The Quadratic formula, The discriminant; Quadratic functions and Their Graphs. Variation and Polynomial Equations - Direct variation and proportion, Inverse and Joint Variation; Dividing Polynomials, Synthetic Division, The Remainder and factor Theorem; Finding Rational Roots, Approximating Irrational Roots, Linear Interpolation.
Conic Sections - Circles, Parabolas, Ellipses, and hyperbolas Exponential and Logarithmic Functions - Rational and Real Number Exponents; Laws of Logarithms, Applications of Logarithms; The Natural Logarithm function; Problem Solving: Exponential Growth and Decay Sequences and Series: Arithmetic, Geometric Sequences; Series and Sigma Notation; Sums of Arithmetic and Geometric Series; Infinite Geometric Series; Binomial Expansions.
Triangle Trigonometry -Trigonometric Functions; Solving Right Triangles, The Law of Cosines, The Law of Sines, Areas of Triangles. Trigonometric Graphs and Identities - Radian Measure, Circular functions, Periodicity and Symmetry, Graphs of all Trigonometric functions; Trigonometric Addition Formulas, Double-Angle and half-Angle Formulas. Trigonometric Applications: Vectors in a Plane, Polar Coordinates, De Moire's Theorem; Inverse functions.
Matrices and determinants - Addition and Scalar Multiplication, Matrix Multiplication, Applications of Matrices; Determinants, Solving System of equations using Cramer's Rule; Inverses of Matrices; Expansion of Determinants by Minors, and Properties of Determinants.
PreCalculus curriculum focuses on
Functions and Their Graphs - Finding Domain and Range of a Function; Properties of Functions, Determine Even and Odd Functions, Locate Local Maxima & Local Minima, and Absolute Maxima & Absolute Minima; Piecewise-defined Functions, Transformations, and Applications.
Linear and Quadratic Functions - Properties of Linear Functions and Linear Models, Building Linear Models, Linear and Nonlinear Relations; Quadratic Functions and Their Properties, Transformations, Building Quadratic Models; Solving Quadratic Inequalities; Polynomial and Rational Functions - Identifying Polynomial Functions, Properties of Power Functions.
The Real Zeros of a Polynomial Function - Remainder and Factor Theorem; Descartes' Rule of Signs, Rational Zeros Theorem: Complex Zeros; Fundamental Theorem of Algebra; Conjugate Pairs Theorem; Properties of Rational Functions; Finding Asymptotes.
Exponential and Logarithmic Functions - Inverse Functions, Graphing Exponential Functions Using Transformations; Define the Number e, Solve Exponential Equation; Changing Exponential to Logarithmic and vice versa; Graphing Logarithmic Function and its Inverse, Solve Logarithmic Equations, Properties of Logarithms; Financial Models; Compound Interest, Continuous Compounding; Exponential Growth and Decay Models; Newton's Law of Cooling; Uninhibited Radioactive Decay.
Trigonometric Functions - Unit Circle, Angles, Quadrantal Angles; Properties of Trigonometric Functions; Finding Domain and Range, Period of a Function, Determine Signs and Values of Trigonometric Functions; Even-Odd Properties; Graphs of All Trig Functions; Amplitude, Period, and Graphing of Sinusoidal Functions; Phase Shift, and Sinusoidal Curve Fitting.
Analytic Trigonometry - Inverse Trigonometric Functions; Trigonometric Identities; Solving Trigonometric Equations; Sum and Difference Formulas; Double and Half Angle Formulas; sum-to-product and product-to-sum Formulas. Applications of Trigonometric Functions - Right triangle Trigonometry Applications; The Law of Sines; The Law of Cosines; Area of a Triangle; Simple Harmonic Motion.
Polar Coordinates - Polar Equations and graphs; Complex Plane, De Moire's Theorem; Vectors; The Dot Product; Vectors in Space; The Cross Product. Analytic Geometry - The Parabola; The Ellipse; The Hyperbola; Polar Equations of Conics. Systems of Equations and Inequalities; Sequences; Induction; the Binomial Theorem; Counting and Probability.
Introduction to Calculus – Limits, Derivatives, and Integration
This program focusses on
Functions and Their Graphs - Finding Domain and Range of a Function; Properties of Functions, Determine Even and Odd Functions, Locate Local Maxima & Local Minima, and Absolute Maxima & Absolute Minima; Piecewise-defined Functions, Transformations, and Applications.
Linear and Quadratic Functions - Properties of Linear Functions and Linear Models, Building Linear Models, Linear and Nonlinear Relations; Quadratic Functions and Their Properties, Transformations, Building Quadratic Models; Solving Quadratic Inequalities; Polynomial and Rational Functions - Identifying Polynomial Functions, Properties of Power Functions.
The Real Zeros of a Polynomial Function - Remainder and Factor Theorem, Descartes' Rule of Signs, Rational Zeros Theorem: Complex Zeros; Fundamental Theorem of Algebra, Conjugate Pairs Theorem; Properties of Rational Functions; Finding Asymptotes
Exponential and Logarithmic Functions - Inverse Functions, Graphing Exponential Functions Using Transformations; Define the Number e, Solve Exponential Equation; Changing Exponential to Logarithmic and vice versa; Graphing Logarithmic Function and its Inverse, Solve Logarithmic Equations, Properties of Logarithms; Financial Models; Compound Interest, Continuous Compounding; Exponential Growth and Decay Models; Newton's Law of Cooling; Uninhibited Radioactive Decay.
