Calculus: Analytic Geometry and Calculus, with Vectors

(lu) #1
2.4 Planes and lines in E3 83

14 Determine the value of the parameter X for which the two planes which
have the equations


2x + 3y + 4z + 5 = 0
2x - 3y - Xz - 5 = 0

are orthogonal. Hint: Modest experiments with two sheets of paper enable us
to capture or recapture the idea that two planes are orthogonal (or normal or
perpendicular to each other) if and only if their normals are orthogonal. .4ns.:

15 If B, C, D are constants for which B and C are not both 0, then the equation
By + Cz + D = 0 is the equation of a plane r. Show that the vector Vl with
scalar components 0, B, C is normal to r. Show that the vector V2 with scalar
components 1,0,0, is normal to the yz plane. Show that Vl and V2 are per-
pendicular and hence that r is perpendicular to the yz plane.
16 Consider again the equation By + Cz + D = 0 or any other equation
involving y and z but not x. Let us agree (this is an important definition) that a
set Sl in Es is a cylinder parallel to a line L if, whenever it contains a point Po, it
also contains all of the points on the line Lo through Po parallel to L. Use this to
show that the graph of the given equation is a cylinder parallel to the x axis.
Solution: Let Po(xo,yo,zo) be any point on the graph of the given equation. Then
the numbers xo, yo, zo satisfy the equation. Since x does not appear in the equa-
tion, it follows that the numbers x, yo, so satisfy the equation for each x. This
means that all of the points (x,yo,zo) on the line Lo through (xo,yo,zo) parallel to
the x axis lie on the graph. Therefore, the graph is a cylinder parallel to the x
axis.
17 Supposing that B, C, and D are constants for which B and C are not both
0 and D 0 0, show that there is no number x for which the numbers x, 0, 0
satisfy the equation By + Cz + D = 0. What is the geometric significance of
this result?
18 Look at the equations

x - xl y -yl z-Zl
X2 - xl Y2 - y1 z2 - Zl

of the line containing two points P,(xl,yl,%,) andP2(xs,y2,z2) Describe completely
the graph of the equation obtained by deleting one of the members of this equality.
Sketch the three graphs obtained in this way.
19 Problem 12 of Problems 2.29 is of interest here. Solve the problem again
and think about it.
'20 Take a good look at the

(1) X2

X
xl(x -xl) +Y2μyl(Y - Yl) -Z±zl(z-zl) =0.

Supposing that Pl(xl,yi,zl) and P2(x2,y2,z2) are two points for which x2 5 xi,
y2 0 yl, z2 zl and that X and μ are numbers not both zero, tell why(1) is the
equation of a plane containing Pl and P2. Then study the text again and attain
a better understanding of matters relating to (1).
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