A wire in the shape of Y is hanged from two points $A$ and $B$ , $8$ feet apart. The lower end of wire reaches a point $10$ feet from $AB$ . What is the shortest possible length of the wire?

Question

A wire in the shape of Y is hanged from two points $A$ and $B$ , $8$ feet apart. The lower end of wire reaches a point $10$ feet from $AB$ . What is the shortest possible length of the wire?

2 Answers

Impact of this question

1771 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2017-06-15T14:08:26

Shortest length of wire that can be used is $12.31$ feet.

Explanation:

The above can be better described by the following figure.

enter image source here

Now using Pythagoras theorem, if $x$ is the length of verticle component of wire, lengths of tilted wires each is

$sqrt(4^2+(10-x)^2)$ or $sqrt(16+100+x^2-20x)$ or $sqrt(x^2-20x+116$

and total length of wire is $l(x)=x+2 sqrt(x^2-20x+116)$

This will be minimum when $(dl)/(dx)=0$

As $(dl)/(dx)=1+2xx1/(2sqrt(x^2-20x+116))xx(2x-20)=0$

or $1-(2(10-x))/sqrt(x^2-20x+116)=0$

or $sqrt(x^2-20x+116)=20-2x$

and squaring we get

$x^2-20x+116=400+4x^2-80x$

or $3x^2-60x+284=0$

or $x=(60+-sqrt(3600-4xx3xx284))/6$

$=(60+-sqrt(3600-3408))/6=(60+-sqrt192)/6$

or $x=10+-2.31$ i.e. $x=12.31$ or $7.69$

But $x$ cannot be greater than $10$

Hence $x=7.69$ and shortest length of wire that can be used is

$l(7.69)=7.69+2sqrt(7.69^2-20xx7.69+116)$

= $7.69+2sqrt21.3361=7.69+4.62=12.31$

Answer 2 · 2017-06-15T16:21:57

The shortest total length of the wire that can be used $=16.92ft$

Explanation:

Let the length of the perpedicular $OD$ dropped from the junction point $O$ of Y-shaped wire frame to the horizontal line AB be $xft$ .
The total height being 10ft the height of $O$ will be $(10-x)ft$
Since in $DeltaAOB$ $OA=OB$
Here $D$ will be mid point of $AB$ So $AD=BD=4ft$

By pythagoras theorem

$OA=OB=sqrt(x^2+4^2)$

So total length of the wire

$L=2sqrt(x^2+4^2)+10-x.....(1)$

To know the minimum length of wire required we impose the condtion $(dL)/(dx)=0$

So

$d/(dx)(2sqrt(x^2+4^2)+10-x)=0$

$=>(2*1/2*(2x)/sqrt(x^2+4^2)-1)=0$

$=>(2x)/sqrt(x^2+4^2)=1$

$=>(2x)^2=(sqrt(x^2+4^2))^2$

$=>4x^2=x^2+16$

$=>x=4/sqrt3$

Hence minimum length can be had by inserting $=>x=4/sqrt3$ in (1)

$L_"min"=2(sqrt((4/sqrt3)^2+4^2))+10-4/sqrt3$

$=>L_"min"=2xx8/sqrt3+10-4/sqrt3$

$=>L_"min"=16/sqrt3-4/sqrt3+10$

$=>L_"min"=12/sqrt3+10=4sqrt3+10=16.92ft$

Science

Math

Humanities

... and beyond

A wire in the shape of Y is hanged from two points $A$ and $B$ , $8$ feet apart. The lower end of wire reaches a point $10$ feet from $AB$ . What is the shortest possible length of the wire?

2 Answers

Explanation:

Explanation:

Related questions

Impact of this question

Science

Math

Humanities

... and beyond

A wire in the shape of Y is hanged from two points AA and BB, 88 feet apart. The lower end of wire reaches a point 1010 feet from ABAB. What is the shortest possible length of the wire?

2 Answers

Explanation:

Explanation:

Related questions

Impact of this question

A wire in the shape of Y is hanged from two points $A$ and $B$ , $8$ feet apart. The lower end of wire reaches a point $10$ feet from $AB$ . What is the shortest possible length of the wire?