Two window washers start at the heights shown. (A: 21 ft high rising 8 in per second. The other is 50 feet high descending 11inc

Question

2 years ago

9

hes per second) one is rising one is descending. How long does it take for the two window washers to reach the same height? Explain

2 answers:

babunello [35] · Answer 1 · 2023-04-12T11:54:50+03:00

For this case, the first thing we are going to do is write the generic equation of motion for the vertical axis.

We have then:

$h = \frac {1} {2} gt ^ 2 + vo * t + h0$

Where,

For the first body:

$h1 = \frac {1} {2} gt ^ 2 + \frac {8} {12} * t + 21$

For the second body:

$h2 = \frac {1} {2} gt ^ 2 - \frac {11} {12} * t + 50$

By the time both bodies have the same height we have:

$h1 = h2\\$

$\frac {1} {2} gt ^ 2 + \frac {8} {12} * t + 21 = \frac {1} {2} gt ^ 2 - \frac {11} {12} * t + 50$

Rewriting we have:

$\frac {8} {12} * t + 21 = - \frac {11} {12} * t + 50$

$\frac {8} {12} * t + \frac {11} {12} * t = 50 - 21$

$\frac {19} {12} * t = 29$

Clearing time:

$t = 29 (\frac {12} {19})\\t = 18.31s$

Answer:

it takes 18.31s for the two window washers to reach the same height

Serhud [2] · Answer 2 · 2023-04-12T13:07:43+03:00

Answer:

After 18.32 seconds two window washers will reach the same height.

Step-by-step explanation:

Let h is the height at which a window washer A meats other window washer B.

A is ascending with the speed = 8 inch per second

At present A is at the height = 21 ft or 21×12 inches = 252 inches

If they meet after time t then the equation representing this relation between height and time will be

h = 252 + 8t ---------(1)

Other window washer B is at height = 50 feet or 50×12 = 600 inch

B is coming down with the speed = 11 inches per second

After time t their height will be h = 600 - 11t --------(2)

Now equating both the equations

252 + 8t = 600 - 11t

8t + 11t + 252 = 600

19t = 600 - 252

19t = 348

t = $\frac{348}{19}$

t = 18.32 seconds