Three balls of same masses are projected with equal speeds at angle `15^(@), 45^(@), 75^(@)`, and their ranges are respectively `R_(1),R_(2)` and `R_(3)`, then

Four balls A, B, C and D are projected with equal velocities having angles of projection 15^(@) , 30^(@) , 45^(@) and 60^(@) with the horizontal, respectively. The ball having the smallest range is

If four balls A,B,C,D are projected with same speed at angles of 15^(@),30^(@),45^(@) and 60^(@) with the horizontal respectively, the two balls which will fall at the same place will be-

In case of projectle motion if two projectles A and B are projected with same speed at angles 15^(@) and 75^(@) respectively to the horizontal then:

Two particles are projected with same speed but at angles of projection (45^(@)-theta) and (45^(@)+theta) . Then their horizontal ranges are in the ratio of

Three projectiles A, B and Care projected at an angle of 30^@, 45^@, 60^@ respectively. If R_A, R_B and R_C are ranges of A, B and C respectively then (velocity of projection is same for A, B and C)

Two particle A and B are projectied from the same point at angles 37^(@) and 45^(@) respectile. If R_(A) and R_(B) are the range of two projectile ,then

Four projectiles are projected with the same speed at angles 20^@,35^@,60^@ and 75^@ with the horizontal. The range will be the maximum for the projectile whose angle of projection is

Two balls of equal mass are projected from a tower simultaneously with equal speeds. One at angle theta above the horizontal and the other at the same angle theta below the horizontal. The path of the center of mass of the two balls is

Two particles are projected from ground with same intial velocities at angles 60^(@) and 30^(@) (with horizontal). Let R_(1) and R_(2) be their horizontal ranges, H_(1) and H_(2) their maximum heights and T_(1) and T_(2) are the time of flights.Then