SOHCAHTOA Learn sin(x) Episode 2 of 4

Andrew Borne

26 Dec 201213:45

Summary

TLDRIn episode 204, Mr. Bourne, a math teacher from Minnesota, teaches the basics of sohcahtoa right triangle trigonometry with a focus on sine and inverse sine. He explains how to find the sine of an angle using the ratio of the opposite side to the hypotenuse and demonstrates how to calculate angles and side lengths using inverse sine. The tutorial includes practical examples, such as calculating the length of a footpath to a radio tower, making the concept relatable to real-world applications.

Takeaways

📐 **Sine Definition**: Sine of an angle in a right triangle is defined as the ratio of the length of the opposite side to the hypotenuse.
🔍 **Understanding Positioning**: The position of the angle affects which side is considered opposite, thus changing the sine value.
📉 **Calculating Sine**: To calculate sine, align the angle properly and use the formula opposite/hypotenuse.
🔢 **Using Inverse Sine**: The inverse sine function (sin^-1) is used to find the angle when the ratio (opposite/hypotenuse) is known.
🧮 **Practical Calculation**: Use a calculator's second function to find the inverse sine, ensuring the calculator is in degree mode.
📏 **Finding Missing Sides**: Given an angle and the length of another side, use sine to find the length of the missing side.
📐 **Algebraic Manipulation**: Multiply both sides of the sine equation by the hypotenuse to isolate the unknown side.
🔄 **Sine in Real-World Problems**: Sine can be applied to real-world scenarios like calculating distances for engineering projects.
📋 **Labeling Answers**: When solving problems, clearly label your answers with units to avoid confusion.
⏏️ **Shortcut for Denominators**: As a shortcut, when solving for a denominator, consider swapping the numerator and denominator and then proceed with the calculation.

Q & A

What is the main focus of episode 204?
-The main focus of episode 204 is on the 'so' parts of SOHCAHTOA, specifically sine and inverse sine in right triangle trigonometry.
What is the formula for sine in a right triangle?
-The formula for sine in a right triangle is the opposite side divided by the hypotenuse.
How does the position of the angle affect the sine calculation?
-The position of the angle affects the sine calculation by changing the lengths of the opposite and adjacent sides relative to the hypotenuse.
What is the significance of the smiley face in the script?
-The smiley face is used as a visual aid to represent the vertex of the angle in the right triangle.
How is the inverse sine function used to find an angle measure?
-The inverse sine function is used to find an angle measure when the ratio of the opposite side to the hypotenuse is known.
What is the degree measure of the angle when sine is 4/5?
-The degree measure of the angle when sine is 4/5 is approximately 53.13 degrees.
How does the script demonstrate the use of inverse sine on a calculator?
-The script demonstrates using the inverse sine function on a calculator by pressing the second function key followed by the sine key and entering the ratio.
What is the purpose of the algebraic principle explained in the script?
-The algebraic principle is used to demonstrate how to isolate variables, which is applied to isolate the angle in the inverse sine calculation.
How can you find a missing side length in a right triangle when given an angle?
-You can find a missing side length by using the sine of the given angle and multiplying both sides of the equation by the hypotenuse.
What is the practical application of sine in the 'real-world' problem presented in the script?
-In the 'real-world' problem, sine is used to calculate the length of a footpath to a radio tower when the angle and hypotenuse are known.
What is the final calculated distance of the footpath in meters?
-The final calculated distance of the footpath is approximately 607 meters.