What are the angles of the three angles of a right triangle with an aspect ratio of 345

What are the angles of the three angles of a right triangle with an aspect ratio of 345

37 53 90

In a right triangle, if the length of the side to which the angle of 60 degrees is opposite is 6cm, then the height of the hypotenuse is?

The results show that the length of the three sides of the triangle a * a + b * b = C * C = 2A * 2A. The ratio of the length of the three sides is 3:1:2
Therefore, we know that the short right angle side length = 6 / root 3 = 2 root sign 3
So the height on the hypotenuse = 2 root sign 3 / 2 * root sign 3 = 3

If the area of a right triangle is 10 and the sum of two right sides is 9, then the length of the oblique side is___ .

If X-9 is a right angle, let X be the other side
2x（9-x）=10
The solution is x = 4 or x = 5
The other right side is 5 or 4
According to the Pythagorean theorem, the length of the slanted side is
42+52=
41．

A right triangle. The length of the side opposite the right angle is 10 cm, and the other two sides are 8 cm and 6 cm respectively______ Centimeter

8 × 6 △ 2 = 24 (square centimeter),
24 × 2 △ 10 = 4.8 (CM);
A: the height on the opposite side of the right angle is 4.8 cm
Therefore, the answer is: 4

If the length of the hypotenuse is 10, then the height of the hypotenuse is___ .

Let the height on the hypotenuse be x cm
10x÷2=6×8÷2，
X = 4.8
The height on the bevel is 4.8
So the answer is 4.8

Given that the length of the hypotenuse of a right triangle is 10 and the sum of the lengths of the two right sides is 14, find the height on the hypotenuse of the right triangle

We assume that the length of the hypotenuse is 10, so we assume that the length of the side is a and the height of B is C. Therefore, the Pythagorean theorem a * a + b * b = 100 (1), and a + B = 14 (2). From the formula of direct triangle area, we can get a * b = C * hypotenuse, that is, a * b = 10C, (2) square - (1) can get a * b = 48, so C = 4.8

The length of the hypotenuse of a right triangle is 10 meters. The lengths of the two right sides are 6 meters and 8 meters respectively. What is the height of the hypotenuse

The area of the triangle is
4 square meters (2 × 6)
The height on the bevel is
24 × 2 △ 10 = 4.8 (m)

Given that the length of the two sides of an isosceles right triangle is 2 meters, find the area

A:
The two sides of a right angled triangle are two meters long
Then the length of two right angles a = b = 2
So: Area s = AB / 2 = 2 square meters

The two right sides of a right triangle are 3cm and 4cm respectively, and the height on the hypotenuse is 2.4cm. How many meters is its hypotenuse?

Area = 3 * 4 = 12
12/2.4=5cm

A right triangle is known to have a side length of 600 for an angle of 60 degrees. Find the side length of an angle pair of 30 degrees

600 / Tan 60 ° = 200 pieces 3 = 346.4