3 times the square root of 2 which is about 4.242640687 cm
Solved with the help of Pythagoras' theorem.
An isosceles right triangle will always have its shorter sides of the same length, and the hypotenuse will always be this length times sin(45o) or times the square root of 0.5.
If the hypotenuse is the square root of three, then the legs are (root 6)/2. If the hypotenuse is 12, then the legs are 6(root 2). This is because, for any given right isosceles triangle, the length of the hypotenuse x is root two times the length of the legs.
The longest length would be the hypotenuse. You can use SOHCAHTOA to find the length.
11.489
The length of the hypotenuse works out as 17 miles
the answer is 8
in an isosceles triangle, if the legs have length L, then the hypotenuse has length L square root of 2
An isosceles right triangle will always have its shorter sides of the same length, and the hypotenuse will always be this length times sin(45o) or times the square root of 0.5.
The length of the hypotenuse, alone, is not sufficient to determine the area of a triangle.
If the hypotenuse is the square root of three, then the legs are (root 6)/2. If the hypotenuse is 12, then the legs are 6(root 2). This is because, for any given right isosceles triangle, the length of the hypotenuse x is root two times the length of the legs.
If the legs of a right triangle have measures of 9 and 12, the hypotenuse is: 15
For isosceles triangle both legs are the same, 10 cm. The hypotenuse is square root of sum of legs squared, = sqrt (10 squared + 10 squared) = 14.1 cm
The longest length would be the hypotenuse. You can use SOHCAHTOA to find the length.
An Isosceles right triangle. If the length of either of the two sides is N then the hypotenuse is N times the square root of 2. an isosceles right triangle can not be an equilateral triangle since the hypotenuse can not be the same size as the other two sides..
It is sqrt(2).
11.489
Using Pythagoras' theorem the length of the hypotenuse is 17.1 inches