Properties And Principles Of Trigonometry

KAPDEC® | Elite STEM Learning Platform | https://kapdec.com


Unit  – TRIANGLES & TRIGONOMETRY

Chapter: – Properties & Principal of Trigonometry

What students will learn in this Section

In the Trigonometry & Triangles section of the SAT, students delve into the intricacies of triangle geometry. They discern the distinguishing features of Equilateral, Isosceles, and Scalene triangles, grasping not only their side-length characteristics but also the corresponding angle properties. The introduction of trigonometric functions—Sine, Cosine, and Tangent—equips students with tools to navigate the relationships between sides and angles in right-angled triangles.

Beyond triangles, students explore the sum of interior angles in triangles and the properties of angles within quadrilaterals. This comprehensive understanding enables them to approach a myriad of geometry problems presented in the SAT, fostering critical thinking and analytical skills essential for success in the Math section.

Important Definitions:

  • Equilateral Triangle:
    • A triangle with all three sides of equal length.
  • Isosceles Triangle:
    • A triangle with at least two sides of equal length.
  • Scalene Triangle:
    • A triangle with all three sides of different lengths.
  • Sine (sin):
    • In a right-angled triangle, the ratio of the length of the side opposite an angle to the length of the hypotenuse.
  • Cosine (cos):
    • In a right-angled triangle, the ratio of the length of the side adjacent to an angle to the length of the hypotenuse.
  • Tangent (tan):
    • In a right-angled triangle, the ratio of the length of the side opposite an angle to the length of the side adjacent to the angle.
  • Parallelogram:
  • A quadrilateral with opposite sides equal and parallel.
  • Rectangle:
  • A parallelogram with all angles equal to 90 degrees.
  • Rhombus:
  • A parallelogram with all sides equal.

Important Formulae:

  1. Lines and Angles:
    • Slope of a Line (m): m=

      Source: Kapdec.com

    • Distance Formula between two points (P1(x1, y1) and P2(x2, y2)):

Source: Kapdec.com

  1. Complementary and Supplementary Angles:
    • Complementary Angles:A+∠B=90∘
    • Supplementary Angles:  ∠C+∠D=180∘
  2. Triangles:
    • Sum of Interior Angles of a Triangle: Sum=180∘
    • Pythagorean Theorem (for a right-angled triangle ABC with hypotenuse c): a2+b2=c2
  3. Special Right Triangles:
    • 45-45-90 Triangle: If the acute angles are both 45 degrees, then the sides are in the ratio 1:1:√2.
    • 30-60-90 Triangle: If the angles are 30, 60, and 90 degrees, then the sides are in the ratio 1:√3:2.
  4. Area Formulas:
    • Area of a Triangle (given base b and height h): Area=

      Source: Kapdec.com

      ​×b×h

    • Area of a Right-Angled Triangle (given legs a and b): Area=​

      Source: Kapdec.com

      ×a×b

Speed Strategy

  1. Memorize Key Formulas:
    • Memorize essential formulas to reduce the time spent looking them up. This includes formulas for Area, sector Angles, Tangent line equation, and other geometrical measures.
  2. Practice Formula Rearrangement:
    • Familiarize yourself with rearranging formulas. This skill allows you to quickly solve for different variables without having to derive the entire formula.
  3. Use Pre-calculated Constants:
    • Pre-calculate constants or values that frequently appear in formulas. For example, memorize common Z-scores or values associated with circles & Angles.

 

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