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Posts Tagged ‘triangle’

Initial Side

Thursday, October 22nd, 2009

How to Identify the Initial Side

Description

A detailed tutorial on the intial side of an angle. Step by step tutorial including several examples of the initial side of an angle for reference.

Overview

The initial side of an angle is the side of an angle where the measurement begins. An angle is always measured from the degree of zero to the degree of the angle, regardless of if the angle is positive or negative. The best display of an initial side would be when you draw angles with a protractor – the line that you trace along the bottom of your protractor forms a ray which is known as the initial side.

Tags: angle, begins, ends, Geometry, initial, measurement, negative, positive, ray, side, terminal, triangle
Posted in Geometry | No Comments »

Terminal Side

Thursday, October 22nd, 2009

How to Identify the Terminal Side

Description

A detailed tutorial on the terminal side of an angle. Step by step tutorial including several examples of the terminal side of an angle for reference.

Overview

The terminal side of an angle is the side of an angle where the measurement ends. An angle is always measured from the degree of zero to the degree of the angle, regardless of if the angle is positive or negative. The best display of a terminal side would be when you draw angles with a protractor – the line that you draw for your degree forms a ray which is known as the terminal side.

Tags: angle, begins, ends, Geometry, initial, measurement, negative, positive, ray, side, terminal, triangle
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Law of Tangents

Thursday, October 8th, 2009

An Introduction to the Law of Tangents

Description

A detailed tutorial on the Law of Tangents. Step by step tutorial including several examples of the Law of Tangents for reference.

Overview

The Law of Tangents refers to the lengths of the three sides of a triangle and the tangents of the angles. This can be used with respect to any triangle, not just right triangles. While the Law of Tangents is not as well known as the Law of Sines or the Law of Cosines, it is useful. The Law of Tangents can be used whenever either two sides and an angle, or two angles and a side, are known on any given triangle. The proof of this law starts with the Law of Sines. The Law of Tangents is as follows:

$\frac{a-b}{a+b} = \frac{\tan[\frac{1}{2}(\alpha-\beta)]}{\tan[\frac{1}{2}(\alpha+\beta)]}.$

Tags: angle, ASA, law, law of cosines, law of sines, law of tangents, length, Math, right, side, SSA, tangent, tangents, triangle, trigonometry
Posted in Trigonometry | No Comments »

Ambiguous Case

Friday, October 2nd, 2009

Introduction to the Ambiguous Case

Description

A detailed tutorial on the ambiguous case. Step by step tutorial including several example problems of the ambiguous case for reference.

Overview

An ambiguous case is actually any case in mathematics that is open to more than one interpretation, or has more than one solution. There are many different examples of an ambiguous case. However, what most people refer to as the ambiguous case is the Law of Sines. The Law of Sines can use many different techniques to be solved, and those techniques can also be used to figure out if two triangles are congruent.

Tags: AAS, ambiguous, ASA, case, congruent, interpretation, law of sines, Math, SAS, solution, SSS, triangle, trigonometry
Posted in Trigonometry | No Comments »

Pascal’s Triangle

Tuesday, September 29th, 2009

An Overview of Pascal’s Triangle

Description

A detailed tutorial of how to use Pascal’s Triangle. Step by step tutorial including several examples of how to use Pascal’s Triangle for reference. Knowledge of Pascal’s Triangle will prove useful in several branches of mathematics.

Overview

Pascal’s Triangle is a useful device in mathematics that can reveal the sums of almost any number. There are an infinite number of rows but it can be shortened to any number. The triangle traditionally starts at Row 0 with one number – 1. Then Row 1 has two numbers – 1 and 1. And Row 2 has three numbers – 1, 2, and 1. The number 1 lines the side of the triangle. Every other number is the sum of the two numbers found directly above it. Pascal’s triangle is constructed by using geometric shapes.

