A simple pendulum has time period T(1)/ ...

A simple pendulum has time period `T_(1)`/ The point of suspension is now moved upward according to the realtion `y = kt^(2)(k = 1 m//s^(2))` where `y` is vertical displacement, the time period now becomes `T_(2)`. The ratio of `((T_(1))/(T_(2)))^(2)` is : `(g = 10 m//s^(2))`

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A simple pendulum has time period (T_1). The point of suspension is now moved upward according to the relation y = K t^2, (K = 1 m//s^2) where (y) is the vertical displacement. The time period now becomes (T_2). The ratio of (T_1^2)/(T_2^2) is (g = 10 m//s^2) .

A simple pendulum has time period (T_1) . The point of suspension is now moved upward according to the relation y = K t^2, (K = 1 m//s^2) where (y) is the vertical displacement. The time period now becomes (T_2) . The ratio of (T_1^2)/(T_2^2) is (g = 10 m//s^2) .

A simple pendulum has time period T_(1) . The point of suspension is now moved upward according to the relation y= kt^(2)(k=1 ms^(-2)) where y is the vertical diplacement. The time period now becomes T_(2) . What is the ration (T_(1)^(2))/(T_(2)^(2)) ? Given g=10 ms^(-2)

A simple pendulum has time period T_1 . The point of suspension is now moved upward according to the relation. y = kt^2 (k = 2 m/ s^2 ) where y is the vertical displacement. The time period now becomes T_2 then the ratio of T_1^2 / T_2^2 (g = 10 m/ s^2 )

A simple pendulum has time period `T_(1)`/ The point of suspension is now moved upward according to the realtion `y = kt^(2)(k = 1 m//s^(2))` where `y` is vertical displacement, the time period now becomes `T_(2)`. The ratio of `((T_(1))/(T_(2)))^(2)` is : `(g = 10 m//s^(2))`

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