Using Pythagoras' theorem it works out as 6 feet
The other leg is 60.6 feet.
The length of the hypotenuse is sqrt (85) ; a little over 9 ft.
It is a right angle triangle and by using Pythagoras' theorem the length of its hypotenuse is 10 feet.
Short leg is 6 feet.
Using Pythagoras' theorem for right angle triangles then the other leg is 6 feet long
The length of the other leg is 60.62 feet.
The length of the hypotenuse of a right triangle that has a base of 3 feet and a height of 12 feet is: 12.37 feet.
The hypotenuse is 14.14 feet.
The other leg is 60.6 feet.
~ 17.493 feet
The length of the hypotenuse is sqrt (85) ; a little over 9 ft.
It is a right angle triangle and by using Pythagoras' theorem the length of its hypotenuse is 10 feet.
Short leg is 6 feet.
Using Pythagoras' theorem for right angle triangles then the other leg is 6 feet long
Isosceles triangles have two sides which are the same length and two angles which are equal. So if your right triangle has one side of length 2 feet, which is not the hypotenuse, then the remaining side must also be 2 feet long. We know that the square of the length of the hypotenuse is equal to the squares of the other two sides. 2 squared is 4. So the squares of the two sides are 4 + 4 which equals 8. Now we just find the square root of 8, which is 2.8284... So the length of the hypotenuse is 2.83 Feet (to two decimal places). Or, In a right isosceles triangle, the two base angles equal 45°. Since the length leg is 2 ft, then the hypotenuse length would be equal to 2√2 or approximately to 2.83 ft. sin 45° = leg/hypotenuse hypotenuse = 2/sin 45° hypotenuse = 2/(√2/2) hypotenuse = 4/√2 hypotenuse = 4√2/2 hypotenuse = 2√2 °
The shorter leg is 9 feet long
The shorter leg is 6 feet long