the length, breath and height of kerosene tin are 24cm, 24cm, and 35cm.there is a kerosene tank of rectangular parrallelopiped shape of 3.15m lenght, 1.2m breath and 0.73m depth. find the number of tins required to fill by the kerosene
Answers
Answer:
The number of tins required to fill by the kerosene is 137 approximately.
Step-by-step-explanation:
We have given that,
For cuboidal kerosene tin,
- Length ( l ) = 24 cm
- Breadth ( b ) = 24 cm
- Height ( h ) = 35 cm
For parallelepiped kerosene tank,
- Length ( L ) = 3.15 m = 3.15 * 100 = 315 cm
- Breadth ( B ) = 1.2 m = 1.2 * 100 = 120 cm
- Height ( H ) = 0.73 m = 0.73 * 100 = 73 cm
We have to find the number of tins required to fill the kerosene.
Now,
Number of tins = Volume of kerosene tank / Volume of kerosene tin
⇒ Number of tins = L * B * H / l * b * h
⇒ Number of tins = 315 * 120 * 73 / 24 * 24 * 35
⇒ Number of tins = 315 ÷ 35 * 120 ÷ 24 * 73 / 24
⇒ Number of tins = 9 * 5 * 73 / 24
⇒ Number of tins = 9 * 5 * 36.5 / 12
⇒ Number of tins = 3 * 5 * 36.5 / 4
⇒ Number of tins = 3 * 182.5 / 4
⇒ Number of tins = 547.5 ÷ 4
⇒ Number of tins = 136.875
⇒ Number of tins ≈ 136.88
∴ The number of tins required to fill by the kerosene is 137 approximately.