Trigonometric Functions - Unit Circle, Angles, Quadrantal Angles; Properties of Trigonometric Functions; Finding Domain and Range, Period of a Function, Determine Signs and Values of Trigonometric Functions; Even-Odd Properties; Graphs of All Trig Functions; Amplitude, Period, and Graphing of Sinusoidal Functions; Phase Shift, and Sinusoidal Curve Fitting.
Analytic Trigonometry - Inverse Trigonometric Functions; Trigonometric Identities; Solving Trigonometric Equations; Sum and Difference Formulas; Double and Half Angle Formulas; sum-to-product and product-to-sum Formulas. Applications of Trigonometric Functions - Right triangle Trigonometry Applications; The Law of Sines; The Law of Cosines; Area of a Triangle; Simple Harmonic Motion.
This program focuses on
Differential Calculus Essentials - Limits; Continuity; The definition of Derivative; Basic Differentiation; Implicit Differentiation.
Differential Calculus Applications - Basic Applications of Derivative; Maxima, Minima, and Curve Sketching; Motion; Derivatives of Exponential and Logarithmic Functions; Derivative of an Inverse function; Linearization; L 'HOPITAL's Rule
Integral Calculus Essentials - The Integral, The Antiderivative, Integrals of Trig Functions, u-Substitution; Definite Integrals, Area Under A Curve, Riemann Sums, Fundamental Theorem of Calculus, The Mean Value Theorem for Integrals, Accumulation Functions; Integrals of Exponential, Logarithmic, and Trig Functions, Inverse Trigonometric Functions.
Integral Calculus Applications - The Area between Two Curves, Vertical Slices, Horizontal slices; The Volume of a Solid of Revolution, Washers and Disks, Cylindrical Shells.
Differential Equations - Separation of Variables.
This program focuses on
Limits and Continuity; Differentiation - Basic Rules, Composite, Implicit, and Inverse Functions.
Applications of Differentiation - Maxima, Minima, and Curve Sketching; Motion; Derivatives of Exponential and Logarithmic Functions; Derivative of an Inverse function; Linearization; Differential Equations.
Integral Calculus Essentials - The Integral, The Antiderivative, Integrals of Trig Functions, u-Substitution; Definite Integrals, Area Under a Curve, Riemann Sums, Fundamental Theorem of Calculus, The Mean Value Theorem for Integrals, Accumulation Functions; Integrals of Exponential, Logarithmic, and Trigonometric Functions, Inverse Trigonometric Functions.
Applications of Integration - The Area between Two Curves, Vertical Slices, Horizontal slices; The Volume of a Solid of Revolution, Washers and Disks, Cylindrical Shells.
Differentiating Parametric Equations, Polar coordinates; Integrating Vector-valued functions; Area bounded by Polar curves; Infinite Sequences and series.
Vector Calculus - Vectors and the Geometry of the Space; Vector Functions; Partial Derivatives; Multiple Integrals
Please contact us for curriculum
Please contact us for curriculum
Please contact us for curriculum
Please contact us for curriculum
Summer Program
This program is designed for students new to the program to build a strong foundation for the upcoming school year. It reviews key concepts from the previous level in a small group setting, with regular homework to reinforce learning.
This program is designed for students new to the program to build a strong foundation for the upcoming school year. It reviews key concepts from the previous level in a small group setting, with regular homework to reinforce learning.
This eight-week course develops students’ ability to read and analyze non-fiction texts. Students write responses and reports to strengthen comprehension and critical thinking, while building skills for essay writing across a range of topics.
Students build foundational algebra skills, including operations with integers, solving equations and inequalities, and graphing functions. Key topics include exponents, polynomials, linear and quadratic equations, with an emphasis on problem-solving and real-world applications.
Curriculum focuses on
Differential Calculus Essentials - Limits; Continuity; The definition of Derivative; Basic Differentiation; Implicit Differentiation
Differential Calculus Applications - Basic Applications of Derivative; Maxima, Minima, and Curve Sketching; Motion; Derivatives of Exponential and Logarithmic Functions; Derivative of an Inverse function; Linearization; L 'HOPITAL's Rule.
Integral Calculus Essentials - The Integral, The Antiderivative, Integrals of Trig Functions, u-Substitution; Definite Integrals; Area Under A Curve; Riemann Sums; Fundamental Theorem of Calculus; The Mean Value Theorem for Integrals; Accumulation Functions; Integrals of Exponential; Logarithmic; and Trig Functions; Inverse Trig Functions.
Integral Calculus Applications - The Area between Two Curves, Vertical Slices, Horizontal slices; The Volume of a Solid of Revolution, Washers and Disks, Cylindrical Shells.
Differential Equations - Separation of Variable
SAT/ACT Prep: Math and English
This program helps students set target scores, create structured study plans, and focus on targeted skill development. It includes comprehensive practice tests with detailed explanations, along with instruction in key techniques for mastering each section of both exams and effective test-taking strategies.
Academic Year: 6th month program
Summer: 8-week program