If the volume of a right circular cone of height 9 cm is 48? cm ³, then find the diameter of its base.?

Volume = (1/3)?r²h
According to the question,
(1/3)?r²h = 100?
? (1/3)?r² x 12 = 100?
? r² = 25
? r = ?25 = 5 cm
? Slant height (l) = ?h² + r²
= ?12² + 5²
= ?169 = 13 cm

Radius of cone (r) = 6/2 = 3 cm
and height of cone (h) = 4cm
Slant height (l) = ?h² + r²
= ?(4)² + (3)²
= ?16 + 9
= 5 cm
Now, curved surface area = ?rl
= (22/7) x 3 x 5
= 330/7 = 47 cm²

Volume of cone = (1/3)?r²h
= (1/3) x (22/7) x 10 x 10 x 21 = 2200 cm³

Given that,
Diameter of a right circular cone = 7 cm
? Radius of a right circular cone = 7/2 cm
and slant height of a right circular cone (l) = 10 cm
? Lateral surface area of a cone = ?rl = (22/7) x (7/2) x 10
= 11 x 10 = 110 cm²

Curved surface area of right circular cone = ?rl
? 440 = (22/7) x 14 x l
? l = (440 x 7) / (22 x 14) = 10 cm

Slant height (l) = ?r² + h²
=?7² + 24²
= ?49 + 576
= ?625
= 25 cm
Curved surface area = ?rl = (22/7) x 7 x 25 = 550 sq cm
? Area of 5 caps = 550 x 5 = 2750 sq cm

In first situation.
Radius = r₁, height = h₁ and volume = v₁

In second situation,
Radius =2r₁, height = h₂ and volume = v₂
In the volume is fixed, then
v₁ = v₂
? (1/3)?r²₁h₁ = (1/3)?(2r₁)²h₂
? h₁ = 4h₂
? h₂ = h₁/4
Therefore, height of the the cone will be one-fourth of the previous height.

Given, l = 9 m
and diameter = 14 m ? r = 14/2 = 7 m
Now, volume = (1/3)?r²h
= (1/3)? x 49 x ?l² - r²
= (1/3)? x 49 x ?81 - 49
= (1/3) x 49? x ?32 = 49??32 /3 m³

[(1/3)?r₁²h₁]/[(1/3)?r₂²h₂] = 2/3
? (r₁/r₂)² x (h₁/h₂) = 2/3
? (1/2)² x (h₁/h₂) = 2/3 [ &bacaus; r₁/r₂ = 1/2]
? h₁/h₂ = 8/3
? h₁ : h₂ = 8 : 3

Let radius = 5k, height = 12k
According to the question
= 1/3 x 22/7 x (5k)² x 12k = 2200/7
? k = 1
? r = 5, h = 12
? Slant height (l) = ?r² + h²
= ?25 + 144
= ?169
=13 cm