he scuba diver was at a depth below the surface when she saw something interesting about 10 meters lower. She made the descent in 10.1 seconds. Interpret the quotient to describe the rate of change in the diver’s depth. Give your answer to the nearest hundredth.
(1 point)
Responses
The quotient that scribes the average rate of change for the diver’s depth is -0.99 meters/second.
The quotient that scribes the average rate of change for the diver’s depth is -0.99 meters/second.
The quotient that scribes the average rate of change for the diver’s depth is 0.99 meters/second.
The quotient that scribes the average rate of change for the diver’s depth is 0.99 meters/second.
The quotient that scribes the average rate of change for the diver’s depth is -0.49 meters/second.
The quotient that scribes the average rate of change for the diver’s depth is -0.49 meters/second.
The quotient that scribes the average rate of change for the diver’s depth is -3.47 meters/second.
The correct answer is: The quotient that describes the average rate of change for the diver's depth is -0.99 meters/second.
The correct answer is:
The quotient that describes the average rate of change for the diver's depth is -0.99 meters/second.
To find the average rate of change for the diver's depth, we need to divide the change in depth by the time it took to make the descent.
Given that the diver descended 10 meters lower and it took 10.1 seconds, we can calculate the average rate of change using the formula:
Average rate of change = Change in depth / Time
Change in depth = -10 meters (since it's lower)
Time = 10.1 seconds
Therefore, the average rate of change = -10 / 10.1 ≈ -0.99 meters/second.
So, the correct answer is:
The quotient that describes the average rate of change for the diver's depth is -0.99 meters/second.