Answer:
Solution
[verified]
Let AB be the ladder, where AB=10 metres,. Let at time t seconds, the end A of the ladder be x metres from the wall and the end B be y metres from the ground.
Since, OAB is a right angled triangle, by Pythagoras theorem.
x
2
+y
2
=10
2
i.e.. y
2
=100−x
2
Differentiating w.r.t t we get
2y
dt
dy
=0−2x
dt
dx
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x
2
+y
2
=10
2
i.e.. y
2
=100−x
2
Differentiating w.r.t t we get
2y
dt
dy
=0−2x
dt
dx
∴
dt
dy
=
y
x
.
dt
dx
...(1)
Now,
dt
dx
=
sec
12 metres
is the rate which the top of ladder B is sliding. which the top of ladder B is sliding.
When x=6,y
2
=100−36=64
∴y=8
∴(1) gives,
dt
dy
=−
8
6
(1.2)
=
8
6
×
10
12
−
10
9
=−0.9
Hence, the top of the ladder is sliding down the wall, at the rate of
sec
0.9 metre
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