Newton's minimal resistance problem

While a solid of least resistance must satisfy (1), the converse is not true. Fig. 2 shows the family of curves that satisfy it for different values of ${\displaystyle K_{1}>0}$. As ${\displaystyle K_{1}}$ increases the radius, Bg = h, of the disc at x = L decreases and the curve becomes steeper.

Directly before the minimum resistance problem, Newton stated that if on any elliptical or oval figure rotated about its axis, p becomes greater than unity, one with less resistance can be found. This is achieved by replacing the part of the solid that has p > 1 with the frustum of a cone whose vertex angle is a right angle, as shown in Fig. 2 for curve ${\displaystyle D\nu \phi \gamma B}$. This has less resistance than ${\displaystyle D\nu \phi \Gamma B}$. Newton does not prove this, but adds that it might have applications in shipbuilding. Whiteside supplies a proof and contends that Newton would have used the same reasoning.

In Fig. 2, since the solid generated from the curve Dng satisfies the minimum condition and has p < 1 at g, it experiences less resistance than that from any other curve with the same end point g. However, for the curve DνΓ, with p > 1 at end point Γ, this is not the case for although the curve satisfies the minimum condition, the resistance experienced by φγ and γΓ together is less than that by φΓ.

Newton concluded that of all solids that satisfy the minimum resistance condition, the one experiencing the least resistance, DNG in Fig. 2, is the one that has p = 1 at G. This is shown schematically in Fig. 3 where the overall resistance of the solid varies against the radius of the front surface disc, the minimum occurring when h = BG, corresponding to p = 1 at G.

In the Principia, in Fig. 1 the condition for the minimum resistance solid is translated into a geometric form as follows: draw GR parallel to the tangent at N, so that ${\displaystyle p={\frac {GB}{BR}}}$, and equation (1) becomes: ${\displaystyle {\frac {NM.GB^{3}}{BR^{3}(1+(GB/BR)^{2})^{2}}}={\frac {NM.BR.GB^{3}}{GR^{4}}}=K_{1}}$

At G, ${\displaystyle NM=BG}$, ${\displaystyle BR=BC=BG}$, and ${\displaystyle GR^{2}=2BG^{2}}$, so ${\displaystyle {\frac {NM.BR.GB^{3}}{GR^{4}}}={\frac {GB}{4}}=K_{1}}$ which appears in the Principia in the form:

${\displaystyle {\frac {NM}{GR}}={\frac {GR^{3}}{4BR.GB^{2}}}}$

Although this appears fairly simple, it has several subtleties that have caused much confusion.

In Fig 4, assume DNSG is the curve that when rotated about AB generates the solid whose resistance is less than any other such solid with the same heights, AD = H, BG = h and length, AB = L.

Fig. 5. shows the infinitesimal region of the curve about N and I in more detail. Although NI, Nj and NJ are really curved, they can be approximated by straight lines provided NH is sufficiently small.

Let HM = y, AM = x, NH = u, and HI = w = dx. Let the tangent at each point on the curve, ${\displaystyle p=-{\frac {dy}{dx}}={\frac {u}{w}}}$. The reduction of the resistance of the sloping ring NI compared to the vertical ring NH rotated about AB is ${\displaystyle r={\frac {yp^{3}}{1+p^{2}}}dx={\frac {yu^{3}}{u^{2}+w^{2}}}}$ (2)

Let the minimum resistance solid be replaced by an identical one, except that the arc between points I and K is shifted by a small distance to the right ${\displaystyle IJ=KL=o>0}$, or to the left ${\displaystyle Ij=Kl=o<0}$, as shown in more detail in Fig. 5. In either case, HI becomes ${\displaystyle HJ,Hj=w+o}$.

The resistance of the arcs of the curve DN and SG are unchanged. Also, the resistance of the arc IK is not changed by being shifted, since the slope remains the same along its length. The only change to the overall resistance of DNSG is due to the change to the gradient of arcs NI and KS. The 2 displacements have to be equal for the slope of the arc IK to be unaffected, and the new curve to end at G.

The new resistance due to particles impinging upon NJ or Nj, rather that NI is:

${\displaystyle r+\delta r={\frac {yu^{3}}{u^{2}+(w+o)^{2}}}=r-{\frac {2ywu^{3}o}{(u^{2}+w^{2})^{2}}}}$ + w.(terms in ascending powers of ${\displaystyle {\frac {o}{w}}}$ starting with the 2nd).

The result is a change of resistance of: ${\displaystyle -{\frac {2NM.HI.HN^{3}o}{NI^{4}}}}$ + higher order terms, the resistance being reduced if o > 0 (NJ less resisted than NI).

This is the original 1685 derivation where he obtains the above result using the series expansion in powers of o. In his 1694 revisit he differentiates (2) with respect to w. He sent details of his later approach to David Gregory, and these are included as an appendix in Motte’s translation of the Principia.

Similarly, the change in resistance due to particles impinging upon SL or Sl rather that SK is: ${\displaystyle +{\frac {2TS.OK.OS^{3}o}{SK^{4}}}}$ + higher order terms.

The overall change in the resistance of the complete solid, ${\displaystyle \delta \rho =(-{\frac {2NM.HI.HN^{3}}{NI^{4}}}+{\frac {2TS.OK.OS^{3}}{SK^{4}}})o}$ + w.(terms in ascending powers of ${\displaystyle {\frac {o}{w}}}$ starting with the 2nd).

Fig 6 represents the total resistance of DNJLSG, or DNjlSG as a function of o. Since the original curve DNIKSG has the least resistance, any change o of whatever sign, must result in an increase in the resistance. This is only possible if the coefficient of o in the expansion of ${\displaystyle \rho (o)}$ is zero, so:

${\displaystyle {\frac {NM.HI.HN^{3}}{NI^{4}}}={\frac {TS.OK.OS^{3}}{SK^{4}}}}$ (2)

If this was not the case, it would be possible to choose a value of o with a sign that produced a curve DNJLSG, or DNjlSG with less resistance than the original curve, contrary to the initial assumption. The approximation of taking straight lines for the finite arcs, NI and KS becomes exact in the limit as HN and OS approach zero. Also, NM and HM can be taken as equal, as can OT and ST.

However, N and S on the original curve are arbitrary points, so for any 2 points anywhere on the curve the above equality must apply. This is only possible if in the limit of any infinitesimal arc HI, anywhere on the curve, the expression,

${\displaystyle {\frac {NM.HI.HN^{3}}{NI^{4}}}}$ is a constant. (3)

This has to be the case since, if ${\displaystyle {\frac {NM.HI.HN^{3}}{NI^{4}}}}$ was to vary along the curve, it would be possible to find 2 infinitesimal arcs NI and KS such that (2) was false, and the coefficient of o in the expansion of ${\displaystyle \delta \rho }$ would be non-zero. Then a solid with less resistance could be produced by choosing a suitable value of o.

This is the reason for the constant term in the minimum condition in (3). As noted above, Newton went further, and claimed that the resistance of the solid is less than that of any other with the same length and width, when the slope at G is equal to unity. Therefore, in this case, the constant in (3) is equal to one quarter of the radius of the front disc of the solid, ${\displaystyle {\frac {GB}{4}}}$.