Either 18.439 feet, or 7.211 feet depending on if the 14 foot side is connected to the right angle, or if it is the hypotenuse.
Using Pythagoras' theorem for right angle triangles then the other leg is 6 feet long
A 45 degree right triangle with a base of 16 feet 6 3/4 inches has a hypotenuse of: 23.69 inches.
The length of the hypotenuse is sqrt (85) ; a little over 9 ft.
The hypotenuse of an isosceles right triangle is 13 centimeters long. How long are its sides?
The diagonal will be the hypotenuse of a right triangle with legs 30 and 34 feet So its length is the square root of (34^2+ 30^2 )
A triangle with sides measuring ; 4 feet , 6 feet and 9 feet is a right triangle. A triangle is a right triangle as long as it has one 90 degree point.
~ 17.493 feet
Using Pythagoras' theorem for right angle triangles then the other leg is 6 feet long
The sides of the triangle measure 3 feet, 4 feet, and 5 feet. 5 feet is the longest side.
A 45 degree right triangle with a base of 16 feet 6 3/4 inches has a hypotenuse of: 23.69 inches.
The length of the hypotenuse is sqrt (85) ; a little over 9 ft.
The hypotenuse of an isosceles right triangle is 13 centimeters long. How long are its sides?
A triangle is a two dimensional object and has no volume.
The diagonal will be the hypotenuse of a right triangle with legs 30 and 34 feet So its length is the square root of (34^2+ 30^2 )
Let the Isosceles Triangle be ∆ ABC with sides AB = AC = 14', and BC = 17' Draw a line bIsecting angle BAC. This line will be perpendicular to and bisect BC at point D. Then ∆ DBA (or ∆ DCA) is a right angled triangle with AB the hypotenuse. Angle ABD = Angle ABC is one of the two equal angles of the isosceles triangle. Cos ABD = BD/AB = 8.5/14 = 0.607143, therefore Angle ABC = 52.62° The third angle of the triangle is 180 - (2 x 52.62) = 180 - 105.24 = 74.76° The angles are therefore 52.62° , 52.62° and 74.76° .
A hypotenuse is the long side of a right triange.
Third side = sqrt(402 - 182) = 35.72 m