A quadrant of a circle of diameter 28cm is cut and made into a cone fi

1.	A quadrant of a circle of diameter 28cm is cut and made into a cone find its capacity
Answer» Answer: here is your answer Step-by-step explanation: Solution:- SLANT height of the conical cup, 'l' = RADIUS of the semi-circular SHEET, R = 14 CM Let radius and height of the conical cup be 'r' and 'h' respectively. Circumference of the base of the cone = Length of arc of the semi-circle Or, 2πr = (1/2)2πR Or, 2πr = (1/2)(2π)(14) Or, r = 7 cm Now, we know that l² = h² + r² (14)² = (h)² + (7)² h² = 196 - 49 h = √147 Height or depth of the conical cup = 12.124 cm Now, CAPACITY of the conical cup = 1/3πr²h = 1/322/77712.124 = 13069.672/21 Capacity of the conical cup = 622.365 cu cm .

A quadrant of a circle of diameter 28cm is cut and made into a cone find its capacity

Answer»

Answer:

here is your answer

Step-by-step explanation:

Solution:-

SLANT height of the conical cup, 'l' = RADIUS of the semi-circular SHEET, R = 14 CM

Let radius and height of the conical cup be 'r' and 'h' respectively.

Circumference of the base of the cone = Length of arc of the semi-circle

Or, 2πr = (1/2)2πR

Or, 2πr = (1/2)(2π)(14)

Or, r = 7 cm

Now, we know that l² = h² + r²

(14)² = (h)² + (7)²

h² = 196 - 49

h = √147

Height or depth of the conical cup = 12.124 cm

Now, CAPACITY of the conical cup = 1/3πr²h

= 1/3*22/7*7*7*12.124

= 13069.672/21

Capacity of the conical cup = 622.365 cu cm

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