2.4 Planes and lines in E, 81
Therefore,
473)
dA(xi-x)+B(yi-y)+C(z,-z)
(2.
V/A2 + B2 + C2
This looks quite simple but, since P is in r, the equation of r shows that
-Ax - By - Cz=D
and we obtain the more useful formula
(2.48) d
= Ax, + By, + Cz, + DI
/A2+B2+ /+1.2
One who must teach his little sister to start with (2.47) and get (2.48) can
cook up a new five-step rule: (i) rub out the "=0"; (ii) put subscripts on
x, y, z; (iii) divide byV,42 + B2 + C2; (iv) stick on absolute-value signs;
and (v) equate the result to d. It is, as a matter of fact, useful to know
when and how it is possible to prepare instructions so explicit that routine
chores can be performed mechanically and can even be performed by
persons and machines unfamiliar with processes by which formulas are
derived and combined to accomplish their purposes.
Problems 2.49
1 Give geometric interpretations of the numbers xo, yo, zo, A, B, C appearing
in the equation A(x - xo) + B(y - yo) + C(z - zo) = 0 of a plane r and be
prepared to repeat the process at any time. Ans.: See text.
2 Write an intrinsic (not depending upon coordinates) equation of the plane
A which contains a given point Po and is normal to a given vector V. Hint: If
P is in 7, then POP must be perpendicular (or normal or orthogonal) to V. Ans.:
0.
3 How can we derive the coordinate equation of Problem 1 from the intrinsic
equation of Problem 2? Ans.: Set V = Al + Bj + Ck and
PoP= (x - xo)l + (y - yo)j + (z - zo)k
so that
A(x - xo) + B(y - yo) + C(z - zo).
4 Write an intrinsic (not depending upon coordinates) formula for the dis-
tance d from a point P, to a plane u which contains a point P and is normal to
a unit vector n. Hint: Construct an appropriate schematic figure and refer to
Figure 2.471 and formula (2.472) only if assistance is needed.
5 In each case, find the (or an) equation of the plane a which contains the
given point and is perpendicular to a vector having. the given scalar components
(or, in other words, perpendicular to a line having the given direction numbers).
(a) (0,0,0); 1, 1, 1 Ans.: x + y + z = 0
(b) (1,1,1); 1, 1, 1 Ans.: x + y + z = 3
(c) (1,2,3); 4, S, 6 Ans.: 4(x - 1) + S(y - 2) + 6(z - 3) = 0
(d) (x,,y,,z,); A, B, C Ans.: A(x - x,) + B(y - y,) + C(z - z,) = 0