Answer :
Answer: -2.25 ft/s
Explanation:
we have the following parameters
length of the ladder = 10 ft
distance of the base of the ladder (x) = 6 ft
applying Pythagoras theorem
X^2 + Y^2 = 10^2 ............equation 1
X^2 + Y^2 = 100
differentiating the above we have
2X (dx/dt) + 2Y (dy/dt) = 0 ...........equation 2
substituting the value of X into equation 1
6^2 + Y^2 = 10^2
Y^2 = 100 - 36
Y =[tex]\sqrt{64}[/tex]
Y = 8
now that we have Y= 8, X = 6 and dx/dt (rate of sliding of the base) = 3 ft/s, we can substitute them into equation 2 to get dy/dt (rate of sliding of the top)
we now have
(2 x 6 x 3 ) + (2 x 8 x dy/dt ) = 0
36 + 16(dy/dt) = 0\
dy/dt = (-36) / 16
= -2.25 ft/s ( - means its sliding down)