PROJECTILE Practice Worksheet Ans. Key

PROJECTILE Practice Worksheet Ans. Key FORMULA BANK Horizontal Motion Formulas: x = vxo t + ½ a t 2 x = ½ (vxo + vxf) t Vertical Motion Formulas: y = yo + vyo t ½ g t 2 y = ½ (vyo + vyf) t Pythagorean Theorem: a 2 + b 2 = c 2 S.O.H.C.A.H.T.O.A.: To find the angle : tan = opp. sin = opp. 1 opp. an cos = 1 opp. = sin 1 = cos vxf = vxo + a t vxf 2 = vxo 2 + 2 a x vyf = vyo g t vyf 2 = vyo 2 2 g y b = opp. c = hypot. a = 1. A freshman runs off the bleachers and onto the football field as shown in the figure at right. The freshman s horizontal velocity is 8 m/s. Assume gravity is /s per second. 2. (a.) y = yo ½gt 2 What is the formula for height you would use for this problem (already adjusted for the problem situation)? Ans. The formulas for vertical motion that have time in them are y = yo ±vyot ½gt 2 and vyf = ±vyo gt. The first one is for height and the second one for final velocity. We will use the formula for height and modify it for our situation. The freshman has no initial vertical velocity (he has horizontal velocity but not vertical velocity). The freshman is also jumping from an elevated position () so she has initial height. So your final formula is y = yo ½gt 2 (b.) t = 1.41 sec In how many seconds would the freshman land on the ground? Givens g = /s 2 Uknown t (time to hit the ground) Equation From Probl. (a.) y = yo ½gt 2 Solve Let s solve for our variable in question, t: y = yo ½gt 2 yo yo y yo = ½gt 2 2 (y y o) = ½gt 2 2 2 (y y o) = gt 2 g g 2(y y o) g 2(y y o) g = t 2 2(y y o) g 2(0 m ) s 2 2.04 1. 41 m/s

(c.) 11.31 m How far (in m) would the freshman have moved horizontally in the time you found in Probl. (b). Givens vxo = 8 m/s (given initial horizontal velocity), t = 1.41 s (from Probl. (b.)) Uknown x (horizontal distance travelled by freshman) Equation the formula for horizontal distance: x = vxot + ½at 2 Adjusting for our situation (no horizontal acceleration): x = vxot Solve The formula is already solved for x: x = vxot x = vxot = (8 m/s)(1.41 s) = 11.31 m (d.) vyf = gt What is the formula for vertical velocity (in m/s) you would use for this problem (already adjusted for the problem situation)? Ans. The cousin formula for vertical velocity is vyf = g t, because the freshman has no initial vertical velocity. (e.) 14.14 m/s What would be the freshman s final vertical velocity (in m/s) right before he lands on the ground? Givens g = /s 2, t = 1.41 sec (from Probl. (b.)) Uknown vyf (freshman s final vertical velocity) Equation vyf = g t Solve The formula is already solved for v: vyf = g t vyf = g t = /s 2 1.41 sec = 14.14 m/s (f.) Draw and label the freshman s velocity vectors at the points indicated. Make sure you draw them to scale. The first one has been done for you. You should draw both v x, the horizontal components, v y, the vertical components, and v r, the resultant. You will be drawing a total of six arrows that are missing below. Also, label the angles that the resultant vectors make with the horizontal. Ans. STEP 1: The horizontal velocity does not change throughout so we can just copy the initial horizontal velocity vector and draw it exactly the same way at the other two points vxo = 8 m/s STEP 2: Let s measure the length of the horizontal velocity vector and set up a proportion to find our scale. The horizontal velocity is given to be 8 m/s and is 2.7 cm long. Set up a proportion: 2. 7 cm 8 m s = 0. 3375 cm per m s. STEP 3: Let s draw the vertical velocity vectors now according to our scale. At t = 0 sec, There is no initial vertical velocity. v yo = 0 m/s At t = 1 sec, the vertical velocity is vy = g t = /s 2 (1 sec) = /s Using our scale of 0.3375 cm per 1 m/s, /s 0.3375 cm per m/s = 3.375 cm At t = 1.41 sec, the vertical velocity, vy, is 14.14 m/s (ans. to Probl. (e.)). Using our scale of 0.3375 cm per 1 m/s, 14.14 m/s 0.3375 cm per m/s = 4.7725 cm

vxo = 8 m/s vx= 8 m/s vx= 8 m/s STEP 4: Let s draw the resultant velocity vectors now according to our scale. Just draw rectangles (parallelograms) around your horizontal and vertical velocity vectors. Your resultants will be the diagonals of the rectangles. Draw from the tail-to-tail vectors to the opposite corner of the rectangle always. vxo= 8 m/s vr = 12.81 m/s STEP 5: Using your scale, or the Pythagorean Theorem, find the magnitudes of the resultant velocities: Givens at t = 1 sec,, At t = 1.41 sec,,, Uknown v r (resultant velocity) Equation a 2 + b 2 = c 2 At t = 1 sec, At t = 1.41 sec, Solve a 2 + b 2 = c 2 vx 2 + vy 2 = vr 2 v 2 x + v 2 y = v r v 2 x + v 2 y = v r v x 2 + v y 2 = v r 2 (8 m s )2 + ( s )2 = v r vr = 16.25 m/s (8 m s )2 + (14. 14 m s )2 = v r v x2 + v y2 = v r 64 + 100 = v r 164 = v r 12.81 m/s = vr 64 + 199. 93 = v r 263. 94 = v r 16.25 m/s = vr

