2. A conical container with radius 10 cm
and height 30 cm is completely filled with
some cold drink. This cold drink is poured into cylindrical cu
poured into cylindrical containers with radius
2 cm each. If the height of the cold drink in each containers -
cold drink in each containers is 10 cm. then how
many containers can be filled ?
Answers
Answer:
Step-by-step explanation:
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||✪✪ CORRECT QUESTION ✪✪||
A conical container with radius 10 cm
and height 30 cm is completely filled with
some cold drink. This cold drink is poured into cylindrical containers with radius 2 cm each. If the height of the cold drink in each containers is 10 cm. then how many containers can be filled ?
|| ★★ FORMULA USED ★★ ||
→ Volume of cone = (1/3) * πr²h
→ Volume of cylinder = πr²h .
|| ✰✰ ANSWER ✰✰ ||
Given that, Radius of conical container is 10cm and its Height is 30cm.
So,
→ Volume of conical container = 1/3 * π * (10)² * 30
Now, it is given that, This cold drink was poured in cylinderical containers with radius as 2cm and height as 10cm.
Since, volume of conical containers and volume of all cylinderical containers will be Equal.
Lets assume that, their will be n cylinderical containers formed ,
So,
→ 1/3 * π * (10)² * 30 = n * [ π * 2² * 10 ]
π will be cancel From both sides,
→ 100 * 30 = n * 4 * 3 * 10
→ 3000 = 120n
Dividing both sides by 120 now,
→ n = 25 .