Math, asked by DeepanshiAhuja, 1 year ago

A cylindrical bucket, 32 centimetre high and with radius of base 18 centimetre, is filled with sand. This bucket is emptied on the ground and a conical heap of sand is formed. If the height of the conical it is 24 centimetre, find the radius and slant height of the heap.

Answers

Answered by 15tau
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Answered by mathsdude85
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Answer:

The radius and slant height of heap are 36 cm & 12√13 cm .

Step-by-step explanation:

Given :  

Height of a cylindrical bucket , H = 32 cm  

Radius of cylindrical bucket , R = 18 cm

Height of the conical heap of sand , h = 24 cm

Let the radius and slant height of the heap of sand be ‘r’  & ‘ l’.

Here, the sand filled in cylindrical bucket from a conical heap of sand on the ground. So volume of cylindrical bucket will be equal to the volume of conical heap.

Volume of cylindrical bucket = Volume of conical heap of sand  

πR²H = 1/3 πr²h  

R²H = 1/3 r²h  

18² × 32 = ⅓ × r² × 24

18 × 18 × 32 = 8r²  

r² = (18 × 18 × 32)/8

r² = 18 × 18 × 4

r² = 1296  

r = √1296

r = 36 cm

Radius of the heap of sand  = 36 cm

Slant height of the conical heap of sand, l = √(h² + r²  

l = √24² + 36² = √(576 + 1296) = √1872

l = √144 × 13 = 12√13  

l = 12√13 cm

slant height of the conical heap of sand, l = 12√13 cm

Hence the radius and slant height of heap are 36 cm & 12√13 cm .

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