vxo= 8 m/s = 51.34 STEP 6: Use S.O.H.C.A.H.T.O.A, to find the direction (angles) of the resultant velocities: Givens at t = 1 sec,, At t = 1.41 sec,, Uknown (the launch angle) 1 opp. Equation an Solve The formula is already solved for. Substitute Plugging in our given information into our formula: 1 opp. 1 /s. an an 8 m/s. = 51.34 1 opp. 1 14.14 m/s. an an 8 m/s. = 60.50 vr = 12.81 m/s = 60.50 vr = 16.25 m/s 3. At the SMHS vs. Judson football game, the cheerleading squad launches a Rattler t-shirt with the t-shirt shooter into the bleachers from the football field with an initial velocity of 50 m/s at an angle of 40. Assume gravity is /s 2. (a.) 38.30 m/s = vxo What is the initial horizontal velocity (v xo) of the t-shirt (in m/s)? Ans. The initial horizontal velocity vxo can be obtained from taking apart vr, the initial velocity (resultant), into its horizontal and vertical components. G.U.E.S.S. Method. Givens vr = 50 m/s (the diagonal initial velocity), = 40 (the launch angle) Uknown vxo (the horizontal component of the velocity) Equation cos = Solve cos = cos = v xo v r. v r cos = v xo v r. v r v r cos = v xo Substitute v r cos = v xo (50 m ) cos (40 ) = v s xo 38.30 m/s = vxo 160 m = 40 V r = 50 m/s

(b.) 32.14 m/s = vyo What is the initial vertical velocity (v yo) of the t-shirt (in m/s)? Ans. The initial vertical velocity vyo can be obtained from the Pythagorean Theorem or by taking apart vr, the initial velocity (resultant), into its horizontal and vertical components. G.U.E.S.S. Method. Givens vr = 50 m/s (the diagonal initial velocity), = 40 (the launch angle) Uknown vyo (the vertical component of the velocity) Equation sin = opp. Solve sin = opp. sin = v yo v r. v r sin = v yo v v r. r v r sin = v yo (c.) 3.214 s In how many seconds will the t-shirt reach its maximum height? Ans. By mental math, we can estimate the time right away. If gravity, takes /s every second off the initial vertical velocity, v yo, which is 32.14 m/s, then it will take a 3.214 seconds for the vertical velocity to be zero. The vertical velocity is zero at the maximum height. G.U.E.S.S. Method (if you are not good at mental math). Givens vyo = 32.14 m/s (initial vertical velocity from Probl. (b.)), g = /s 2 Uknown t (time to reach maximum height) Equation v = ±vyo gt. Adjusted to our situation: v = vyo gt (because there is positive initial velocity) Solve We want to find t, the time. Solving: v = vyo gt v v v = vyo gt yo Substitute vyo vyo v vyo = gt g g v v yo g (d.) y = 51.65 m What is the maximum height (in m) the t-shirt will go? The mental math shortcut formula for this was ymax = v yo(t top ) Substitute v r sin = v yo (50 m ) sin (40 ) = v s yo 32.14 m/s = vyo = 32.14m (3.214 s) s = 51. 65 m 2 2 Ans. G.U.E.S.S. Method (if you don t like the shortcut) Givens vyo = 32.14 m/s (initial vertical velocity from Probl. (b.)), g = /s 2, t = 3.214 s (time to get to max. height from Probl. (c.)) Uknown y (maximum height) Equation y = yo ±vyot ½gt 2. Adjusted to our situation: y = vyot ½gt 2 (because there is positive initial velocity and no initial height) Solve We want to find y, the height, so we don t have to move anything around. y = vyot ½gt 2 Substitute y = 32.14 m/s(3.214 s) ½(/s 2 )(3.214 s) 2 y = 51.65 m (e.) 123. How far (in m) horizontally will the t-shirt have gone when it is at maximum height? Givens vxo = 38.30 m/s (horizontal velocity from Probl. (a.)), t = 3.214 s (time at maximum height from Probl. (c.)) Uknown x (horizontal distance) Equation x = vxot + ½at 2. Adjusted to our situation: x = vxot (because there is positive initial velocity and no acceleration) Solve We want to find x, the distance, so we don t have to move anything around. x = vxot Substitute x = vxot = 38.30 m/s (3.214 s) = 123. g 0 m s (32.14m s ) s 2 3. 214 s

(f.) 4.18 s After how many seconds will the t-shirt land in the stands 160 m away? Givens vxo = 38.30 m/s (horizontal velocity from Probl. (a.)), x = 160 m (distance in question) Uknown t (time at which t-shirt lands 160 m away) Equation x = vxot + ½at 2. Adjusted to our situation: x = vxot (because there is positive initial velocity and no acceleration) Solve We want to find t, the time. Solving for t: x = vxot Substitute vxo x vxo v xo x v xo 160 m (38.30 m s ) 4.18 s