Chapter 3
Motion in Two Dimensions:
Curved motion in a plane is motion in two dimensions. For example, if an object is to move along a semicircle as shown in the following figure, its position at any given time ( t ) can be determined by its two coordinates ( x ) and ( y ).
An excellent example of twodimensional motion is the motion of a projectile. The motion of a projectile is a combination of two motions: (1) a constant speed motion in the horizontal direction, and (2) an accelerated motion in the vertical direction. For example, when a football is kicked or a cannonball fired, its shadow on a flat and horizontal ground moves at constant speed while its shadow on a vertical wall decelerates upward and comes to stop and then accelerates downward. Visualize a scenario in which the Sun is shining straight down and casts the shadow of the football on the ground while very bright horizontal light beams cast the shadow of the ball on a vertical wall as well.
The path of motion of the ball in air (neglecting air resistance) is a parabola. This parabolic motion can be replaced by a constant speed motion in the horizontal direction (xaxis) and an accelerated motion in the vertical direction (yaxis). The reason for the constant speed motion along the xaxis is that there is no gravitational pull horizontally to accelerate the ball and, neglecting air resistance, there is no force to slow it down. In the ydirection, because of the gravitational pull, it first slows down as it goes upward, and then speeds up as it returns to the ground. The equations of motion are:
In the xdirection: In the ydirection:
x = (1/2) a_{x} t^{2} + v_{ix } t y = (1/2) g t^{2} + v_{iy } t
Since a_{x} = 0, g = (v_{fy} v_{iy} )/ t (write this down with a horizontal fraction bar).
x = v_{ix } t v_{fy}^{2}  v_{iy}^{2} = 2 g y.
In the above equations, V_{ix} and V_{iy} are the horizontal and vertical components of the initial velocity vector. The velocity vector, itself, always acts tangent to the path of motion. Look at the following figure. It shows the path of a projectile that is thrown at velocity V_{i} = (V_{i }, θ) from Point O. As the object moves along the path, its xcomponent of velocity, V_{ix}, remains constant, but its ycomponent of velocity, V_{y}, first keeps decreasing until the object reaches its highest elevation at C. Compare the lengths of the vectors used to show the magnitudes of V_{y}_{ }at points O, A, B, and C. At C, the highest point, Vy = 0. As the object passes Point C and starts descending, its ycomponent of velocity, V_{y}, keeps increasing but downward, until it is about to hit the ground where it reaches is maximum value. If the ground is level and air resistance can be neglected, V_{y} at Point F will have the same magnitude as V_{i} at O, but opposite direction.
Answer the following questions: First think, then answer, and then click to check your answer.
1) As a projectile moves along its parabolic path, which velocity component does not change, V_{x} or V_{y}? Click here.
2) Does V_{y} increase or decrease as the object goes upward? Click here.
3) Is there any gravitational pull to accelerate the object in the xdirection? Click here.
4) If air resistance is negligible, is there any force to slow down the object in any direction? Click here.
5) Does the magnitude of V_{y} increase or decrease as the object goes downward from the highest point? Click here.
6) If the angle of throw ( θ ) and the initial velocity ( V_{i }) are known, can V_{ix} and V_{iy} be calculated? Click here.
7) Write down the formulas that calculates V_{ix} and V_{iy }. Click here.
8) A cannon ball is fired at an initial velocity of V_{i} = (312m/s, 38.0° ). What are the components of the initial velocity in the x and y directions? (a) 312m/s, 312m/s (b) 246m/s,192m/s (c) 12m/s, 0.
You are standing in a 25m/smoving train car holding a basketball. Let the closed car have a high enough ceiling for the ball to go as high as it needs. If you throw the basketball straight upward with respect to the train car at a vertical upward speed of 1.0m/s, determine if the following are (T) true or (F) false:
9) The ball will land in you hand after coming back down. (T) or (F)
10) The horizontal component of the ball's velocity is 25m/s. (T) or (F) Click here.
11) The initial vertical component of the ball's velocity is at 1.0m/s. (T) or (F)
12) An observer standing on the ground watching the process notices a parabolic path of motion for the ball not just a straight upanddown motion as is observed by you. (T) or (F) Click here.
13) To the observer standing out of the train, the initial velocity vector is V_{i} = [25.02m/s , 2.3°] (T) or (F)
At this point, it is a good idea to start again (objectively) from the beginning of this chapter again.
Example 1: A cannon ball is fired at an initial speed of 250m/s through a 27° angle. Determine (a) its horizontal and vertical components of velocity, (b) the time it takes to reach the highest point, (c) the highest elevation it reaches, (d) the time it spends in air before landing, (e) the farthest horizontal distance it travels before landing, and (f) the equation of its path.
Solution:
(a) V_{ix} = 250cos(27°) = 223m/s ; V_{iy} = 250sin(27°) = 113m/s.
(b) At the highest point, V_{fy} = 0 ; from g = (V_{fy}  V_{iy}) / t ; t = (V_{fy}  V_{iy}) /g = (0  113 ) / 9.8 = 12s.
(c) At the highest point, V_{fy} = 0 ; from (V_{fy})^{2}  (V_{iy})^{2} = 2 g y ; 0^{2}  113^{2} = 2(9.8)y ; y = 650m.
(d) Using the result of Part (b), t_{total} = 2(12s) = 24s.
(e) Using the only xequation, x = V_{ix} t, x = ( 223 m/s)( 24s ) = 5400m
(f) To find the equation of the path (a parabola), the common variable or the common parameter ( t ), must be eliminated between the x and ycomponents of motion. To do this, let us first write down the equations of motion in the x and y directions.
In the ydirection, y = (1/2) g t^{2} + V_{iy}t ; y = 4.9t^{2} + 113t
In the xdirection, x = V_{ix} t ; x = 223 t or t = x / 223
Substituting for ( t ) in the yequation, yields:
y = 4.9( x / 223)^{2} + 113 ( x / 223) or, y = 0.000099 x^{2} + 0.51 x (Parablola)
Example 2: A small ball is rolling at a speed of 5.0m/s on a horizontal table 1.2m high with respect to the floor. How far from the edge of the table does it land after rolling off the table?
Chapter 3 Test Yourself 1:
A football is kicked through a 30.0°angle at a speed of 15.0m/s. For answers Click here.
1) The x and y components of its initial velocity are: (a)7.50m/s, 13.0m/s (b)15.0m/s, 15.0m/s (c)13.0m/s, 7.50m/s.
2) The time it takes for the ball to reach its maximum height is (a)1.88s (b)1.33s (c) 0.765s.
3) On a flat and horizontal field, the time that the ball spends in air before landing is (a) 2.66s (b) 1.53s (c) 3.06s.
4) The maximum height it reaches is (a) 9.6m (b) 2.87m (c) 17.2m. Click here.
5) The distance it travels horizontally before landing is (a)19.9m (b) 9.95m (c) 4.9m.
Problem: A toy car pushed by a kid on a horizontal table 1.00m high with respect to the floor leaves the table's edge horizontally and strikes the floor, as shown. Answer the following questions. Perform calculations before answering, if necessary.


6) The initial velocity vector is (a) V_{i} = (5m/s, 90°) (b) V_{i} = (5m/s, 45°) (c) V_{i} = (5m/s, 0.0°).
7) The time it takes for the car to travel the vertical height of 1.0m is (a) 1/2 of the time it takes to travel the horizontal distance, x (b) equal to the time it takes to travel the horizontal distance, x (c) is twice the time for traveling the horizontal distance, x.
8) The initial speed in the ydirection is (a) 5m/s (b) 0 (c) 5tan(90°).
9) The falling time of the car is (a)1.0s ( b) 0.451s (c) 0.98s. (To check your answers Click here ).
10) The horizontal distance, x, traveled by the toy car, while in air, is (a) 2.25m (b) 4.55m (c) 1.25m.
