Answer:
6.82 [tex]mt^3/min[/tex]
Step-by-step explanation:
By congruence of triangles, the radius r of the cone base when its height is 1 meter satisfies the relation
r/1 = 2.5/6
(See picture attached)
So, r = 0.4166 meters when the water is 1 meter high.
The volume of a cone with radius of the base = R is given by
[tex]V=\frac{\pi R^2h}{3}[/tex]
So, the volume of water when it is 1 meter high is
[tex]V=\frac{\pi* 0.(4166)^2}{3}=0.1817\;mt^3[/tex]
One minute later, the height of the water is 1 meter + 30 centimeters = 1.30 mt
The radius now satisfies
r/1.3 = 2.5/6
and now the radius of the base is
r = 0.5416 mt
and the new volume of water is [tex]0.3071\;mt^3[/tex]
So, the water is raising at a speed of
0.3071-0.1871 = 0.12 [tex]mt^3/min[/tex]
This speed equals the difference between the water being pumped and the water leaking,
So,
0.12 = Speed of water being pumped -6.8
and
Speed of water being pumped = 6.8+0.12 = 6.82 [tex]mt^3/min[/tex]
