A scuba diver was at a depth of 15 m below the surface when she saw something interesting about 10 m lower she made the descent in 10.1 seconds in Tirpitz, a quotient to describe the rate of change in the divers death give your answer to the nearest, hundredth.
To find the quotient to describe the rate of change in the diver's depth, we need to calculate the change in depth (in meters) and divide it by the time taken (in seconds).
Change in depth = 10 m
Time taken = 10.1 seconds
Quotient = Change in depth / Time taken = 10 m / 10.1 s
Calculating the quotient:
Quotient ≈ 0.99
Therefore, the quotient to describe the rate of change in the diver's depth is approximately 0.99 (rounded to the nearest hundredth).
To calculate the rate of change in the diver's depth, we need to find the difference in depth and divide it by the time taken.
The initial depth of the diver is 15 meters below the surface. She descends to a depth of 10 meters lower, which means she reaches a depth of 15 - 10 = 5 meters below the initial depth.
The time taken to descend is given as 10.1 seconds.
To find the rate of change in the diver's depth, we divide the difference in depth by the time taken:
Rate of change = (difference in depth) / (time taken)
Rate of change = (5 meters) / (10.1 seconds)
Calculating this, we find that the rate of change in the diver's depth is approximately 0.495 m/s (to the nearest hundredth).