The distance below the top of the cliff that the two balls cross paths is 7.53 meters.
Given the following data:
Scientific data:
To determine how far (distance) below the top of the cliff that the two balls cross paths, we would apply the third equation of motion.
Mathematically, the third equation of motion is given by this formula:
[tex]V^2 = U^2 +2aS[/tex]
Where:
Substituting the parameters into the formula, we have;
[tex]V^2 = 0^2 +2(9.8) \times 30\\\\V^2 = 588\\\\V=\sqrt{588}[/tex]
V = 24.25 m/s.
Note: The final velocity of the first ball becomes the initial velocity of the second ball.
The time at which the two balls meet is calculated as:
[tex]Time = \frac{S}{U} \\\\Time = \frac{30}{24.25}[/tex]
Time = 1.24 seconds.
The position of the ball when it is dropped from the cliff is calculated as:
[tex]y_1 = h-\frac{1}{2} at^2\\\\y_1 = 30-\frac{1}{2} \times 9.8 \times 1.24^2\\\\y_1 = 30-7.53\\\\y_1=22.47\;meters[/tex]
Lastly, the distance below the top of the cliff is calculated as:
[tex]Distance = 30-22.47[/tex]
Distance = 7.53 meters.
Read more on distance here: brainly.com/question/10545161
