that's easy...you just have to add 6 and 12. then you multiply the 6 times the radical 3 which is approximately 1.7. so 6+12=18 then 1.7x6=10.2. then you add 18 and 10.2 and you get 28.2. so the perimeter of the triangle is about 28.2 you would write it out like this:
sides: 6+12+√3
perimeter: 18+√3= 28.2
The hypotenuse of a 30-60 right triangle if the short leg is 2992 is: 5984
No because the hypotenuse is used to show which line is the longest in the triangle therefore it will always be the longest.
The short leg is equal to one-half of the hypotenuse. ( sin 30 = opposite/hypotenuse = short leg/hypotenuse = 1/2)
It may be of any length but it is always the longest side in a right-angled triangle.
When considering an angle in a right angled triangle, the adjacent is the short side next to the angle and the hypotenuse is the long one (which will be opposite the right angle)
The hypotenuse of a 30-60 right triangle if the short leg is 2992 is: 5984
No because the hypotenuse is used to show which line is the longest in the triangle therefore it will always be the longest.
The short leg is equal to one-half of the hypotenuse. ( sin 30 = opposite/hypotenuse = short leg/hypotenuse = 1/2)
Short leg= hypotenuse/2 hypotenuse= short leg*2 long leg= short leg * the square root of 3
It may be of any length but it is always the longest side in a right-angled triangle.
In a 30° 60° 90° triangle, the ratio (long leg)/hypotenuse = sqrt(3)/2 ~ 0.866The ratio (short leg)/hypotenuse = 1/2 = 0.5
When considering an angle in a right angled triangle, the adjacent is the short side next to the angle and the hypotenuse is the long one (which will be opposite the right angle)
Use the sine ratio: sine 30 degrees = opposite/hypotenuse Then: opposite = 2*sine 30 degrees Answer: 1 foot
A 45-45-90 triangle is an isosceles right angled triangle. If its two short sides are of length x units then, by Pythagoras, the hypotenuse is given by: hypotenuse2 = x2 + x2 = 2x2 Taking square roots, hypotenuse = sqrt(2x2) = sqrt(2)*x
Settle down. An isosceles triangle generally doesn't have a hypotenuse, unless it also happens to be a right triangle. Where a hypotenuse does exist, there is no particular mathematical or physical significance associated with the (2/3) power of its length. But the good news is that this question is definitely in the running for the highest density of convincing, technical-sounding words in a single short sentence.
There is no single rule. It is a right angled isosceles triangle. Its long side (hypotenuse) is sqrt(2) times the short sides.
1 FT