Advertisements
Advertisements
प्रश्न
If the ratio of volumes of two spheres is 1 : 8, then the ratio of their surface areas is
पर्याय
1 : 2
1 : 4
1 : 8
1 : 16
Advertisements
उत्तर
Here, we are given that the ratio of the two spheres of ratio 1:8
Let us take,
The radius of 1st sphere = r1
The radius of 1st sphere = r2
So,
Volume of 1st sphere (V1) = `4/3 pi r_1^3`
Volume of 2nd sphere (V2) = `4/3 pi r_2^3`
Now, `V_1/V_2 = 1/8`
`((4/3 pi r_1^3))/((4/3 pi r_2^3)) = 1/8`
`r_1/r_2 = 1/8`
`r_1/r_2 = 3sqrt(1/8)`
`r_1/r_2 = 1/2` ...(1)
Now, let us find the surface areas of the two spheres
Surface area of 1st sphere (S1) = `4 pi r_1^2`
Surface area of 2nd sphere (S2) = `4 pi r_2^2`
So, Ratio of the surface areas,
`S_1/S_2 = (4pir_1^2)/(4 pi r_2^2)`
`=r_1^2/r_2^2`
` = (r_1/r_2)^2`
Using (1), we get,
`S_1 /S_2 = ( r_1/r_2)^2`
`= (1/2)^2`
`= (1/4)`
Therefore, the ratio of the spheres is 1 : 4.
APPEARS IN
संबंधित प्रश्न
Find the total surface area of a hemisphere of radius 10 cm. [Use π = 3.14]
Find the radius of a sphere whose surface area is 154 cm2.
`["Assume "pi=22/7]`
A certain number of metallic cones, each of radius 2 cm and height 3 cm are melted and recast into a solid sphere of radius 6 cm. Find the number of cones.
On a map drawn to a scale of 1: 50,000, a rectangular plot of land ABCD has the following dimensions. AB = 6 cm; BC = 8 cm and all angles are right angles. Find:
1) the actual length of the diagonal distance AC of the plot in km.
2) the actual area of the plot in sq. km.
Two solid spheres of radii 2 cm and 4 cm are melted and recast into a cone of height 8 cm. Find the radius of the cone so formed.
Find the surface area of a sphere of diameter 14 cm.
A spherical ball of lead has been melted and made into identical smaller balls with radius equal to half the radius of the original one. How many such balls can be made?
If the number of square centimeters on the surface of a sphere is equal to the number of cubic centimeters in its volume, what is the diameter of the sphere?
Metallic spheres of radii 6 cm, 8 cm and 10 cm respectively are melted and recasted into a single solid sphere. Taking π = 3.1, find the surface area of the solid sphere formed.
A largest sphere is to be carved out of a right circular cylinder of radius 7 cm and height 14 cm. Find the volume of the sphere.
Find the total surface area of a hemisphere of radius 10 cm.
The total surface area of a hemisphere of radius r is
A hemispherical and a conical hole is scooped out of a.solid wooden cylinder. Find the volume of the remaining solid where the measurements are as follows:
The height of the solid cylinder is 7 cm, radius of each of hemisphere, cone and cylinder is 3 cm. Height of cone is 3 cm.
Give your answer correct to the nearest whole number.Taken`pi = 22/7`.
How many lead balls of radii 1 cm each can be made from a sphere of 8 cm radius?
The total area of a solid metallic sphere is 1256 cm2. It is melted and recast into solid right circular cones of radius 2.5 cm and height 8 cm. Calculate: the number of cones recasted [π = 3.14]
A conical tent is to accommodate 77 persons. Each person must have 16 m3 of air to breathe. Given the radius of the tent as 7 m, find the height of the tent and also its curved surface area.
A spherical cannon ball, 28 cm in diameter is melted and recast into a right circular conical mould, the base of which is 35 cm in diameter. Find the height of the cone, correct to one place of decimal.
The surface area of a solid metallic sphere is 616 cm2. It is melted and recast into smaller spheres of diameter 3.5 cm. How many such spheres can be obtained?
A spherical ball of radius 3 cm is melted and recast into three spherical balls. The radii of two of the balls are 1.5 cm and 2 cm. Find the diameter of the third ball.
A solid sphere is cut into two identical hemispheres.
Statement 1: The total volume of two hemispheres is equal to the volume of the original sphere.
Statement 2: The total surface area of two hemispheres together is equal to the surface area of the original sphere.
Which of the following is valid?
