Wiki User
∙ 14y agoEither 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.
Wiki User
∙ 14y agoUsing 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?
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 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° .
Third side = sqrt(402 - 182) = 35.72 m
A hypotenuse is the long side of a right triange.