Sagitta (geometry) should not be confused with Sagitta (optics).
In geometry, the sagitta (sometimes abbreviated as sag[1]) of a circular arc is the distance from the midpoint of the arc to the midpoint of its chord. It is used extensively in architecture when calculating the arc necessary to span a certain height and distance and also in optics where it is used to find the depth of a spherical mirror or lens. The name comes directly from Latin sagitta, meaning an "arrow".
In the following equations,
s
r
l
\tfrac12l
r-s
r
r2=\left(\tfrac12l\right)2+\left(r-s\right)2.
\begin{align} s&=r-\sqrt{r2-\tfrac14l2},\\[10mu] l&=2\sqrt{2rs-s2},\\[5px] r&=
| s2+\tfrac14l2 | |
| 2s |
=
| s | + | |
| 2 |
| l2 | |
| 8s |
. \end{align}
s=r\operatorname{versin}\theta=r\left(1-\cos\theta\right)=
| ||||
| 2r\sin |
When the sagitta is small in comparison to the radius, it may be approximated by the formula[2]
s ≈
| l2 | |
| 8r |
.
Alternatively, if the sagitta is small and the sagitta, radius, and chord length are known, they may be used to estimate the arc length by the formula
a ≈ l+
| 2s2 | |
| r |
≈ l+
| 8s2 | |
| 3l |
,
Architects, engineers, and contractors use these equations to create "flattened" arcs that are used in curved walls, arched ceilings, bridges, and numerous other applications.
The sagitta also has uses in physics where it is used, along with chord length, to calculate the radius of curvature of an accelerated particle. This is used especially in bubble chamber experiments where it is used to determine the momenta of decay particles. Likewise historically the sagitta is also utilised as a parameter in the calculation of moving bodies in a centripetal system. This method is utilised in Newton's Principia.