It is known that one right side of a right triangle is 6, and the corresponding angle of this right side is 18 degrees. Find the length of another right side and hypotenuse The right angle side and the hypotenuse take the smallest value

It is known that one right side of a right triangle is 6, and the corresponding angle of this right side is 18 degrees. Find the length of another right side and hypotenuse The right angle side and the hypotenuse take the smallest value

Let the right angle side be a, the adjacent right angle side be B, and the hypotenuse side be c. let the angle directly opposite the right angle side be α, then sin α = A / C, hypotenuse length C = 19.417, and the adjacent right angle side B = 18.466

For a right triangle, the lengths of the two right sides are 4cm and 5cm respectively. Now take one of the right sides as a rotation, the right triangle is swept
How many cubic centimeters is the maximum space

1, take 5 as axis, v = 1 / 3 π * 4 & # 178; * 5 = 80 / 3 π
2, take 4 as axis, v = 1 / 3 π * 5 & # 178; * 4 = 100 / 3 π

Given that the side length of a right triangle with an angle of 11 degrees is 4 meters, what is the side length of a right triangle with an angle of 90 degrees?

In a right triangle, if the side opposite an angle divided by the hypotenuse is equal to the sine value of the angle, then the length of the hypotenuse in the question is 4 m △ sin11 degrees. Looking up the sine table, the value of sin11 degrees is 0.191, then the length of the hypotenuse is 20.94 M