Template:RoundBoxTop

The Crossed ladders problem is usually classified as mathematical entertainment. However, it leads to some pretty curves, the solutions of two quartic equations and the theoretical interpretation of unanticipated results.

The figure shows two ladders across an alley. Ladder ${\displaystyle a}$ has its feet on the ground against wall ${\displaystyle A}$ and is leaning with its top against wall ${\displaystyle B.}$

Ladder ${\displaystyle b}$ has its feet on the ground against wall ${\displaystyle B}$ and is leaning with its top against wall ${\displaystyle A.}$

${\displaystyle h}$ is the height above ground at which the ladders cross.

Three known values are the lengths ${\displaystyle a,b,h.}$ What is the width ${\displaystyle (w=w_1+w_2)}$ of the alley?

In this example the known values are: ${\displaystyle a,b,h=525,1092,240}$ units. Template:RoundBoxBottom

Template:RoundBoxTop

The relevant functions are:

${\displaystyle f(A)=A^4-480A^3-916839A^2+440082720A-52809926400}$

${\displaystyle g(B)=B^4-480B^3+916839B^2-440082720B+52809926400}$

When ${\displaystyle A=B=h,f(A)=g(B)=-h^4}$ and ${\displaystyle f^{\prime }(A)=g^{\prime }(B)=-2h^3.}$

The figure shows that the curves touch where ${\displaystyle x=h=240.}$ Template:RoundBoxBottom

Template:RoundBoxTop

Length ${\displaystyle A}$ is a little less than length ${\displaystyle b=1092.}$ We use ${\displaystyle x=1092}$ as the starting point and Newton's method quickly finds ${\displaystyle A_0=1008.}$ With ${\displaystyle A,b}$ known ${\displaystyle w=\sqrt{b^2-A^2}=420.}$

The following calculations are for the interpretation of the values ${\displaystyle A_1,B_1.}$

Take the known value out of ${\displaystyle f(A)}$ and the remaining cubic function is:

${\displaystyle x^3+528x^2-384615x+52390800.}$ The one real root of this function is: ${\displaystyle A_1=-976.706982646915.}$

Template:RoundBoxBottom

Template:RoundBoxTop

${\displaystyle B=\sqrt{a^2-w^2}=315.}$

Take the known value out of ${\displaystyle g(B)}$ and the remaining cubic function is:

${\displaystyle x^3-165x^2+864864x-167650560.}$ The one real root of this function is: ${\displaystyle B_1=192.659102954523.}$

Template:RoundBoxBottom

Template:RoundBoxTop

Ladder ${\displaystyle a}$ has its feet at point ${\displaystyle (-w_1,0)}$ and it is at rest against point ${\displaystyle (w_2,B_1=192.659102954523).}$

Ladder ${\displaystyle b}$ has its feet at point ${\displaystyle (-w_1,A_1=-976.706982646915)}$ and it is at rest against point ${\displaystyle (w_2,0).}$

Both ladders extended intersect at height ${\displaystyle h=240.}$ Template:RoundBoxBottom