What is the height of the hypotenuse of a right triangle if its two right sides are 5 and 12 respectively

What is the height of the hypotenuse of a right triangle if its two right sides are 5 and 12 respectively

60/13

If the lengths of the two right sides of a right triangle are 5 and 12, then the height on the hypotenuse is______ .

In a right triangle, two right sides are known to be 5, 12,
The length of the oblique side is
52+122=13，
According to the area method, the area of a right triangle can be evaluated according to the two right angles, the hypotenuse and the height on the hypotenuse,
Then the product of two right angles = the length of the oblique side × the length of the high line on the inclined side,
Length of high line on bevel = 5 × 12
13=60
13，
So the answer is: 60
13．

If the lengths of the two right sides of a right triangle are 5 and 12, then the height on the hypotenuse is______ .

In a right triangle, two right sides are known to be 5, 12,
The length of the oblique side is
52+122=13，
According to the area method, the area of a right triangle can be evaluated according to the two right angles, the hypotenuse and the height on the hypotenuse,
Then the product of two right angles = the length of the oblique side × the length of the high line on the inclined side,
Length of high line on bevel = 5 × 12
13=60
13，
So the answer is: 60
13．

If the two right sides of a right triangle are 5 and 12, the length of the center line on the hypotenuse is

According to the Pythagorean theorem, the hypotenuse is 13. According to the right triangle, the median line of the hypotenuse is equal to half of the hypotenuse, and the median line is 6.5

The angle of a right triangle is 20 degrees. The long side of the right angle side is 8. What is the short side?

A right triangle is known to have an angle of 20 degrees between a right angle side and an oblique side, and the long side of the right angle side is 8. Find the length of the other right angle side
The length of the other right angle side = Tan (20 °) * 8 = 2.9117618741296

There is a right triangle with a hypotenuse of 22cm. The difference between the two right sides is 6cm. Find out its area

Four identical right triangles are analyzed and solved to form a square, as shown in Figure 3
(22 ^ 2-6 ^ 2) △ 4 = 112 (cm ^ 2)
Look at example 3

A right triangle has a right angle of 22.455 and an acute angle of 19 degrees. Find out the length of its other right angle?

Assume that the known angles and edges are relative
Length of the other right angle side = 22.455 * CTN (19 °)
=65.214

A square red paper with a side length of 66cm. If you call it two right triangle red flags with right angles of 33cm and 22cm, respectively, How many can I cut?

12
One side is divided into three equal parts, so are the opposite sides; the other two are bisected, and then connected with the bisection points of opposite sides, six rectangles with side lengths of 33cm and 22cm can be obtained

In a right triangle, both sides of the right angle are one meter. Find the length of the other side. Don't answer two meters

According to Pythagorean theorem, the square of a + the square of B = the square of C
The square of C = 1 + 1
C = radical 2
On the other side, the length of the hypotenuse is root 2

There is a right triangle. The length of two right angle sides is two prime numbers. The sum of them is 12cm. What is the area of this right triangle? Hand in tomorrow

Since the two right angle sides are two prime numbers and their sum is 12cm, then only one is 5cm and the other is 7cm. Therefore, the area is 5 × 7 △ 2 = 17.5cm2