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Integrated math 2

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Integrated math 2

Geometric Constructions

  • Key Concepts:
    • Tools for geometric constructions (compass, straightedge)
    • Constructing basic geometric figures (triangles, bisectors, angles)
    • Applications of constructions in problem-solving

Reasoning in Geometry

  • Key Concepts:
    • Introduction to inductive reasoning and patterns
    • Understanding deductive reasoning and its role in proofs
    • Writing logical arguments and constructing geometric proofs

Proving Theorems

  • Key Concepts:
    • Theorems related to lines and angles (transversal properties, angle relationships)
    • Proving properties of triangles (triangle congruence criteria)
    • Proving properties of quadrilaterals and other polygons

Properties of Lines

  • Key Concepts:
    • Characteristics of parallel and perpendicular lines
    • Angle relationships formed by parallel lines and transversals
    • Applications in geometric proofs and real-world problems

Congruent Triangles

  • Key Concepts:
    • Detailed study of congruence criteria (SSS, SAS, ASA, AAS, HL)
    • Using congruent triangles in proofs and problem-solving
    • Applications in various geometric contexts

Properties of Quadrilaterals

  • Key Concepts:
    • Classifying quadrilaterals based on properties
    • Exploring the properties of special quadrilaterals (parallelograms, rectangles, rhombuses, squares)
    • Applications of quadrilateral properties in problem-solving

Coordinate Geometry

  • Key Concepts:
    • Understanding the coordinate plane and plotting points
    • Slope, distance, and midpoint formulas
    • Analyzing geometric figures using coordinate geometry

Ratios, Proportions, and Similarity

  • Key Concepts:
    • Understanding ratios and proportions
    • Identifying similar figures and their properties
    • Using similarity in geometric problem-solving

Right Triangle Trigonometry

  • Key Concepts:
    • Introduction to trigonometric ratios (sine, cosine, tangent)
    • Solving problems involving right triangles
    • Applications of trigonometry in real-world contexts

Circles

  • Key Concepts:
    • Properties of circles (radius, diameter, circumference)
    • Angle relationships in circles (central, inscribed, and opposite angles)
    • Arcs, chords, and sectors

Surface Area and Volume

  • Key Concepts:
    • Formulas for surface area and volume of geometric solids (prisms, cylinders, cones, spheres)
    • Applications of surface area and volume in real-world contexts
    • Problem-solving using dimensional analysis

Properties of Exponents

  • Key Concepts:
    • Laws of exponents (product, quotient, power rules)
    • Understanding rational exponents and their applications
    • Simplifying expressions with exponents

Polynomials and Factoring

  • Key Concepts:
    • Introduction to polynomials and their components
    • Operations with polynomials (addition, subtraction, multiplication)
    • Factoring polynomials and solving polynomial equations

Quadratic Functions

  • Key Concepts:
    • Graphing quadratic functions and understanding their features (vertex, axis of symmetry)
    • Solving quadratic equations using various methods (factoring, completing the square, quadratic formula)
    • Applications of quadratic functions in modeling real-world scenarios

Course Goals

  • Deepen understanding of geometric properties and theorems.
  • Strengthen skills in algebra, particularly in working with polynomials and quadratic functions.
  • Apply reasoning and problem-solving strategies across mathematical concepts.
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