A spherical solid ball of radius 8 mm is to be divided into eight equal parts by cutting it four times
longitudinally
al

2 thoughts on “A spherical solid ball of radius 8 mm is to be divided into eight equal parts by cutting it four times<br />longitudinally<br />al”

1. EXPLANATION.

   Spherical solid ball of radius = 8 mm.

   It is divided into 8 equal parts by cutting it 4 times longitudinally.

   As we know that,

   Surface area of each pieces = TSA/8 + Area of circle.

   As we know that,

   Formula of :

   Total surface area = 4πr².

   Area of circle = πr².

   Surface area of each pieces = 4πr²/8 + πr².

   Surface area of each pieces = πr²/2 + πr².

   Surface area of each pieces = πr² + 2πr²/2.

   Surface area of each pieces = 3πr²/2.

   Put the value in the equation, we get.

   Surface area of each pieces = 3/2 x (22/7) x 8 x 8.

   Surface area of each pieces = 4224/14.

   Surface area of each pieces = 301.71 mm².

   Reply

2. ✩ Correct Question :

   • A spherical solid ball of radius 8 mm is to be divided into eight equal parts by cutting it four times longitudinally along the same axis. Find the surface area of each of the final pieces thus obtained (in mm^2) ?(where pi= 22/7)

   ✩ Required Solution:

   • ➸ Having one curved surface and two plane surfaces in each identical part ,

   • ➸ Angle between the plane surfaces is 45°

   ✰ Value given to us :

   • ➸ Radio of ball (r) = 8mm

   ✩ According to question :

   • ➸ Total surface area of one part = (1/8) of curved surface area of sphere + 2×Area of semi-circle.

   • ➸ (1/8) × 4πr² + 2×(1/2 × πr²)mm²

   • ➸ (1/2) × πr²+ πr²mm²

   • ➸ (3/2) × πr² mm²

   ✩ Putting. r = 8

   • ➸ (3/2)×π×(8)². mm²

   • ➸ 96 × 22/7 mm²

   ➸ ✰ 301.7 mm² (Answer ) ✰

   ___________________________

   Reply