A bird is flying at an average altitude of 10 meters above the ground. After 3 seconds, it settles on a branch that is 3 meters above the ground interpret the quotient to describe the rate or change in the bird's altitude.
The bird's altitude changes from 10 meters to 3 meters, so the total change in altitude is 10 - 3 = 7 meters.
This altitude change took place over 3 seconds, so to find the rate of change, we divide the total change by the time it takes place, 7 รท 3 = 2.33 meters per second.
So the bird's average rate of change in altitude is -2.33 meters per second. The negative sign indicates that the bird is decreasing in altitude, or moving downwards.
To find the rate of change in the bird's altitude, we need to calculate the change in altitude divided by the change in time.
Given that the bird's average altitude is 10 meters above the ground initially and it settles on a branch 3 meters above the ground after 3 seconds, we can calculate the change in altitude as follows:
Change in altitude = Final altitude - Initial altitude
= (3 meters above the ground) - (10 meters above the ground)
= -7 meters
The change in time is given as 3 seconds.
Now, we can calculate the rate of change in the bird's altitude:
Rate of change in altitude = Change in altitude / Change in time
= -7 meters / 3 seconds
= -7/3 meters per second
Therefore, the quotient describing the rate of change in the bird's altitude is -7/3 meters per second.
To interpret the quotient that describes the rate of change in the bird's altitude, we need to calculate the change in altitude divided by the change in time.
First, we need to find the initial altitude. The question states that the bird is flying at an average altitude of 10 meters above the ground.
Next, we determine the final altitude. The bird settles on a branch that is 3 meters above the ground.
The change in altitude is then calculated by subtracting the initial altitude from the final altitude: 3 meters - 10 meters = -7 meters. The negative sign indicates that the bird's altitude has decreased.
Now, we consider the change in time. The question states that 3 seconds have passed.
To calculate the rate of change in the bird's altitude, we divide the change in altitude (-7 meters) by the change in time (3 seconds): -7 meters / 3 seconds.
Therefore, the quotient describing the rate of change in the bird's altitude is approximately -2.33 meters per second. The negative sign indicates that the bird's altitude is decreasing, and the value of 2.33 meters per second represents the rate at which the altitude is changing.