Now that we know what a right triangle is and what the special right triangles are, it is time to discuss them individually. Let’s see what a 45°-45°-90° triangle is. Show What is a 45°-45°-90° Triangle?A 45°-45°-90° triangle is a special right triangle that has two 45-degree angles and one 90-degree angle. The side lengths of this triangle are in the ratio of; Side 1: Side 2: Hypotenuse = n: n: n√2 = 1:1: √2. The 45°-45°-90° right triangle is half of a square. This is because the square has each angle equal to 90°, and when it is cut diagonally, the one angle remains as 90°, and the other two 90° angles bisected (cut into half) and become 45° each. The diagonal of a square becomes hypotenuse of a right triangle, and the other two sides of a square become the two sides (base and opposite) of a right triangle. The 45°-45°-90° right triangle is sometimes referred to as an isosceles right triangle because it has two equal side lengths and two equal angles. We can calculate the hypotenuse of the 45°-45°-90° right triangle as follows: Let side 1 and side 2 of the isosceles right triangle be x. Apply the Pythagorean Theorem a2 + b2 = c2, where a and b are side 1 and 2 and c is the hypotenuse. x2 + x2 = 2x2 Find the square root of each term in the equation √x2 + √x2 = √(2x2) x + x = x √2 Therefore, the hypotenuse of a 45°; 45°; 90° triangle is x √2 How to Solve a 45°-45°-90° Triangle?Given the length of one side of a 45°-45°-90° triangle, you can easily calculate the other missing side lengths without resorting to the Pythagorean Theorem or trigonometric methods functions. Calculations of a 45°-45°-90° right triangle fall into two possibilities: To calculate the length of hypotenuse when given the length of one side, multiply the given length by √2. When given the length of the hypotenuse of a 45°-45°-90° triangle, you can calculate the side lengths by simply dividing the hypotenuse by √2. Note: Only the 45°-45°-90° triangles can be solved using the 1:1: √2 ratio method. Example 1 The hypotenuse of a 45°; 45°; 90° triangle is 6√2 mm. Calculate the length of its base and height. Solution Ratio of a 45°; 45°; 90° triangle is n: n: n√2. So, we have; ⇒ n√2 = 6√2 mm Square both sides of the equation. ⇒ (n√2)2 = (6√2)2 mm ⇒ 2n2 = 36 * 2 ⇒ 2n2 = 72 n2 = 36 Find the square root. n = 6 mm Hence, the base and height of the right triangle are 6 mm each. Example 2 Calculate the right triangle’s side lengths, whose one angle is 45°, and the hypotenuse is 3√2 inches. Solution Given that one angle of the right triangle is 45 degrees, this must be a 45°-45°-90° right triangle. Therefore, we use the n: n: n√2 ratios. Hypotenuse = 3√2 inches = n√2; Divide both sides of the equation by √2 n√2/√2 = 3√2/√2 n = 3 Hence, the length of each side of the triangle is 3 inches. Example 3 The shorter side of an isosceles right triangle is 5√2/2 cm. What is the diagonal of the triangle? Solution An isosceles right triangle is the same as the 45°-45°-90° right triangle. So, we apply the ratio of n: n: n√2 to calculate the hypotenuse’s length. Given that n = 5√2/2 cm; ⇒ n√2 = (5√2/2) √2 ⇒ (5/2) √ (2 x 2) ⇒ (5/2) √ (4) ⇒ (5/2)2 = 5 Hence, the two legs of the triangle are 5 cm each. Example 4 The diagonal of a 45°-45°-90°right triangle is 4 cm. What is the length of each of the legs? Solution Divide the hypotenuse by √2. ⇒ 4/√2 ⇒ √4/√2 ⇒ 4√2/2 = 2√2 cm. Example 5 The diagonal of a square is 16 inches, calculate the length of the sides, Solution Divide the diagonal or hypotenuse by √2. ⇒ 16/√2 ⇒ 16√2/√2 = 8√2 Hence, the length of the legs is 8√2 inches each. Example 6 The angle of elevation of the top of a story building from a point on the ground 10 m from the base of the building is 45 degrees. What is the height of the building? Solution Given one angle as 45 degrees, assume a 45°- 45°-90°right triangle. Apply the n: n: n√2 ratio where n = 10 m. ⇒ n√2 = 10√2 Therefore, the height of the building is 10√2 m. Example 7 Find the length of the hypotenuse of a square whose side length is 12 cm. Solution To get the length of the hypotenuse, multiply the side length by √2. ⇒ 12 √2 = 10 √2 Hence, the diagonal is 10 √2 cm. Example 8 Find the lengths of the other two sides of a square whose diagonal 4√2 inches. Solution A half of a square makes a 45°- 45°-90°right triangle. Therefore, we use the n: n: n√2 ratios. n√2 = 4√2 inches. divide both sides by √2 n = 4 Hence, the side lengths of the square are 4 inches each. Example 9 Calculate the diagonal of a square flower garden whose side length is 30 m. Solution Apply the n: n: n√2 ratio, where n = 30. ⇒ n√2 = 30 √2 Therefore, the diagonal is equal to 30 √2 m Page 2
