Special right triangles are right triangles whose angles or sides are in a particular ratio. They have some regular features that make calculations on it much easier. In geometry, the Pythagorean Theorem is commonly used to find the relationship between the sides of a right triangle, given by the equation: a 2 + b 2 = c 2, where a, b denotes. Therefore, this is an isosceles right triangle with the ratio of sides x: x: x Because one leg is 10, the other must also be 10, and the hypotenuse is 10, soy = 10 and z = 10. 30°− 60°− 90° right triangle. A 30°− 60°− 90° right triangle has a unique ratio of its sides.
Each black-and-red (or black-and-yellow) triangles is a special right-angled triangle. The figures outside the circle - #pi/6, pi/4, pi/3# - are the angles that the triangles make with the horizontal (x) axis. The other figures - #1/2, sqrt(2)/2, sqrt(3)/2# - are the distances along the axes - and the answers to #sin(x)# (yellow) and #cos(x)# (red) for each angle. Although all right triangles have special features – trigonometric functions and the Pythagorean theorem. The most frequently studied right triangles, the special right triangles, are the 30, 60, 90 Triangles followed by the 45, 45, 90 triangles. The 30, 60, 90 Special Right Triangle. Solve for all pieces of the special right triangles. What is the measure of angle A in the triangle, rounded to the nearest degree? The degree measure of an angle in a right triangle is x, and sin x = 1 3. Which of these expressions are also equal to 1 3?
Special Right Triangle: 45º-45º-90º Isosceles Right Triangle MathBitsNotebook.com Topical Outline | Geometry Outline | MathBits' Teacher Resources Terms of Use Contact Person:Donna Roberts |
There are two 'special' right triangles that will continually appear throughout your study of mathematics: the 30º-60º-90º triangle and the 45º-45º-90º triangle. The special nature of these triangles is their ability to yield exact answers instead of decimal approximations when dealing with trigonometric functions. This page will deal with the 45º-45º-90º triangle.
All 45º-45º-90º triangles are similar! They satisfy Angle -Angle (AA) for proving trianlges similar. |
Our first observation is that a 45º-45º-90º triangle is an 'isosceles right triangle'. This tells us that if we know the length of one of the legs, we will know the length of the other leg. This will reduce our work when trying to find the sides of the triangle. Remember that an isosceles triangle has two congruent sides and congruent base angles (in this case 45º and 45º).
Congruent 45º-45º-90º triangles are formed when a diagonal is drawn in a square. Remember that a square contains 4 right angles and its diagonal bisects the angles. If the side of the square is set to a length of 1 unit, the Pythagorean Theorem will find the length of the diagonal to be units. | |
Note: the side of the square need not be a length of 1 for the patterns to emerge. The choice of a side length of 1 simply makes the calculations easier.
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Once the sides of the 45º-45º-90º triangle are established, a series of relationships (patterns) can be identified between the sides of the triangle. ALL 45º-45º-90º triangles will possess these same patterns. These relationships will be referred to as 'short cut formulas' that can quickly answer questions regarding side lengths of 45º-45º-90º triangles, without having to apply any other strategies such as the Pythagorean Theorem or trigonometric functions. |
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Find x and y. | x is the 'other' leg (isosceles → legs equal) No formula needed. x = 9Answer | y is the hypotenuse (across from the 90º angle)
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Find x and y. | x and y are the legs (12 is the hypotenuse) x = ½ • 12 • x = 6 Answer | y is the 'other' leg (use the value for x) No formula needed. y = 6 Answer |
Find x and y. | 8is the leg (x is the 'other' leg) No formula needed. |
Notice that when you are working with a 45º-45º-90º triangle you are working with. Think of the TWO being related to the FOUR: 45, 45, When you work with 30º-60º-90º and 45º-45º-90º triangles, you will need to keep straight which radical goes with which triangle. |
I forgot the formula patterns! Now what? When working with a 45º-45º-90º triangle, you can always use the Pythagorean Theorem. Unlike the 30º-60º-90º triangle, in a 45º-45º-90º triangle you always know, or can represent, two sides of the triangle. • If you know the length of a leg, you know both legs. • If you know the length of the hypotenuse, represent the legs as x and x. The Pythagorean Theorem will always work! |
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Topical Outline | Geometry Outline | MathBitsNotebook.com | MathBits' Teacher Resources
Terms of Use Contact Person: Donna Roberts
As we know, a right triangle is a triangle whose one angle always measures 90°. The longest side opposite of a right triangle is called the hypotenuse, while the horizontal leg is called the base and the vertical leg is called the height or the altitude.
