A prism has the base a right angled triangle whose sides adjacent to the right angle are 10 cm and 12 cm long. The height of the prism is 20 cm. The density of the material of the prism is 6 g/cu cm. The weight of the prism is?

Volume of solid sphere of radius 4 cm = (4/3)?(4)³ cm³
Volume of hollow sphere = 4/3?[(8)³ - (6)³] cm³
? Weight of 4/3?(4)³ cm³ = 4 kg
= 4(512 - 216)/4³ = 18.5 kg

Here, n = 100%
According to the formula
Percentage increase in volume = [(1 + n/100)³ - 1] x 100%
= [(1 + 100/100)³ - 1] x 100%
= [8 - 1] x 100% = 700%

According to the formula,
Percentage decrease in surface area = [2 x (-24) + (-24) x (-24)/100]%
= [-48 + 5.76]% = - 42.24%

According to the formula
Percentage increase in surface area = [ 2x + x²/100]%
= [2 x 3 + (3)²/100]%
= [6 + 0.09]%
= 6.09%

Let radius of the third sphere be r.
Then, 4/3 ? x (12)³ = 4/3 ? x (6)³ + 4/3? x (8)³ + 4/3 ?r³
? (12)³ = (6)³ + (8)³ + r³
? r³ = 1728 - 216 - 512
? r³ = 1000
? r = 10 cm

Let the sides of the base are 5k, 12k and 13k, respectively.
Given, perimeter of base = 60 cm
? 5k + 12k + 13k = 60
? k = 60/30 = 2
The sides of base are 10 cm, 24 cm 26 cm.
? Volume of prism = (1/2) x 10 x 24 x 50 = 6000 cm³

Volume of the prism = (Area of the base ) x (Height)
Volume of the pyramid = 1/3 (Area of the base ) x (Height)
Required ratio = [A x H] / [(1/3) x A x H]
Therefore, Ratio of the volumes of the prism and the pyramid = 3 : 1.

Ratio of curved surface area of cylinder and cone = [2?rh] / [?r?h² + r²]
= [2 x 6 x 8] / [6 x ?6² + 8²]
= 96/(6 x 10) = 96/60 = 8/5 = 8 : 5

Let required number of coins be n, Then,
n x 1/3 x ? (1/10)² x 1 = ? x (3)² x 5
? n = 9 x 5 x 3 x 100 = 13500

Volume of 1 bullet = 4/3?(2)³ = (32/3 x 22/7) cm³
Volume of the cube = (44)³
? Number of bullets = Volume of solid/Volume of 1 bullet
= (44)³ x 3 x 7 / 32 x 22 = 2541