When you’re done with and understand what a right triangle is and other special right triangles, it is time to go through the last special triangle — the 30°-60°-90° triangle. It also carries equal importance to the 45°-45°-90° triangle due to the relationship of its side. It has two acute angles and one right angle. What is a 30-60-90 Triangle?A 30-60-90 triangle is a special right triangle whose angles are 30º, 60º, and 90º. The triangle is special because its side lengths are always in the ratio of 1: √3:2. Any triangle of the form 30-60-90 can be solved without applying long-step methods such as the Pythagorean Theorem and trigonometric functions. The easiest way to remember the ratio 1: √3: 2 is to memorize the numbers; “1, 2, 3”. One precaution to using this mnemonic is to remember that 3 is under the square root sign. From the illustration above, we can make the following observations about the 30-60-90 triangle:
How to Solve a 30-60-90 Triangle?Solving problems involving the 30-60-90 triangles, you always know one side, from which you can determine the other sides. For that, you can multiply or divide that side by an appropriate factor. You can summarize the different scenarios as:
This means the shorter side acts as a gateway between the other two sides of a right triangle. You can find the longer side when the hypotenuse is given or vice versa, but you always have to find the shorter side first. Also, to solve the problems involving the 30-60-90 triangles, you need to be aware of the following properties of triangles:
⇒ c2 = x2 + (x√3)2 ⇒ c2 = x2 + (x√3) (x√3) ⇒ c2 = x2 + 3x2 ⇒ c2 = 4x2 Find the square root of both sides. √c2 = √4x2 c = 2x Hence, proved. Let’s work through some practice problems. Example 1 A right triangle whose one angle is 60 degrees has the longer side as 8√3 cm. Calculate the length of its shorter side and the hypotenuse. Solution From the ratio x: x√3: 2x, the longer side is x√3. So, we have; x√3 = 8√3 cm Square both sides of the equation. ⇒ (x√3)2 = (8√3)2 ⇒ 3x2 = 64 * 3 ⇒ x 2 = 64 Find the square of both sides. √x2 = √64 x = 8 cm Substitute. 2x = 2 * 8 = 16 cm. Hence, the shorter side is 8 cm, and the hypotenuse is 16 cm. Example 2 A ladder leaning against a wall makes an angle of 30 degrees with the ground. If the length of the ladder is 9 m, find; a. The height of the wall. b. Calculate the length between the foot of the ladder and the wall. Solution One angle is 30 degrees; then this must be a 60°- 60°- 90°right triangle. Ratio = x: x√3: 2x. ⇒ 2x = 9 ⇒ x = 9/2 = 4.5 Substitute. a. The height of the wall = 4.5 m b. x√3 = 4.5√3 m Example 3 The diagonal of a right triangle is 8 cm. Find the lengths of the other two sides of the triangle given that one of its angles is 30 degrees. Solution This is must be a 30°-60°-90° triangle. Therefore, we use the ratio of x: x√3:2x. Diagonal = hypotenuse = 8cm. ⇒2x = 8 cm ⇒ x = 4cm Substitute. x√3 = 4√3 cm The shorter side of the right triangle is 4cm, and the longer side is 4√3 cm. Example 4 Find the value of x and z in the diagram below: Solution The length measuring 8 inches will be the shorter leg because it is opposite the 30-degree angle. To find the value of z (hypotenuse) and y (longer leg), we proceed as follows; From the ratio x: x√3:2x; x = 8 inches. Substitute. ⇒ x√3 = 8√3 ⇒2x = 2(8) = 16. Hence, y = 8√3 inches and z = 16 inches. Example 5 If one angle of a right triangle is 30º and the shortest side’s measure is 7 m, what is the measure of the remaining two sides? Solution This is a 30-60-90 triangle in which the side lengths are in the ratio of x: x√3:2x. Substitute x = 7m for the longer leg and the hypotenuse. ⇒ x √3 = 7√3 ⇒ 2x = 2(7) =14 Hence, the other sides are 14m and 7√3m Example 6 In a right triangle, the hypotenuse is 12 cm, and the smaller angle is 30 degrees. Find the length of the long and short leg. Solution Given the ratio of the sides = x: x√3:2x. 2x = 12 cm x = 6cm Substitute x = 6 cm for the long and short leg to get; Short leg = 6cm. long leg = 6√3 cm Example 7 The two sides of a triangle are 5√3 mm and 5mm. Find the length of its diagonal. Solution Test the ratio of the side lengths if it fits the x: x√3:2x ratio. 5: 5√3:? = 1(5): √3 (5):? Therefore, x = 5 Multiply 2 by 5. 2x = 2* 5 = 10 Hence, the hypotenuse is equal to 10 mm. Example 8 A ramp that makes an angle of 30 degrees with the ground is used to offload a lorry that is 2 feet high. Calculate the length of the ramp. Solution This must be a 30-60-90 triangle. x = 2 feet. 2x = 4 feet Hence, the length of the ramp is 4 feet. Example 9 Find the hypotenuse of a 30°- 60°- 90° triangle whose longer side is 6 inches. Solution Ratio = x: x√3:2x. ⇒ x√3 = 6 inches. Square both sides ⇒ (x√3)2 = 36 ⇒ 3x2 = 36 x2 = 12 x = 2√3 inches. Practice Problems
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