A small body attached to one end of a vertically hanging spring is performing (SHM) about is mean position with angular frequency (omega) and amplitude (a). If at a height (y*) from the mean position, the body gets detached from the spring, calculate the value of (y*) so that the height (H) attained by the mass is maximum. The body does noy interact with the spring during its subsquent motion after detachment. `(a omega^2 gt g)`. .A. `(g)/(omega^(2))`B. `(2g)/(omega^(2))`C. `(3g)/(omega^(2))`D. `(4g)/(omega^(2))`

A small body attached to one end of a vertically hanging spring is per

1.	A small body attached to one end of a vertically hanging spring is performing (SHM) about is mean position with angular frequency (omega) and amplitude (a). If at a height (y) from the mean position, the body gets detached from the spring, calculate the value of (y) so that the height (H) attained by the mass is maximum. The body does noy interact with the spring during its subsquent motion after detachment. `(a omega^2 gt g)`. .A. `(g)/(omega^(2))`B. `(2g)/(omega^(2))`C. `(3g)/(omega^(2))`D. `(4g)/(omega^(2))`
Answer» Correct Answer - A At distance `y` above then mean position velocity of the block. `v = w sqrt(A^(2) -y^(2))`. After detaching from the spring net downwrd acceleration of the block will be `g`. Therefore, total height attained by the block above the mean position. `h =y + (v^(2))/(2g) =y + (omega^(2)(A^(2) -y^(2)))/(2g)` For `h` to be maximum `(dh)/(dy) = 0` Putting `(dh)/(dy) =0`, we get `y = (g)/(omega^(2))`

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