Suppose that the angular velocity of rotation of earth is increased. Then, as a consequence weight of the object, everywhere on the earth, will increase
Answers
Answer:
Answer:There will be no change in weight anywhere on the earth.
Answer:There will be no change in weight anywhere on the earth.Explanation:
Except at poles, weight of the object on the earth will decreas
Effect of angular velocity on acceleration due to gravity is given by
Effect of angular velocity on acceleration due to gravity is given byg
Effect of angular velocity on acceleration due to gravity is given byg 0
Effect of angular velocity on acceleration due to gravity is given byg 0 =g−ω
Effect of angular velocity on acceleration due to gravity is given byg 0 =g−ω 2
Effect of angular velocity on acceleration due to gravity is given byg 0 =g−ω 2 Rcosθ
Effect of angular velocity on acceleration due to gravity is given byg 0 =g−ω 2 Rcosθso with increase in ω the g
Effect of angular velocity on acceleration due to gravity is given byg 0 =g−ω 2 Rcosθso with increase in ω the g 0
Effect of angular velocity on acceleration due to gravity is given byg 0 =g−ω 2 Rcosθso with increase in ω the g 0 decreases
Effect of angular velocity on acceleration due to gravity is given byg 0 =g−ω 2 Rcosθso with increase in ω the g 0 decreasesbut at poles θ=90
Effect of angular velocity on acceleration due to gravity is given byg 0 =g−ω 2 Rcosθso with increase in ω the g 0 decreasesbut at poles θ=90 o
Effect of angular velocity on acceleration due to gravity is given byg 0 =g−ω 2 Rcosθso with increase in ω the g 0 decreasesbut at poles θ=90 o ;cosθ=0 so g
Effect of angular velocity on acceleration due to gravity is given byg 0 =g−ω 2 Rcosθso with increase in ω the g 0 decreasesbut at poles θ=90 o ;cosθ=0 so g 0
Effect of angular velocity on acceleration due to gravity is given byg 0 =g−ω 2 Rcosθso with increase in ω the g 0 decreasesbut at poles θ=90 o ;cosθ=0 so g 0 =g