Advertisements
Advertisements
प्रश्न
Volume of a cone is 1232 cm3 and its height is 24 cm. Find the surface area of the cone. `( π = 22/7)`
उत्तर
Let the radius of the base and slant height of the cone be r cm and lcm, respectively.
Height of the cone, h = 24 cm
Volume of the cone = 1232 cm3
∴ `1/3`πr2h = 1232 cm3
∴ `1232 = 1/3 × 22/7 × r^2 × 24`
⇒ `(1232xx3xx7)/(22xx24) = r^2 ...("Multiplying both sides by" 3xx7/22xx1/24)`
⇒ r2 = 49
⇒ r = `sqrt(49)`
⇒ r = 7 cm
Now,
l2 = r2 + h2
⇒ l2 = (7)2 + (24)2
⇒ l2 = 49 + 576
⇒ l2 = 625
⇒ l = `sqrt 625`
⇒ l = 25 cm
∴ Curved Surface area of the cone = πrl
= `22/7 xx 7 xx 25`
= 550 cm2
Thus, the surface area of the cone is approximately 550 cm2.
Notes
There is a printing mistake in the textbook, the Volume of a cone is 1232 cm3 instead of 1212 cm3
APPEARS IN
संबंधित प्रश्न
The radius of a cone is 5 cm and vertical height is 12 cm. Find the area of the curved surface.
Find the total surface area of a right circular cone with radius 6 cm and height 8 cm.
The curved surface area of a cone is 4070 cm2 and its diameter is 70 cm. What is its slant height? (Use it 𝜋 = 22/7).
What length of tarpaulin 3 m wide will be required to make a conical tent of height 8 m and base radius 6 m? Assume that the extra length of material will be required for stitching margins and wastage in cutting is approximately 20 cm (Use it 𝜋 = 3.14)
Find the volume of a right circular cone with:
radius 6 cm, height 7 cm.
Find the volume of a cone whose slant height is 17 cm and radius of base is 8 cm.
The radius and the height of a right circular cone are in the ratio 5 : 12 and its volume is 2512 cubic cm. Find the radius and slant height of the cone. (Take π = 3.14)
A cone and a hemisphere have the same base and the same height. Find the ratio between their volumes.
The curved surface area of a right circular cone of radius 11.3 cm is 710 cm2. What is the slant height of the cone ?
A cloth having an area of 165 m2 is shaped into the form of a conical tent of radius 5 m. Find the volume of the cone.
