A cone has height which is half of 16.8 cm, while diameter of its base is 4.2 cm. It is melted and recast into a sphere. Find the surface area of the sphere.?

Given that, the height and radius of a right circular ,etal cone (solid) are 8 cm and 2 cm, respectively.
i.e., h = 8 cm and r = 2 cm
Let the radius of the sphere is R
Then, by condition,
1/3 ? r² h = 4/3 ? R³ h
? 4 x 8 = 4 R³
? R³ = (2)³ = ? R = 2
? Radius odf the sphere = 2 cm

Let the breadth and height of room be m and h m, respectively.
Then, according to the question, l x b = n x Area occupied by one patient
? 14 x b = 56 x 22
? b = (56 x 22)/14 = 8.8 m³
? h x Area of occupied by one patient = 8.8
h = 8.8/2.2
h = 4 m

Volume of water in the tank = 100 x 500 x 2 = 30000 m³
Speed of water = 20 x 1000/60 = 1000/3 m/min
water flow per minute = (15/10) x (125/100) x (1000/3) = 625 m³
Time taken = 30000/625 = 48 min

Volume of the earth dugout as a tunnel = ?r²h = (22/7) x 2 x 2 x 56 = 704 m³
Volume of the ditch = (48 x 33)/(2 x 4) = 24 x 33 x 4 = 3168 m³
? Part required = 704/3168 = 2/9

r = Radius of the cone = 14/2 = 7 cm
h = Height of the cone = 12 x 2 = 24 cm
? Slant height (l) = ?r² + h²
= ?(7)² + (24)²
= ?49 + 576
= ?625
= 25 cm
Area of the sheet = Total surface area
= (?rl + ?r²)
= ?r(l + r)
= (22/7) x 7 x (25 + 7) = 704 sq cm

Height of the cylinder = 10 x Diameter of each ball
= 10 x 10 = 100 cm
? Required empty space
= ? (5)² (100) - 4/3 ? (5)³ x 10
= ? (5)² x 10 [10 - 20/3]
= ? (5)² x 10 [30 - 20/3] = 2500/3 ? cm³

Let h be the height,
Volume of the cone = V
and curved surface area of the cone = c
? 1/3 ?r²h = V, ?rl = c
i.e., ?r?r² + h² = c
?²r²(r² + h²) = c²
Consider 3?Vh³ - c²h² + 9V²
= 3? x 1/3?r²h x h³ - ?²r²(r² + h²)h + 9 x 1/9 x ?²r⁴ h²
= ?²r²h⁴ - ?²r⁴h² - ?²r²h⁴ + ?²r⁴ = 0

Let the side of the cube be 3k, 4k and 5k, respectively.
So, volumes of these cubes are 27 k³, 64k³, 125 k³ respectively.
? Volume of the new bigger cube = 27 k³ + 64k³ + 125 k³
= 216k³
So, side of the new cube = 6k
Since, diagonal of the cube = ?(6k)² + (6k)² + (6k)²
= 12?3
? 108k² = 432
?k = 2
So, sides of the three cubes were 6 cm, 8 cm and 10 cm respectively.

External radius = 2.5 cm,
length = 100 cm
? External volume = [? x (2.25)² x 100] cm²
internal radius = 1.5 cm
? internal volume = [? x (1.5)² x 100]cm³
Volume of metal
= [? x (2.5)² x 100 - ? x (1.5)² x 100] cm³
= ? x 100 x [(2.5)² - (1.5)²] cm³
= (22/7 x 100 x 4 x 1 x 21/1000) kg
= 26.4 kg.

Curved surface area of cylinder = 2?rh cm²
Total surface area of cylinder = 2?r(h + r) cm²
Now, According to the question
2?rh/2?r(h + r) = 1/2
? h/(h + r) = 1/2
? 2h = h + r
? Now, Total surface area = 616 cm²
? 2? (h + r) = 616
? 2?r (r + r) = 616 (? h = r)
? 2?r(2r) = 616
? 4?r² = 616
? r = ?style="text-decoration:overline">616/4?
= ?616 x 7/4 x 22
= ?7 x 7 =
? r = h = 7 cm
? Volume = ? r² h
= (22/7) x (7 x 7) x 7 = 1078 cm³