• Best of luck to the class of 2024 for their HSC exams. You got this!
    Let us know your thoughts on the HSC exams here
  • YOU can help the next generation of students in the community!
    Share your trial papers and notes on our Notes & Resources page
MedVision ad

projection of a 2d curve in 3d plane onto each of the planes (1 Viewer)

Joined
Apr 25, 2020
Messages
48
Gender
Female
HSC
2021
sorry if title doesn't make sense, im talking about parametric equations where one variable x y or z is 0 so the curve is technically only a 2d curve but it still exists in the 3d plane. would the projections onto 2 of the planes of either xy, xz or yz (in cartesian form) be x/y/z=0 or something else? because if you do it algebraically (subbing into 0 just gives 0) two of the three projections will be 0. but if you look at it from the side of those two planes there is still a line segment.
 

username_2

Active Member
Joined
Aug 1, 2020
Messages
116
Gender
Male
HSC
2020
umm... some visuals maybe - i cannot really understand what your saying but from what I can make of your statement, I can imagine the curve y=x^2 in the 3-d space. Now its parametric equation would be y = a^2 and x = a and z = 0. But if I, per se, want this parabola on the y-z plane, then it would be x=0 y=a and z=x^2 and so on... is that what you're asking?
 
Joined
Apr 25, 2020
Messages
48
Gender
Female
HSC
2021
umm... some visuals maybe - i cannot really understand what your saying but from what I can make of your statement, I can imagine the curve y=x^2 in the 3-d space. Now its parametric equation would be y = a^2 and x = a and z = 0. But if I, per se, want this parabola on the y-z plane, then it would be x=0 y=a and z=x^2 and so on... is that what you're asking?
ok so if i used a parabola as an example then
r(t)=(t, t^2, 0)
so x=t, y=t^2, z=0 so the cartesian equation of the projection of the curve on the xy plane is y=x^2. but the projections onto the yz plane is z=0 since u can't sub anything into z=0 and the projection onto the xz plane is also z=0 for the same reason. but if u graph it in 3d in geogebra, when u move the view perspective into a certain angle so u are perpendicular to the xz plane, the projection of the graph is a line segment and isn't just 0. hopefully this made sense?
 

username_2

Active Member
Joined
Aug 1, 2020
Messages
116
Gender
Male
HSC
2020
yes. i think i understand a bit. So what you're basically doing is this:

Imagine you had a piece of paper on a table and a pencil that is perpendicular to the table (this is the z-axis). Now if I look from the top (which is the x-y plane) i see a parabola (doesn't really matter what the eqn is). Aight. Now if I want to project this on to day the y-z plane then I will be looking from the side of the table (which is directly facing the y-z plane). Hence when you see this paper from the side, what you see is the edge of the paper - which is a straight line! The length of the line is the difference in the range extremes and hence you have "projected" the so-called curve onto the y-z plane but you haven't really affected the equation of the graph. hope this makes sense?
 
Joined
Apr 25, 2020
Messages
48
Gender
Female
HSC
2021
yes. i think i understand a bit. So what you're basically doing is this:

Imagine you had a piece of paper on a table and a pencil that is perpendicular to the table (this is the z-axis). Now if I look from the top (which is the x-y plane) i see a parabola (doesn't really matter what the eqn is). Aight. Now if I want to project this on to day the y-z plane then I will be looking from the side of the table (which is directly facing the y-z plane). Hence when you see this paper from the side, what you see is the edge of the paper - which is a straight line! The length of the line is the difference in the range extremes and hence you have "projected" the so-called curve onto the y-z plane but you haven't really affected the equation of the graph. hope this makes sense?
yess but if i were asked to find the equation of the projection, would it be 0 or a line?
 

username_2

Active Member
Joined
Aug 1, 2020
Messages
116
Gender
Male
HSC
2020
line - z = 0 to be precise from the initial value of y's range to the final value of final value of y's range
 
Joined
Apr 25, 2020
Messages
48
Gender
Female
HSC
2021
line - z = 0 to be precise from the initial value of y's range to the final value of final value of y's range
i’m not sure what u mean by z=0 is a line? shouldnt it be z=(any variable) and u restrict the domain of that variable according to the range of the line accordingly
 

username_2

Active Member
Joined
Aug 1, 2020
Messages
116
Gender
Male
HSC
2020
i’m not sure what u mean by z=0 is a line? shouldnt it be z=(any variable) and u restrict the domain of that variable according to the range of the line accordingly
no - I mean the projection's parametric equation would be z=0 and y=a where a is restricted within the original function's range (basically your x-component becomes 0). It is not what you are imagining - this are 3-d geometry and you cannot assume 2-d rules... atleast that is where I think the error is in your thinking.
 
Joined
Apr 25, 2020
Messages
48
Gender
Female
HSC
2021
no - I mean the projection's parametric equation would be z=0 and y=a where a is restricted within the original function's range (basically your x-component becomes 0). It is not what you are imagining - this are 3-d geometry and you cannot assume 2-d rules... atleast that is where I think the error is in your thinking.
ohhh.....ok thank you :))
 

Users Who Are Viewing This Thread (Users: 0, Guests: 1)

Top