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Question

A container, open from the top and made of a metal sheet, is in the form of a frustum of a cone of height 16 cm with radii of its lower and upper ends as 8 cm and 20 cm, respectively. Find the cost (in rupees) of the milk which can completely fill the container, at the rate of ₹ 20 per litre.

Also, find the cost (in rupees) of metal sheet used to make the container, if it costs ₹ 8 per 100cm2. (Take π = 3.14).


A

209; 156.75

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B

221; 156.75

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C

209; 162.5

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D

221; 162.5

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Solution

The correct option is A

209; 156.75


Height of frustum of cone = h = 16 cm

Radius of lower end =r1=8 cm

Radius of upper end =r2=20 cm

Volume of container =V =13πh((r1)2+(r2)2+(r1)(r2)

=13×3.14×16((8)2+(20)2+(8)(20))

=10449.92 cm3

10449.92 cm3 = 10.44992 liters

Cost of milk to fill the container at the rate of ₹ 20 per liter = 20 × 10.44992 = ₹ 209

Slant height of frustum of cone(l)=(h2+(r2r1)2)=(162+(208)2)=(256+144)=400 = 20 cm

Total surface area of frustum =πl(r1+r2)+π(r1)2=3.14×20(8+20)+(3.14×64)=1758.40+200.96=1959.36 cm2

100 cm2 of metal sheet costs = ₹ 8

1 cm2 of metal sheet would cost = ₹8100

1959.36 cm2 of metal sheet would cost = 8100×1959.36=156.75


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