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What can be the ratio of the length of the longer leg of a 30-60-90 triangle?
Wiki User
∙ 12y ago
the ratios in such a triangle are 1:2:sqrt(3)
so the longest length is opposite the 90 degree angle and is twice as large as the length opposite the 30 degree angle
Wiki User
∙ 12y ago
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HOW do you find the similar ratio of a triangle?
Divide the length of a side of one triangle by the length of the corresponding side of the other triangle.
What is the ratio between the lengths of the two legs of ab30-60-90 triangle?
The length of the longer leg equals the length of the shorter leg times the square root of three.
What is the ratio of length to width in a golden triangle?
5to3
What could be a ratio of the length of the longer-leg of a 30-60-90 triangle to the length of its hypotenuse?
In such a triangle, the sides will always be in the ratio, 1, 2 (hypotenuse) and sqrt(3) So the ratio you want is sqrt(3)/2
What could be the ratio of the length of the longer leg of a 30-60-90 triangle to the length?
Assuming that 30-60-90 refers to the angles (in degrees), the ratio of the longer leg to the hypotenuse would be 1:cosine(30) = 1:sqrt(3)/2 or 2:sqrt(3)
What could be the ratio of the length of of the longer leg of a 30 60 90 triangle to the length of its hypotenuse?
In a 30° 60° 90° triangle, the ratio (long leg)/hypotenuse = sqrt(3)/2 ~ 0.866The ratio (short leg)/hypotenuse = 1/2 = 0.5
What could be the ratio of the length of the longer leg of a 30-60-90 triangle to the length of its hypotenuse?
2 Square Root 3 And 4
What is the ratio of the length of the longer leg of a 30-60-90 triangle to the length of its hypotenuse?
1/2 sqrt(3) = 0.866 (rounded)
What could the ratio of the length of the longer leg of a 30 60 90 triangle to the length of its hypotenuse?
1/2 sqrt(3) = 0.866 (rounded)
The ratio of the length of the longer leg of a 30-60-90 triangle to the length of its hypotenuse?
Starting with an equilateral triangle of side 2, dropping a perpendicular from one vertex to the opposite base creates two equal right angled triangles with hypotenuse of length 2, base length 1 and height of length √(22 - 12) = √3 which is the longer leg of the 30-60-90 triangle. Thus the ratio of longer_leg : hypotenuse is √3 : 2
HOW do you find the similar ratio of a triangle?
Divide the length of a side of one triangle by the length of the corresponding side of the other triangle.
What is the ratio between the lengths of the two legs of ab30-60-90 triangle?
The length of the longer leg equals the length of the shorter leg times the square root of three.
What is the ratio of length to width in a golden triangle?
5to3
What could be a ratio of the length of the longer-leg of a 30-60-90 triangle to the length of its hypotenuse?
In such a triangle, the sides will always be in the ratio, 1, 2 (hypotenuse) and sqrt(3) So the ratio you want is sqrt(3)/2
What could be the ratio of the length of the longer leg of a 30-60-90 triangle to the length?
Assuming that 30-60-90 refers to the angles (in degrees), the ratio of the longer leg to the hypotenuse would be 1:cosine(30) = 1:sqrt(3)/2 or 2:sqrt(3)
What is the smallest angle of a triangle with a ratio of 2 to 3 to 4?
It depends on whether the ratio refers to the angles of the triangle or the length of the sides.
Is a 56 ft 65 ft 16ft triangle a right angle triangle?
The ratio of the length of the side of a right angle triangle must be 3,4,5 16,56,65 are not in that ratio.
