Sin is the opposite over the hypotenuse.
Sin is sin-1(opposite/hypotonose)
when you have a right triangle and one of the two non-right angles is theta, sin(theta) is the side of the triangle opposite theta (the side not touching theta) divided by the side that does not touch the right angle
Yes the given dimensions complies with Pythagoras' theorem for a right angle triangle.
No because the given dimensions do not comply with Pythagoras' theorem for a right angle triangle.
The dimensions given fits that of a right angle triangle and sin^-1(12/13) = 67.38 degrees
Sin is the opposite over the hypotenuse.
sin, tan and cos can be defined as functions of an angle. But they are not functions of a triangle - whether it is a right angled triangle or not.
Sin is sin-1(opposite/hypotonose)
when you have a right triangle and one of the two non-right angles is theta, sin(theta) is the side of the triangle opposite theta (the side not touching theta) divided by the side that does not touch the right angle
The Sine function (abbreviated sin) takes an angle and gives a ratio which is based on the sides of a right triangle. If you have a right triangle, and one of the angles (not the right angle) is labeled y then sin y equals the length of the side opposite of angle y divided by the length of the hypotenuse. The hypotenuse of a right triangle is the longest side, and is always opposite of the right angle.
It means the ratio of the opposite angle to the hypotenuse of a triangle for angle "x". This is for a right triangle.
Yes the given dimensions complies with Pythagoras' theorem for a right angle triangle.
A triangle can be constructed into any of the given formats.
No because the given dimensions do not comply with Pythagoras' theorem for a right angle triangle.
Answer the answer is Herons formula:Area=sqrt(sin(sin-a)+(sin-b)+(sin-c) where a ,b, c are the measurement of the sides.just input the measurement of the sides in the formula and you will have your answer.here you can calculate the area of a triangle with out height.
Given that there is no "this" given in the question, it is impossible to say!