joshisthebest
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Projectile Motion Question (1 Viewer)
- Thread starter joshisthebest
- Start date
taking gravity, g=-10
Consider the horizontal components:
x''=0, x'=60cos45=60\sqrt2, x=60t\sqrt2
Consider the vertical components:
y''=-10, y'=-10t+60\sqrt2, y=-5t²+60t\sqrt2+50
set y=0, 5t²-60t\sqrt2-50=0
t=[60\sqrt2 +-sqrt(60²\2-4(5)(-50))]\10
=[60\sqrt2+-sqrt 2800]\10
t=9.534 by calculator, ignoring the negative value.
So it takes t=9.534 seconds to reach the sea
at this time, the particle would have travelled a distance given by
x=60(9.534)\sqrt2=404.49 m by calculator
that's the required "range"
Consider the horizontal components:
x''=0, x'=60cos45=60\sqrt2, x=60t\sqrt2
Consider the vertical components:
y''=-10, y'=-10t+60\sqrt2, y=-5t²+60t\sqrt2+50
set y=0, 5t²-60t\sqrt2-50=0
t=[60\sqrt2 +-sqrt(60²\2-4(5)(-50))]\10
=[60\sqrt2+-sqrt 2800]\10
t=9.534 by calculator, ignoring the negative value.
So it takes t=9.534 seconds to reach the sea
at this time, the particle would have travelled a distance given by
x=60(9.534)\sqrt2=404.49 m by calculator
that's the required "range"
SlaminSammy
Member
this needs to be done in 5 steps
first consider vetrically
time to reach max height ----- take up to be negative
v = u + at
0 = 60sin45 -9.8 x t
t = 4.33 s
max height
v^2 = U^2 + 2as
0 = (60sin45)^2 - 19.6 x s
s = 91.84 m
hence vertical displacement = 91.84 + 50 = 141.84m
velocity before hits ground
v^2 = u^2 + 2as
= 0 - 19.6 x 141.84
v = -52.73 m/s
time from max height to ground
v = u +at
-52.37 = 0 + -9.8 t
t = 5.38
hence total time = 5.38 + 4.33 = 9.71
consider horizontally
s = ut + 0.5at^2
s = 60cos45 x 9.71
s = 411.96m
therefore
range = 411.96m
of course you can use s = ut + .5at^2 to figure out time from max height to ground and take out a step but this is out of my league. :uhhuh:
first consider vetrically
time to reach max height ----- take up to be negative
v = u + at
0 = 60sin45 -9.8 x t
t = 4.33 s
max height
v^2 = U^2 + 2as
0 = (60sin45)^2 - 19.6 x s
s = 91.84 m
hence vertical displacement = 91.84 + 50 = 141.84m
velocity before hits ground
v^2 = u^2 + 2as
= 0 - 19.6 x 141.84
v = -52.73 m/s
time from max height to ground
v = u +at
-52.37 = 0 + -9.8 t
t = 5.38
hence total time = 5.38 + 4.33 = 9.71
consider horizontally
s = ut + 0.5at^2
s = 60cos45 x 9.71
s = 411.96m
therefore
range = 411.96m
of course you can use s = ut + .5at^2 to figure out time from max height to ground and take out a step but this is out of my league. :uhhuh:
I used a similar approach to both here .. however only in 2 steps ..
taking 9.8 as acceleration due to gravity ..
s[y] = u[y]t - .5at^2
-50 = 60sin45t - 4.9t^2
-50 = 60t/(sqrt 2) - 4.9t^2
4.9t^2 - 60t/(sqrt 2) - 50 = 0
Quadratic Forumlua (too much to type lol) but you know the drill -b +- (sqrt)(b^2-4ac)/(2a)
You get two values out, one is negative and the other is -> 9.709... seconds
Then, change in horizontal range = u[x]t = 60cos45 x 9.709 ... = 411.93m
Now that text book says 411 as the answer (as I use it as well) however we dont know if theyve taken g to be 9.8 or 10, and this textbook has a nice habit of rounding off answers (take a look at the previous questions answer)
edit: Just tried g = -10 and 404.499 ... the same answer that was calculated previously by another member
taking 9.8 as acceleration due to gravity ..
s[y] = u[y]t - .5at^2
-50 = 60sin45t - 4.9t^2
-50 = 60t/(sqrt 2) - 4.9t^2
4.9t^2 - 60t/(sqrt 2) - 50 = 0
Quadratic Forumlua (too much to type lol) but you know the drill -b +- (sqrt)(b^2-4ac)/(2a)
You get two values out, one is negative and the other is -> 9.709... seconds
Then, change in horizontal range = u[x]t = 60cos45 x 9.709 ... = 411.93m
Now that text book says 411 as the answer (as I use it as well) however we dont know if theyve taken g to be 9.8 or 10, and this textbook has a nice habit of rounding off answers (take a look at the previous questions answer)
edit: Just tried g = -10 and 404.499 ... the same answer that was calculated previously by another member
Last edited:
joshisthebest
New Member
- Joined
- Oct 25, 2005
- Messages
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- Gender
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- HSC
- 2006
Thanks for the help
