With what minimum speed must a particle be projected from origin so that it is able to pass through a given point `(30m, 40m)` ? Take `g=10m//s^(2)`

A particle is projected from the origin in such a way that it passes through a given point P (a, b} What is the minimum requrired speed to do so?

A body is projected from the ground with some speed at some angle with the horizontal. Taking the horizontal and vertical direction to be x and y axis respectively and the point of projection as origin, calculate the minimum speed (in ms^(-1) ) of projection so that it can pass through a point whose x and y coordinates are 30 m and 40 m respectively? Take g=10ms^(-2)

Track OABCD (as shown in figure ) is smooth. What minimum speed has to be given to a particle lying at point A, so that it can reach point C? (take g=10 m//s^2 )

How high must a body be lifted so that it gain P.E. equal to its KE while moving with a velocity of 30m//s ?Take g=10m//s^(2)

A projectile is projected from top of a wall 20m height with a speed of 10m/s horizontally. Find range (g = 10m/s^(2))

A ball is projected vertically up with speed 20 m/s. Take g=10m//s^(2)

A particle is projected with velocity of 10m/s at an angle of 15° with horizontal.The horizontal range will be (g = 10m/s^2)

A particle is projected from ground with velocity 20(sqrt2) m//s at 45^@ . At what time particle is at height 15 m from ground? (g = 10 m//s^2)

A particle is projected at an angle 60^(@) with the horizontal with a speed 10m//s . Then, latus rectum is (Take g=10m//s^(2) )

What are the two angles of projection of a projectile projected with velocity of 30 m//s , so that the horizontal range is 45 m . Take, g= 10 m//s^(2) .