The curvature of a straight line is
Answers
Answer:
A straight line has zero curvature.
Step-by-step explanation:
The curvature at a point is normally a scalar quantity, that is, it is expressed by a single real integer, as opposed to the tangent, which is a vector quantity.
Depending on how you define success, maybe.
In hyperbolic geometry, all particular circles are assumed to be straight due to a particular defining or modelling metric function.
The curvature becomes sharper the smaller the radius.
Therefore, if a line has zero curvature and is constant, it is a straight line since it has zero rate of change in direction at any point along its length and does not change direction at any point.
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Answer:
let us consider the equation of straight line,y= mx+c
Differentiating we get , y'= m , y"= 0
Formula of curvature is given by, k= ||y"||/ (1+(y')^2)^3/2
substitute the values we get , k= 0
hence the curvature of the straight line is zero