Applications Of Derivatives Question 179
Question: A lamp of negligible height is placed on the ground $ {\ell_1} $ away from a wall. A man $ {\ell_2} $ m tall is walking at a speed of $ \frac{{\ell_1}}{10} $ m/s form the lamp to the nearest point on the wall. When he is midway between the lamp and the wall, the rate of change in the length of this shadow on the all is
Options:
A) $ -\frac{5{\ell_2}}{2}m/s $
B) $ -\frac{2{\ell_2}}{5}m/s $
C) $ -\frac{{\ell_2}}{2}m/s $
D) $ -\frac{{\ell_2}}{5}m/s $
Show Answer
Answer:
Correct Answer: B
Solution:
[b] Let BP=x. From similar triangle property, we get $ \frac{AO}{l_1}=\frac{l_2}{x} $ or $ AO=\frac{l_1l_2}{x} $ or $ \frac{d(AO)}{dt}=\frac{-l_1l_2}{x^{2}}\frac{dx}{dt} $ When $ x=\frac{l_1}{2},\frac{d(AO)}{dt}=-\frac{2l_2}{5}m/s. $
BETA
