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ludac

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Talia is holding the garden hose at ground level and pointing it obliquely so that it sprays water in a parabolic path 2 meters high and 8 meters long. Find, using g= 10m/s^2, the initial speed and angle of elevation, and the time each droplet of water is in the air. Where is the latus rectum of the parabola :spzz:
 

random-1006

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Talia is holding the garden hose at ground level and pointing it obliquely so that it sprays water in a parabolic path 2 meters high and 8 meters long. Find, using g= 10m/s^2, the initial speed and angle of elevation, and the time each droplet of water is in the air. Where is the latus rectum of the parabola :spzz:

doesnt seem that bad

we know max height is 2, and the range is 8

we know corresponding expressons for these as well:

let a be launch angle

now we have : V^2 sin(2a) / g =8
V^2 (sina)^2 / 2g =2
expanding sin2a as 2 sinacosa, and dividing eqn 1 by eqn 2

we get tana=1

rearranging eqn 2 for V^2 and subing into second half of eqn below ( stuff in bold below)



now the path ( y in terms of x)

y= xtana - [g (seca)^2 x^2] / [2V^2]
= x - [x^2 (tana)^2]/ 8, but tana=1

therefore y= x -x^2/ 8 { now complete square}

y= -(1/8) { x^2 -8x}
y= -(1/8) { x^2 -8x +16 -16} ( note the -16 was expanded out, and two negatives make a positive}
y= -(1/8) [ x-4]^2 +2
(x- 4)^2 =-8 ( y- 2)


a=2, and its concave down

so vertex= (4,2)
focus= (4, 0)
now latus rectum goes through focus, perpendicular to the axis of symmetry

latus rectum: y= 0 { ie the ground}

this should make sense as remember the length of the latus rectum= 4a { this is the "a" in x^2 = 4ay, NOT the launch angle} = 4(2)= 8= RANGE in this case, so you can be pretty sure you havent made a mistake.


the other parts of the question are easy ( we know that tana=1, ie a= 45 degrees)

from eqn 1:

V^2 sin(2a) / g =8 {you can find V as you know a= 45 degrees)}

then initial x velocity= Vcosa, initial y velocity= Vsina

and the initial velocity ( all together, velocity= sqrt ( (x velocity)^2 + (y velocity)^2 )

and time of flight is standard.

of course in an exam you would have to derive ALL THESE formulas ( eqn of path, time of flight, max height, range) , if this question came up it would be worth like probably 12 marks because there is so much work. really nice question
 
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random-1006

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You mean, more like 6 or 7 marks? :rolleyes:
ok 1 mark for each formula that you derive ( thats 4), 1 mark for getting tana=1, 1 mark for getting y= x -x^2/8 , 2 marks for getting eqn of latus rectum, then another 1 mark for finding initial speed, maybe another mark for the time of flight. there is a fair amount of working noob. ok about 9marks ( maybe 10), The point is, its a fair few. i reckon this is probably about 9 marks ( of Q5-6 level difficulty )
 
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cutemouse

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see i like questions like that which involve 2 unit knowledge, would catch out someone like you easy.
I think I pretty much burned you with that probability question :p

ok 1 mark for each formula that you derive ( thats 4)
If you're talking about the eqns of motion then you wont get 1 mark for each formula (ie. for x, dx/dt, y, dy/dt). They don't mark that way in the HSC generally.
 
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