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The relationship between the length (L) and radius (r) of an ideal transition curve is given by
- a)L ∝ r
- b)L ∝ r2
- c)L ∝ (1/r)
- d)L ∝ (1/r2)
Correct answer is option 'C'. Can you explain this answer?
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The relationship between the length (L) and radius (r) of an ideal tra...
The relationship between the length (L) and radius (r) of an ideal transition curve is given by:
L = (2πr)/K
where K is the degree of curvature of the curve in radians per unit length. The degree of curvature is related to the radius of the curve by:
K = 1/r
Therefore, the relationship between L and r can also be expressed as:
L = (2π)/K^2
This equation shows that the length of the transition curve decreases as the radius of the curve increases or as the degree of curvature decreases. It also shows that the length of the curve is inversely proportional to the square of the degree of curvature.
L = (2πr)/K
where K is the degree of curvature of the curve in radians per unit length. The degree of curvature is related to the radius of the curve by:
K = 1/r
Therefore, the relationship between L and r can also be expressed as:
L = (2π)/K^2
This equation shows that the length of the transition curve decreases as the radius of the curve increases or as the degree of curvature decreases. It also shows that the length of the curve is inversely proportional to the square of the degree of curvature.
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The relationship between the length (L) and radius (r) of an ideal transition curve is given bya)L∝ rb)L∝ r2c)L∝ (1/r)d)L∝ (1/r2)Correct answer is option 'C'. Can you explain this answer?
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