Special right triangles are right triangles whose angles or sides are in a particular ratio. They have some regular features that make calculations on it much easier.
In geometry, the Pythagorean Theorem is commonly used to find the relationship between the sides of a right triangle, given by the equation: a2 + b2 = c2, where a, b denotes the height and base of the triangle and c is the hypotenuse. But, if it is a special right triangle, we can use simpler formulas.
Some common special right triangles are shown below.
The two most common special right triangles are:
A 45-45-90 triangle is a special right triangle whose three angles measure 45°, 45° and 90°. The ratio of its side lengths (base: height: hypotenuse) is 1: 1: √2.
A 30-60-90triangle is a special right triangle whose three angles measure 30°, 60° and 90°. The ratio of its side lengths (base: height: hypotenuse) is1: √3: 2.
Apart from the above two types, there are some other special right triangles.
Some right triangles have sides that are of integer lengths and are collectively called the Pythagorean triples. Such triangles can be easily remembered and any multiple of the sides produces the same relationship. Pythagorean triples can be of three types:
Although there is no common formula for special right triangles, each of them has specific formulas for finding the missing sides, area, and perimeter based on the ratio of their side lengths. Find their formulas with solved examples in our separate articles.
Solving special right triangles is about finding the missing lengths of the sides. Instead of using the Pythagorean Theorem, we can simply use the special right triangle ratios to find the missing length. Let us understand the concept better by doing some practice problems.
The hypotenuse of a 45-45-90 triangle is 12√2 mm. Calculate the length of its base and height.
As we know,
Ratio of their Side Lengths = x: x: x√2, here x√2 = hypotenuse = 12√2 mm
Thus,
x√2 = 12√2 mm
Squaring both sides we get,
⇒ (x√2)2 = (12√2)2 mm
⇒ 2x2 = 144 x 2 = 288
⇒ x = √144 = 12 mm
Hence, the base and height of the given right triangle measure 16.97 mm each.
The longer side of a 30-60-90 right triangle is given by 5√3 cm. What is the measure of its shorter side and hypotenuse?
As we know,
Ratio of their Side Lengths = x: x√3: 2x, here x = shorter side, x√3 = longer side = 5√3 cm, 2x = hypotenuse
Thus,
x√3 = 5√3
Squaring both sides we get,
(x√3)2 = (5√3)2
⇒ 3x2 = 25 x 3
⇒ x2 = 25
⇒ x = 5 cm
The length of the hypotenuse and the other side of a right triangle are 30 cm and 24 cm, respectively. Find the length of the missing side.
As we know,
Here we have to find whether the sides are in the ratio of 3x: 4x: 5x
Thus,
?: 24: 30 = ?: 4(6): 5(6)
Thus, the sides are in the ratio of 3x: 4x: 5x and it is a 3-4-5 triangle.
For calculating the third side,
For, n = 6
Hence, the length of the other side,
3x = 3 x 6 = 18
Therefore the length of the missing side is 18 cm.
If the two sides of a right triangle are 3 ft and 4 ft, find the length of hypotenuse.
As we know,
Here we have to find whether the sides are in the ratio of 3x: 4x: 5x
3: 4: ? = 3(1): 4(1): ?
Thus, the sides are in the ratio of 3x: 4x: 5x and it is a 3-4-5 triangle
For calculating the hypotenuse,
For, n = 1
Hence, the length of the hypotenuse,
5x = 5 x 1 = 5
Therefore the length of the hypotenuse is 5 ft