A pilot is flying an airplane. Due to strong winds, the pilot decides to fly 4,000 feet lower to avoid excessive turbulence. It takes the pilot 3.5 minutes to make this adjustment. Interpret the quotient to describe the rate of change in the plane’s altitude. Give your answer to the nearest hundredth, and remember the plane is descending.(1 point)
The quotient that best represents the rate of change in the plane’s altitude is
feet/minute
The quotient that best represents the rate of change in the plane's altitude is 1142.86 feet/minute.
To find the rate of change in the plane's altitude, we need to divide the change in altitude by the time it takes to make the adjustment.
The change in altitude is given as 4,000 feet, and the time taken is 3.5 minutes.
Hence, the rate of change in the plane's altitude is:
Rate of change = Change in altitude / Time taken
Rate of change = 4,000 feet / 3.5 minutes
Rate of change ≈ 1,142.86 feet/minute
Rounding to the nearest hundredth, the rate of change in the plane's altitude is approximately 1,142.86 feet/minute.
To find the rate of change in the plane's altitude, we need to divide the change in altitude by the time it takes for the adjustment.
The change in altitude is 4,000 feet since the pilot is flying 4,000 feet lower.
The time it takes for the adjustment is 3.5 minutes.
To find the rate of change, we divide the change in altitude by the time:
Rate of change = change in altitude / time
Rate of change = 4,000 feet / 3.5 minutes
Calculating this, we get:
Rate of change ≈ 1,142.86 feet/minute
To give an answer to the nearest hundredth, we round this to:
Rate of change ≈ 1,142.86 feet/minute ≈ 1,142.86 feet/minute (rounded to the nearest hundredth)
Therefore, the quotient that best represents the rate of change in the plane's altitude is approximately 1,142.86 feet/minute.