Yes providing that it is a right angle triangle in accordance with Pythagoras' theorem
The side opposite the right triangle is the hypotenuse. The formula for finding the hypotenuse is A squared plus B squared equal C squared. C is the hypotenuse. If side A is 3 and side B is 4, the equation would read 9 plus 16 equal C squared, or 25 equals C squared. The square of 25 is 5, so the hypotenuse is 5.
you square the hypotenuse and find two numbers when squared and then added together equal the hypotenuse squared then the numbers before they were squared are the two legs
In a right angle triangle the base squared (a) plus the height squared (b) is equal to the hypotenuse squared (c) Pythagoras' theorem: a2+b2 = c2
The hypotenuse of a right angle triangle when squared is equal to the base squared plus the height squared and the formula is usually given as:- a2+b2 = c2 whereas a and b are the base and height respectively and c being the hypotenuse which is the largest side
In a right angled triangle its hypotenuse when squared is equal to the sum of its squared sides which is Pythagoras' theorem for a right angle triangle.
The side lengths of a right triangle, squared, then added together, is equal to the hypotenuse squared.
For any right angle triangle its hypotenuse when squared is equal to the sum of its squared sides.
It states that for any right angle triangle that its hypotenuse when squared is equal to the sum of its squared sides.
That a right angle triangle's base when squared plus its height when squared is equal to its hypotenuse when squared:- a2+b2 = c2
That for any right angle triangle when its hypotenuse is squared it is equal to the sum of its squared sides.
In a right angle triangle the square of the hypotenuse is equal to height squared plus base squared
That for any right angle triangle the length of its hypotenuse when squared is equal to the of length of the base when squared plus the length of the height when squared:- a2+b2 = c2 where a and b are the base and the height of the triangle and c is its hypotenuse.