which is the condition that the parameter a must satisfy in

order that the spiral whose equation is r = ea may be its own evolute.

Substituting for c22 its value in terms of p,,

be the equation to a curved surface, the equation to the tangent plane at a point x, y, ≈ is

where a', y, are the current co-ordinates of the tangent plane, x, y, ≈ those of the point of contact.

If the equation to the surface consist of a function homogeneous of n dimensions in x, y, z equated to a constant, the equation to the tangent plane becomes

+ 1 dx

= nc,

dz

dy

F(x, y, z) =e being the equation to the surface.

If P be the perpendicular from the origin on the tangent plane,

dF

dF

dF

and if the function be homogeneous of n dimensions,

The equations to a normal at a point x, y, ≈ are

Ex. (1) The equation to the Ellipsoid being

The perpendicular on the tangent plane from the origin is given by the equation

If we wish to find the locus of the intersection of the tangent plane with the perpendicular on it from the centre, we have to combine the equation to the tangent plane,

with the equations of a line perpendicular to it, and passing through the origin

Multiplying each term of the equation to the tangent plane by the corresponding member in these last expressions, x, y, z are eliminated, and we have for the locus of the intersections x'2 + y2 + x22 = (a2 x22 + b2 y2 + c2x22)§.

12

This is the equation to the surface of elasticity in the wave Theory of Light.

(2) Let the equation to the surface be

The intercepts on the tangents are

x=3x, y=3y, z=3x,

and the volume of the pyramid included between the tangent

plane and the co-ordinate planes is

9xyz 9a3
2

=

2

The volume of this pyramid is smaller than that of any other pyramid formed with the co-ordinate planes by a plane passing through the point x, y, z.

The length of the perpendicular from the origin is given by

(3) The equation to the Cono-Cuneus of Wallis is

and the equation to the tangent plane is therefore

y2 xx′ — (a2 − x2) yy′ + c2 z z′ = x2y°.

(4) The equation to the hélicoide gauche is

and the equation to the tangent plane is

h (xy' – yx') + 2 π (x2 + y2) x′ = 2 π ≈ (x2 + y®) ;

and the perpendicular on it is

(5) The equation of the hélicoide développable is

The cosine of the angle which the tangent plane makes

Now (cos

dF

dx

dF

dy

dF

dx

(x2 + y2 − a2) §

=

a

= cos 0

2 п

=

h

= 0, then

x (a cos

y sin )

y (x cos y sin )

(x cos y sin 0).

0)

y sin 0)2= x2cos20+ y2 sin2 0 -2xy sin cos 0,

and from the equation to the surface

2

2x y sin cos 0 a2 a2 sin2 0 -y cos 0; therefore

From these expressions the cosine of the inclination of the tangent plane to the plane of xy is found to be

2 па

(h2 + 4π2a2)}'

The inclination is therefore constant, and equal to that of the helix, which is the directrix of the surface.