Register
A drone is flying at a level altitude of 20 meters straight towards an observer on the ground. If the drone is flying at 8 meters per second, what is the rate of change between it and the observer when
202k views
0 votes
A drone is flying at a level altitude

of 20 meters straight towards an
observer on the ground. If the
drone is flying at 8 meters per
second, what is the rate of change
between it and the observer when
it is 25 meters away from the
doserver ? Remember the sides of a right triangle are related by a ² + b² = c²

User Tushortz
by
4.3k points

1 Answer

2 votes

\begin{gathered} h^2=\text{ \lparen20\rparen}^2\text{ + \lparen25\rparen}^2 \\ h\text{ = }\sqrt[2]{400+625} \\ h=\sqrt[2]{1025} \\ h\text{ }\approx\text{ 32m} \end{gathered}

Now we have to find the derivative:


\begin{gathered} \left(2h\right)dh/dt\frac{}{}\text{ = 2x \lparen}(dx)/(dt)) \\ (dh)/(dt)\text{ = 2 \lparen8m/s\rparen / 2 \lparen32\rparen} \\ (dh)/(dt)\text{ = }(16)/(64) \\ (dh)/(dt)\text{ = }(1)/(4) \\ ^{=\text{ 0.25m/s}} \end{gathered}

The rate of change is 0.25m/s

A drone is flying at a level altitude of 20 meters straight towards an observer on-example-1
User Aylwyn Lake
by
4.1k points
Ask a Question
Welcome to QAmmunity.org, where you can ask questions and receive answers from other members of our community.

4.5m questions

5.9m answers

Other Questions

Which of the following angles can be used to evaluate cot(-210)
Which of the following is a polynomial with roots 4, -5, and 7? A. f(x) = x^3 - 6x - 27x + 140 B. f(x) = x^3 - 6x - 20x + 27 C. f(x) = x^3 - 20x^2 - 27x + 35 D. f(x) = x^3 - 20x^2 - 35x + 140
PLEASE HELP !!!!!!!! THANK YOU line m includes the points (-5,3) and (-2,-6). Line n has the same slope as line m and a y-intercept of -2/3. Write the equation for line n in slope-intercept form.
I really need help!!!
Help, I really need help and I've been stuck on this one ^^^
Link Copied!