To find the length of the diagonal of a rectangle, we can use the Pythagorean theorem, which states that the square of the length of the diagonal is equal to the sum of the squares of the lengths of the two sides. In this case, the diagonal length (d) can be calculated as follows: d^2 = 30^2 + 50^2. Therefore, d^2 = 900 + 2500 = 3400. Taking the square root of 3400 gives us the diagonal length, which is approximately 58.3 feet.
134.6 feet
Assuming that the 40 and 30 refer to sides of a rectangle and not to any of the infinite number of other possible shapes, the answer is 50.
53.85164807' by means of Pythagoras.
57.3062 ft
A rectangle doesn't have a hypotenuse.The diagonal of this one is sqrt(6,100) = 78.1025 (rounded)
134.6 feet
Assuming that the 40 and 30 refer to sides of a rectangle and not to any of the infinite number of other possible shapes, the answer is 50.
Use Pythagoras' theorem:- 502+302 = 3400 and the square root of this is the length of the diagonal which is about 58.309 feet to 3 dp
53.85164807' by means of Pythagoras.
57.3062 ft
Ah, let's paint a happy little picture here! To find the diagonal of a rectangle, we can use the Pythagorean theorem. So for a 30x40 building, we can calculate the diagonal using the formula: √(30^2 + 40^2) = √(900 + 1600) = √2500 = 50 feet. Just like that, we've added a lovely diagonal to our building!
Using Pythagoras theorem its length is 40 cm and so 2(40+30) = 140 cm which is its perimeter
A rectangle doesn't have a hypotenuse.The diagonal of this one is sqrt(6,100) = 78.1025 (rounded)
Width would be 14 cm
Assuming the lengths refer to the sides of a rectangle (rather than some other shape), the length of the diagonal is sqrt(50^2 + 100^2) = 50*sqrt(1^2 + 2^2) = 50*sqrt(5) = 111.80, rounded to 2 decimal places.
It is 10 metres.
50 cm2