Analyzing the pole-corner problem, Maximum length of pole in hallway – Texas Instruments PLUS TI-89 User Manual

384 Chapter 23: Activities

23ACTS.DOC TI-89/TI-92 Plus: Activities (English) Susan Gullord Revised: 02/23/01 1:24 PM Printed: 02/23/01 2:20 PM Page 384 of 26

The maximum length of a pole

c

is the shortest line segment touching

the interior corner and opposite sides of the two hallways as shown
in the diagram below.

Hint:

Use proportional sides and the Pythagorean theorem to find

the length

c

with respect to

w

. Then find the zeros of the first

derivative of

c(w)

. The minimum value of

c(w)

is the maximum length

of the pole.

10

5

w

a

b

c

a = w+5
b = 10a

w

1.

Define

the expression for side

a

in terms of

w

and store it in

a(w)

.

2.

Define

the expression for side

b

in terms of

w

and store it in

b(w)

.

3.

Define

the expression for side

c

in terms of

w

and store it in

c(w)

Enter:

Define c(w)=

‡

(a(w)^2+b(w)^2)

4. Use the

zeros()

function to

compute the zeros of the first
derivative of

c(w)

to find the

minimum value of

c(w)

.

Analyzing the Pole-Corner Problem

A ten-foot-wide hallway meets a five-foot-wide hallway in the
corner of a building. Find the maximum length pole that can be
moved around the corner without tilting the pole.

Maximum Length of
Pole in Hallway

Tip: When you want to
define a function, use
multiple character names as
you build the definition.

Note: The maximum length
of the pole is the minimum
value of c(w).