The figure is not drawn to scale. It shows an empty container made up of a cuboid, measuring 42 cm by 28 cm by 28 cm and 2 similar cubes of sides 6 cm. Line G is 8 cm. 21.312 ℓ of water is poured into the top cube into the cuboid.
- What is the height of the water level from the base of the container?
- How much more water in cm3 must be poured in so that the water fills up 15 of the top cube?
(a)
Height of the cuboid to the base of side cube
= 28 - 8 - 6
= 14 cm
Volume of water to the base of side cube
= 42 x 28 x 14
= 16464 cm
3Combined base area
= (42 x 28) + (6 x 6)
= 1176 + 36
= 1212 cm
21 ℓ = 1000 cm3
21.312 ℓ = 21312 cm
3Volume of water in the cube and cuboid beside the cube
= 21312 - 16464
= 4848 cm
3Height of the water in the cube
= 4848 ÷ 1212
= 4 cm
Height of the water level from the base of the container
= 4 + 14
= 18 cm
(b)
Total cubes to be filled
= 1 +
15= 1
15 Total volume to fill up to
15 of the top cube
= (42 x 28 x 28) + (6 x 6 x 6 x 115)
= 32928 + 259.2 = 33187.2 cm
3 1 ℓ = 1000 cm
3
21.312 ℓ = 21312 cm
3 Extra water to pour in to fill upto half of the top cube
= 33187.2 - 21312
= 11875.2 cm
3 Answer(s): (a) 18 cm; (b) 11875.2 cm
3