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Right triangles (special right triangles) The special right triangle also falls under this category with its specific features. The isosceles triangle calculator is the best as it is recommended for this type of triangle. Unique triangles are so many, the isosceles triangle is among them and it also comes in different shapes. The diagram above is a sample of a unique triangle. In this case, an equilateral triangle calculator is used to calculate the parameters of this unique triangles. The equilateral triangle, with its three equal sides and 60° angles, is one of the unique triangles known. Apart from the right-angled triangle, there seem to be additional unusual triangles with unique features. This is why the right triangle is special: it contains only one hypotenuse and thus a right angle. Several features that are found in this category of unique triangles make them different from the rest of other triangles. These are triangles that are unique compared to the other triangles. A right triangle calculator will solve this problem in a simple way. The right triangle calculator, the hypotenuse calculator, and the method for calculating the right triangle's area are useless in certain situations.Īt this point, complex numbers will be needed to fill in the gaps. Two or even three side lengths may be missing from a right angle and this may be an issue at times. If you want to calculate the slope by yourself, here is the formula: The slope of each side can be calculated with a slope calculator. Now we'll look at some of the various things that can be determined from a right triangle when we use some of the features in a slope calculator.Ī triangle's sides have a certain slope or gradient. The sides of a triangle have a slope also known as the gradient in mathematics. You'll also get the area value for such a triangle as a bonus.įactors to consider when working with a right triangle Just assume the negative outcome first, the value obtained is the hypotenuse r. In the calculator, enter the values for x and y.Īfter taking the square root of the total of x and y a positive and a negative result will be obtained. Let's look at how the procedure might work if we used the right triangle calculator on this So, the area of the given triangle = 1/2 × base × height = 1/2 × 12 × 16 = 96 square units. (Hypotenuse) 2 = (base) 2 + (height) 2 (get the values of base + height)Ģ0 2 = 12 2 + (height) 2 (square both hypotenuse and base)Ĥ00 = 144 + (height) 2 (add base + height) Before using a Pythagorean Theorem calculator, let's look at an example.Įxample: Find the surface area of a right-angle triangle with 12 inches as the base and 16 inches as the hypotenuse. This means that the formula for calculating the hypotenuse is (base) 2 + (height) 2.Īlthough the hypotenuse alone cannot be used to determine the area of a right triangle, the hypotenuse can still be used to determine the area of the triangle if the base and/or height are also known. Pythagoras theorem is very clear when it comes to a right-angled triangle. Proper Rectangle Area, Hypotenuse Included