the ratio of volume of cube to that of sphere which will exactly fit inside the cube is...........please friend explain briefly....
Answers
Step-by-step explanation:
let volume of cube be "l^3"
let volume of cube be "l^3"so largest cube which exactly fits is of diameter "l"
let volume of cube be "l^3"so largest cube which exactly fits is of diameter "l"so,
let volume of cube be "l^3"so largest cube which exactly fits is of diameter "l"so, radius = l/2
let volume of cube be "l^3"so largest cube which exactly fits is of diameter "l"so, radius = l/2 required volume = 4 pie r^3
let volume of cube be "l^3"so largest cube which exactly fits is of diameter "l"so, radius = l/2 required volume = 4 pie r^3 4 pie × l^3 /8
let volume of cube be "l^3"so largest cube which exactly fits is of diameter "l"so, radius = l/2 required volume = 4 pie r^3 4 pie × l^3 /8pie × l^3 / 2
let volume of cube be "l^3"so largest cube which exactly fits is of diameter "l"so, radius = l/2 required volume = 4 pie r^3 4 pie × l^3 /8pie × l^3 / 2required ratio
let volume of cube be "l^3"so largest cube which exactly fits is of diameter "l"so, radius = l/2 required volume = 4 pie r^3 4 pie × l^3 /8pie × l^3 / 2required ratio l^3 / pie × l^3 / 2
let volume of cube be "l^3"so largest cube which exactly fits is of diameter "l"so, radius = l/2 required volume = 4 pie r^3 4 pie × l^3 /8pie × l^3 / 2required ratio l^3 / pie × l^3 / 2is 2:pie
Answer:
Volume of cube /Volume of sphere= 1/231
Hope this bring a smile in your face
Step-by-step explanation: