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Projectile Motion AIM: how do we solve projectile problems in 2 dimensions?

Projectile Motion AIM: how do we solve projectile problems in 2 dimensions?. DO NOW What do you notice about the horizontal spacing of the dots? What does this mean about the horizontal motion of a projectile? What formula(s) can you use?. Horizontal Motion

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Projectile Motion AIM: how do we solve projectile problems in 2 dimensions?

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  1. Projectile MotionAIM: how do we solve projectile problems in 2 dimensions? • DO NOW • What do you notice about the horizontal spacing of the dots? • What does this mean about the horizontal motion of a projectile? • What formula(s) can you use?

  2. Horizontal Motion Use the subscript x to denote horizontal numbers Equally spaced lines implies constant speed NO horizontal acceleration Variables used vx dx t Formulas Projectile Motion ax vx dx t t t

  3. Projectile MotionAIM: how do we solve projectile problems in 2 dimensions? • What do you notice about the vertical spacing of the dots? • What does this mean about the vertical motion of a projectile? • What formula(s) can you use?

  4. Vertical Motion Use the subscript y to denote vertical numbers Lines that get progressively farther apart imply vertical acceleration Variables used viy dy ay vfy t Formulas Projectile Motion ay vy dy t t t

  5. Projectile Rules • Vertical acceleration is always 9.81m/s2 downwards for all objects at all times. • Horizontal acceleration is always zero. • You CAN NOT but a horizontal number in the same equation as a vertical number. • “thrown horizontally” means… • Viy is zero • “Dropped” means Viy is zero

  6. Projectile Rules • An object dropped and launched horizontally from the same height will hit the floor at the same time. • Mass does not matter • Horizontal launch speed does not matter • Final velocity is NOT zero • Time is the only number that has no direction and can be used in any equation.

  7. How to solve a projectile problem • Draw and label a diagram with every number they give you. • Make a list of all horizontal and vertical variables. KEEP THESE LISTS SEPARATE! • If you do not have time, find it! • Using the time found/given solve for the variable in question.

  8. Step 1: Draw and label diagram “launched horizontally” vx trajectory dy “height” dx “Range” or “distance from the base”

  9. Step 2: Separate variablesWe separate them because we cant mix them in equations!!!! Variable Chart

  10. Step 3: Solve for the variables asked for • REMEMBER: • you can not mix horizontal and vertical variables! • only time is the same in both columns • there is no vihorizontally because the horizontal velocity is constant • There is also NO horizontal acceleration • The time of flight only depends on the vertical variablesBullet dropped vs. bullet fired • max time of flight is when an object is launched straight up! • maximum range is when an object is launched at 45o to the horizontal.

  11. A toy car moving at 3m/s drives horizontally off of a 1.5m high table. • How long is the car in the air for? • How far away from the base of the table does the car land? • A set of keys is thrown horizontally at 12m/s from a window that is 30m high • How long are the keys in the air? • How far away from the base of the building do the keys hit the floor? • What is the final vertical velocity of the keys? • What is the final horizontal velocity of the keys? EXPLAIN! • A movie requires a car to drive horizontally off of a 50m high building. If the stunt crew decides to place the airbag 15m from the base of the building • How fast should the car drive off the building? • What would happen if the car drove off slower? • What would happen if the car drove off faster? • What would happen if the movie director decided he wanted to use a truck instead of a car? Would the stunt crew have to change the location of the air bag or tell the truck to drive at a different speed? DEFEND YOUR ANSWER!

  12. A motorcycle drives horizontally off of a cliff that is 25m high and is found 85m from the base of the cliff. If the speed limit on the road is 35m/s, was the motorcycle speeding? (assume the motorcycle didn’t skid after landing) • A rifle is shot perfectly horizontally and the bullet leaves the barrel of the gun at 100m/s. a. If the bullet is found 1.2km away from the gun, how high was the gun mounted off the ground? b. If the muzzle of the gun is 20cm long, what is the acceleration of the bullet while in the muzzle of the gun? c. How long is the bullet in the gun for? d. How long is the bullet in the air for?

  13. 6. You take a running start and jump horizontally off the roof of your house that is 12m high in an attempt to land on the roof of the building next door that is 7m tall. The horizontal spacing between the buildings is 6m. If you can run at 6.2m/s, do you make it?

  14. Projectiles Launched at an Angle on Level Ground vi θ

  15. Step 1: Create Diagram dmax vi θ dx “range”

  16. Step 2: Break down angled vector vi vx=vicosθ viy=visinθ viy θ vx

  17. Step 4: Decide which part of motion you are looking at OR Half Motion Whole Motion vi = _______ vf= ______ (will be negative of vi) a=-9.81m/s2 dy =0m ttotal = _____ (will be 2tup=2tdown) TO the Top • vi = ______ • vf=0m/s • a=-9.81m/s2 • dmax= • tup = FROM the Top • vi = 0m/s • vf=______ • a=-9.81m/s2 • dmax= • tdown =

  18. Step 3: Separate variables into horizontal and vertical then solve

  19. A motorcycle moving at 35m/s drives off a ramp that makes an angle of 50o to the horizontal. If the motorcycle lands at the same height it jumped from • What is the motorcycle’s mat height? • How long is the motorcycle in the air for? • How far away from the jump point does the motorcycle land? • During a soccer game, the goalie kicks a goal kick at 28m/s at an angle of 50o above the horizontal. How far from the goalie does the ball land? • During a football game, the kicker attempts a field goal that is 50m from the goal post which are 4m above the ground. The kicker kicks the ball at 22m/s at an angle of 42o above the horizontal. Assuming he aims on target, is the field goal good? If not why?

  20. Projectiles Launched up and over vi θ

  21. vf=0 vi dup To the top From the top θ TO the Top • vi = ______ • vf=0m/s • a=-9.81m/s2 • dup= • tup = dmax dy FROM the Top • vi = 0m/s • vf=______ • a=-9.81m/s2 • dmax= dup+dy • tdown =

  22. Whole Motion vi • viy = vi sin θ • vfy= • ay =-9.81m/s2 • d= -dy • ttotal = θ -dy make sure dy is negative You can find vf first then plug it in (as a negative number) to find t OR Plug into the distance formula and use the quadratic equation to get time.

  23. 6. You take a running start and jump off the roof of your house that is 12m above the ground. You can run at a speed of 5m/s and jump at an angle of 60o to the horizontal. a. How long are you in the air for? b. How far from the base of the house do you land?

  24. 7. A set of keys is thrown at 12m/s 35o above the horizontal from a window that is 30m high • How long are the keys in the air? • How far away from the base of the building do the keys hit the floor? • What is the final vertical velocity of the keys? • What is the final horizontal velocity of the keys? EXPLAIN!

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