Problem: A kid is standing at a distance x from the edge of a building 37.0m high. He throws a rock through a 42°angle with the horizontal such that it almost passes at the top edge of the building horizontally. The kid's hand is 1.0m above the horizontal ground at the instant the rock leaves his hand. Let the kid be on the left side of the building and draw a rough sketch and show the halfparabola that is the rock's trajectory with the peak of the parabola being the top of the building. Set the xy coordinates at the kid's hand and draw the initial velocity vector, V_{i} with an angle of throw of 42°. Show all distances and answer the following questions:
11) The ycomponent of the initial velocity is (a) V_{i } cos42° (b) V_{i }sin42° (c) V_{i }tan42° . Click here.
12) At the peak of the parabola, the ycomponent of velocity (V_{y}) is (a) zero (b) nonzero (c) (1/2)V_{i}.
13) In ydirection, using V_{fy}^{2}  V_{iy}^{2} = 2gy results in (a) V_{i}^{2 }(sin42°)^{2} = 705.6 (b) V_{i}^{2 }(sin42°)^{2} = 725.2 (c) sinθ = 2.
14) Solving for V_{i} from question 13(a) results in (a) V_{i} = 39.7 m/s (b) V_{i} = 41.2 m/s (c) V_{i} = 12m/s. Click here.
15) The height of the building may be found using the fact that at the peak (a) V_{ix} = 0 (b) V_{y} = 0 (c) V_{y} < 0.
16) The time it takes for the rock to reach the top is (a) 2.71s (b) 5.42s (c) 1.35s.
17) x, the kid's distance from the wall is (a) 40.0m (b) 20.0m (c) 80.0m. Click here.
Problem: A cannon ball is fired at an initial velocity of 320m/s through a 41° angle.
(18) Find the horizontal and vertical components of velocity, V_{ix} and V_{iy}.
(19) Write the x and ycomponents of equation of motion of the ball.
(20) Eliminate the common variable (t) between these two equations in order to arrive at the algebraic equation for its parabolic path of motion. Click here.
Problems:
Note: Before solving each problem, draw an appropriate figure for it.
1) A kid throws a tiny rock at the ground level at 14.0m/s through a 44.0° angle. Find (a) the horizontal and vertical components of the initial velocity, (b) the highest elevation it reaches, (c) the time the rock spends in air, and (d) the horizontal distance it travels.
2) Water from a fire hose, held at 60.0° with respect to the horizontal, comes out at a speed of 23.0m/s. The fireman adjusts his distance from the building to where water moves horizontally at the top edge of the building; in other words, the water jet forms exactly a halfparabola. Draw a picture for the problem and find (a) the height of the building and (b) the fireman's distance from the foot of the building knowing that the nozzle is held 1.0m above the ground. g = 9.81m/s^{2}.
3) A tiny metal sphere rolling at 2.80m/s on a horizontal table rolls off the table edge and falls on the floor at a point that is 1.40m from the foot of the table. Using g = 9.81m/s^{2}, and neglecting air resistance, find (a) the falling time, and (b) the height of the table.
4) A cyclist is trying to jump over a number of busses parked sidebyside each other. The ramp angle is 32.0° and the maximum speed he can achieve as he leaves the first ramp is 28.0m/s. The highest points on both the takeoff ramp and the landingramp are at the same level as the busses' roofs are. If each bus including its spacing from the next bus requires a width of 3.00m, calculate the theoretical maximum number of busses that he can jump over. g=9.81m/s^{2}
5) Moving eastward, a car rolls off a vertical cliff at an initial speed of 25.0m/s. The cliff angle is 10.0° below horizontal. The cliff edge is 6.60m above the lake surface. Find (a) its vertical speed just before hitting the lake surface, (b) the falling time, (c) the horizontal distance it travels before hitting the lake surface, and (d) the magnitude and direction of the velocity at which it enters the lake. g=9.81m/s^{2}.
Answers:
1) (a) 10.1m/s, 9.73m/s (b) 4.82m (c) 1.98s (d) 20.0m
2) (a) 21.2m (b) 23.3m
3) (a) 0.500s (b) 1.23m
4) (a) 23
5) (a) 12.2m/s (b) 0.801s (c) 19.7m (d) 27.4m/s at 26.4°