weight on a pulley

[Pookers]

Hey guys.

My teacher gave me a writing prompt to do about a problem that we've never had anything close to. Any help would be much appreciated.

A weight is attached to a rope 50 ft long which passes over a pulley at P, 20 ft above the ground. The other end of the rope is attached to a truck at point A, 2 ft above the ground. If the truck moves off at the rate of 9 ft/sec, how fast is the weight rising when it is 6 ft above the ground?

I've can't think of how to start this one. Thanks for any help, even just getting me started.

 

[tkhunny]

You need some Right Triangles.

For starters, you may wish to drive the truck off a little until the weight is two feet off the ground. That might simplify things a bit. After that, how long is the rope from pulley to truck? The vertical distance, pulley to weight, is 18 ft, right?

If there is a trick on this one, it is probably that the rope is a fixed TOTAL length. The distance from weight to pulley to truck remains constant, 50 ft.

 

[Pookers]

So if the truck is moved forward so the weight is 2 ft off the ground you get a right triangle. With this, you can find that if you put it in standard pythagorean triangle form, a=18, b=26.46, and c=32 feet...

Shouldn't I be able to take the derivative of pythagorean theorem, yielding:

2a(da/dt)+2b(db/dt)=2c(dc/dt)

and then if plug in what I know:

2(18)(da/dt)+2(26.46)(9)=2(32)(dc/dt)

Now I'm stuck with 2 variables that I can't figure out how to find. Please help!

 

[tkhunny]

You didn't use the "trick" yet.

a + c = 50 ft

 

[Pookers]

ok, got it now.

Thanks tkhunny!