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Sine, Cosine, and Tangent Explained with Examples and Tricks

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Sine, Cosine, and Tangent Explained with Examples and Tricks

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Trigonometry is a branch of mathematics that deals with the relationships between the sides and angles of triangles. This summary explains the fundamental concepts of sine, cosine, and tangent, providing clear definitions and practical examples for their application in solving trigonometric problems.

  • Sin, cos, and tan are the primary trigonometric ratios used to solve problems involving right-angled triangles.
  • These ratios are based on the relationship between the sides of a right-angled triangle relative to a given angle.
  • A helpful mnemonic device, "SOH CAH TOA," is introduced to remember these ratios easily.
  • The summary includes a step-by-step example of how to use the tangent ratio to solve for an unknown side length.

5/23/2023

260

SIN-COS-TAN
Sine -Cosine - tagent
Sin Sin is the ratio of the leg opposite of the given.
angle to the hypotenuse.
Tan: Tan is the ratio of t

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Understanding Sin, Cos, and Tan in Trigonometry

This page provides a comprehensive explanation of the fundamental trigonometric ratios: sine (sin), cosine (cos), and tangent (tan). These ratios are essential for solving problems involving right-angled triangles in trigonometry.

Definition: Sin is the ratio of the leg opposite of the given angle to the hypotenuse.

Definition: Cos is the ratio of the adjacent leg to the hypotenuse (relative to the given angle).

Definition: Tan is the ratio of the leg opposite of the given angle to the adjacent leg (relative to the given angle).

The page includes a diagram of a right-angled triangle, labeling the sides as adjacent, opposite, and hypotenuse in relation to a given angle 'a'. This visual aid helps in understanding how these ratios are derived from the triangle's components.

Highlight: A crucial point to remember is that the right angle should not be used as the given angle when applying these ratios.

Vocabulary: The hypotenuse is the longest side of a right-angled triangle, opposite the right angle.

To help memorize these ratios, the page introduces the acronym "SOH CAH TOA":

  • Sin = Opposite / Hypotenuse
  • Cos = Adjacent / Hypotenuse
  • Tan = Opposite / Adjacent

Example: A practical application of the tangent ratio is demonstrated with a step-by-step problem-solving approach:

  1. Identify the sides of the triangle.
  2. Choose the appropriate ratio (in this case, tan, as we're solving for y and already have the opposite side).
  3. Set up the problem using tan of the given angle, the known side, and the variable.
  4. Solve the equation.

The example shows how to find an unknown side length (y) using the tangent of a 22° angle in a right-angled triangle with a known adjacent side of 40 units.

Quote: "Some old hippie, caught another hippie tripping on acid." This mnemonic sentence is provided as an alternative way to remember SOH CAH TOA.

By understanding and applying these sin, cos, tan formulas, students can effectively solve a wide range of trigonometric problems involving right-angled triangles. This foundational knowledge is crucial for more advanced topics in trigonometry and its applications in various fields of science and engineering.

Can't find what you're looking for? Explore other subjects.

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Sine, Cosine, and Tangent Explained with Examples and Tricks

@fairyprincess1009gmail.com_cbys

·

3 Followers

Follow

Trigonometry is a branch of mathematics that deals with the relationships between the sides and angles of triangles. This summary explains the fundamental concepts of sine, cosine, and tangent, providing clear definitions and practical examples for their application in solving trigonometric problems.

  • Sin, cos, and tan are the primary trigonometric ratios used to solve problems involving right-angled triangles.
  • These ratios are based on the relationship between the sides of a right-angled triangle relative to a given angle.
  • A helpful mnemonic device, "SOH CAH TOA," is introduced to remember these ratios easily.
  • The summary includes a step-by-step example of how to use the tangent ratio to solve for an unknown side length.

5/23/2023

260

 

9th

 

Geometry

25

SIN-COS-TAN
Sine -Cosine - tagent
Sin Sin is the ratio of the leg opposite of the given.
angle to the hypotenuse.
Tan: Tan is the ratio of t

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Understanding Sin, Cos, and Tan in Trigonometry

This page provides a comprehensive explanation of the fundamental trigonometric ratios: sine (sin), cosine (cos), and tangent (tan). These ratios are essential for solving problems involving right-angled triangles in trigonometry.

Definition: Sin is the ratio of the leg opposite of the given angle to the hypotenuse.

Definition: Cos is the ratio of the adjacent leg to the hypotenuse (relative to the given angle).

Definition: Tan is the ratio of the leg opposite of the given angle to the adjacent leg (relative to the given angle).

The page includes a diagram of a right-angled triangle, labeling the sides as adjacent, opposite, and hypotenuse in relation to a given angle 'a'. This visual aid helps in understanding how these ratios are derived from the triangle's components.

Highlight: A crucial point to remember is that the right angle should not be used as the given angle when applying these ratios.

Vocabulary: The hypotenuse is the longest side of a right-angled triangle, opposite the right angle.

To help memorize these ratios, the page introduces the acronym "SOH CAH TOA":

  • Sin = Opposite / Hypotenuse
  • Cos = Adjacent / Hypotenuse
  • Tan = Opposite / Adjacent

Example: A practical application of the tangent ratio is demonstrated with a step-by-step problem-solving approach:

  1. Identify the sides of the triangle.
  2. Choose the appropriate ratio (in this case, tan, as we're solving for y and already have the opposite side).
  3. Set up the problem using tan of the given angle, the known side, and the variable.
  4. Solve the equation.

The example shows how to find an unknown side length (y) using the tangent of a 22° angle in a right-angled triangle with a known adjacent side of 40 units.

Quote: "Some old hippie, caught another hippie tripping on acid." This mnemonic sentence is provided as an alternative way to remember SOH CAH TOA.

By understanding and applying these sin, cos, tan formulas, students can effectively solve a wide range of trigonometric problems involving right-angled triangles. This foundational knowledge is crucial for more advanced topics in trigonometry and its applications in various fields of science and engineering.

Can't find what you're looking for? Explore other subjects.

Knowunity is the # 1 ranked education app in five European countries

Knowunity was a featured story by Apple and has consistently topped the app store charts within the education category in Germany, Italy, Poland, Switzerland and United Kingdom. Join Knowunity today and help millions of students around the world.

Ranked #1 Education App

Download in

Google Play

Download in

App Store

Knowunity is the # 1 ranked education app in five European countries

4.9+

Average App Rating

15 M

Students use Knowunity

#1

In Education App Charts in 12 Countries

950 K+

Students uploaded study notes

Still not sure? Look at what your fellow peers are saying...

iOS User

I love this app so much [...] I recommend Knowunity to everyone!!! I went from a C to an A with it :D

Stefan S, iOS User

The application is very simple and well designed. So far I have found what I was looking for :D

SuSSan, iOS User

Love this App ❤️, I use it basically all the time whenever I'm studying