Two particles are projected vertically upwards from the surface of the earth with velocities `upsilon_(1) = sqrt((2gR)/3) and upsilon_(2) = sqrt((4gR)/(3))` respectively. If the maximum heights attained by the two particles are `h_(1)` and `h_(2)` respectively, then calculate the ratio `(h_1)/(h_2)`.

Three particles are projected vertically upward from a point on the surface of the earth with velocities sqrt(2gR//3) surface of the earth. The maximum heights attained are respectively h_(1),h_(2),h_(3) .

Three particles are projected vertically upward from a point on the surface of earth with velocities v_(1)=sqrt((2gR)/(3)),v_(2)sqrt(gR),v_(3)sqrt((4gR)/(3)) respectively, where g is acceleation due to gravity on the surface of earth. If the maximum height attained are h_(1),h_(2) " and " h_(3) respectively, then h_(1):h_(2):h_(3) is

For statement of question 118, if the heights of the two images are h_(1) and h_(2) , respectively,then the height of the object (h) is

A particle is projected vertically upwards with a velocity sqrt(gR) , where R denotes the radius of the earth and g the acceleration due to gravity on the surface of the earth. Then the maximum height ascended by the particle is

A particle is fired vertically from the surface of the earth with a velocity kupsilon_(e) , where upsilon_(e) is the escape velocity and klt1 . Neglecting air resistance and assuming earth's radius as R_(e) . Calculated the height to which it will rise from the surface of the earth.

When the angle of elevation of a gun are 60^(@) and 30^(@) respectively, the height it shoots are h_(1) and h_(2) respectively, h_(1)//h_(2) equal to –