Tags: addition, arithmetic, binomial coefficients, Blaise Pascal, elements, geometric arrangement, geometric shapes, infinite, Math, Pascal's Rule, Pascal's Triangle, rows, sums, triangle
Posted in Arithmetic | No Comments »

Tangent

Friday, September 18th, 2009

The Tangent Rule and Formula

Description

A detailed tutorial on solving unknown lengths and angles of a triangle using Tangent.

Overview

The tangent of an angle is the ratio of the length of the opposite side to the length of the adjacent sides. The formula for tangent is:

$\tan A = \frac {\textrm{opposite}} {\textrm{adjacent}} = \frac {a} {b}\,.$

Tags: cosine, formula, Geometry, Inside, length, Math, rule, sine, SOHCAHTOA, tangent, triangle
Posted in Geometry | No Comments »

Sine

Friday, September 18th, 2009

The Sine Rule and Formula

Description

A detailed tutorial on solving unknown lengths and angles of a triangle using Sine.

Overview

The sine of an angle is the ratio of the length of the opposite side to the length of the hypotenuse. The formula for sine is:

$\sin A = \frac {\textrm{opposite}} {\textrm{hypotenuse}} = \frac {a} {h}\,.$

Tags: angle, cosine, formula, Geometry, Inside, length, Math, rule, sine, SOHCAHTOA, tangent, triangle
Posted in Geometry | No Comments »

Law of Cosines

Thursday, September 17th, 2009

An Introduction to the Law of Cosines

Description

A detailed tutorial on the Law of Cosines and proving the Law of Cosines. Step by step tutorial including several examples of proving the Law of Cosines for reference.

Overview

The Law of Cosines is a formula that is used to relate the sides of a triangle to the cosine of one of its angles. The Law of Cosines can be expressed as:

$c^2 = a^2 + b^2 - 2ab\cos(\gamma)\,$

Where a, b, and c are the sides of the triangle. If the triangle is a right triangle then this simplifies to the Pythagorean Theorem.

Tags: angle, cosine, cosine formula, cosine rule, law of cosines, Math, pythagorean theorem, side, triangle, trigonometry
Posted in Trigonometry | No Comments »

Law of Sines

Thursday, September 17th, 2009

An Introduction to the Law of Sines

Description

A detailed tutorial on the the Law of Sines and how to prove the Law of Sines. Step by step tutorial including several examples of how to solve problems with the Law of Sines for reference.

Overview

The Law of Sines is a formula that can be used when a triangle has both side and angle measures. The Law of Sines is expressed as:

$\frac{a}{\sin A} = \frac{b}{\sin B} = \frac{c}{\sin C}.$

Where a, b, and c represent the sides, and A, B, and C represent the angles that are opposite of those sides. This formula looks very similar to the Pythagorean Theorem.

Tags: angle, law of sines, Math, side, sine, sine formula, sine rule, sines law, triangle, trigonometry
Posted in Trigonometry | No Comments »

Types of Triangles

Tuesday, September 15th, 2009

An Overview of the Different Types of Triangles

Description

A detailed tutorial on the different types of triangles. Step by step tutorial including several examples of the different types of triangles for reference. Knowledge of the different types of triangles is required for all geometry classes.

Overview

Everyone knows what a triangle is, but a triangle is more than just “a triangle” – it could be one of several different types of triangles. Different types of triangles are identified by the different traits of their sides and their angles. The types are as follows:

Scalene Triangles: All sides and all angles are of different measures and lengths.

Right Triangles: One angle of the triangle is 90 degrees.

Isosceles Triangles: 2 sides and 2 angles have the same measures and lengths.

Equilateral Triangles: All side lengths are the same and all angles are 60 degrees.

Equiangular Triangles: All angles measure 60 degrees but all sides could have different lengths.

Tags: 60, 90, angle, degrees, equal, equiangular, equilateral, Geometry, isosceles, length, Math, measure, right, scalene, side, triangle
Posted in Geometry | No Comments »