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First Year Mathematics A (Differentiation & Linear Algebra) (1 Viewer)

Flop21

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Re: MATH1131 help thread

Does the point (-3,3,6) lie on the plane:

x = <2,1,-1> + lamda1<-1,2,4> + lamda2<3,2,1>.


If anyone wants to work that question out for practice and post the working out to it, that'd be awesome :)


I'm getting to the point where I reduce the matrix (before that I made the plane equation = the point, then rearranged), but it's not working out nicely at all.
 
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leehuan

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Re: MATH1131 help thread

>> A=[-1,3;2,2;4,1]

A =

-1 3
2 2
4 1

>> b=[-3;4;6]-[2;1;-1]

b =

-5
3
7

>> rref([A b])

ans =

1 0 0
0 1 0
0 0 1

>>

My Matlab output suggests that the point does not lie in the plane as there is clearly no solution to this linear system
I'll let someone else do the working
 

Flop21

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Re: MATH1131 help thread

Sorry I had a typo on the first point D:

Answers say 'yes' .
 

Flop21

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Re: MATH1131 help thread

Find a vector with a magnitude of 10 which is parallel to u. u = <2,1,7>.



*I know the answer, don't know how to get there.

Thanks
 

leehuan

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Re: MATH1131 help thread

Sorry I had a typo on the first point D:

Answers say 'yes' .
A=[-1,3;2,2;4,1]

A =

-1 3
2 2
4 1

>> b=[-3;3;6]-[2;1;-1]

b =

-5
2
7

>> rref([A b])

ans =

1 0 2
0 1 -1
0 0 0
With the adjusted point MATLAB suggests yes as well
_________________
The augmented matrix [A | b] is

-1 3 | -5
2 2 | 2
4 1 | 7

Upon R2 <- R2 + 2*R1
And R3 <- R3 + 4*R1

-1 3 | -5
0 8 | -8
0 13 | -3

The rest of the row reduction process is trivial
 

turntaker

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Re: MATH1131 help thread



this is probably really simple: they are vectors
 
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InteGrand

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Re: MATH1131 help thread



this is probably really simple: they are vectors
Since the two vectors are parallel, their components are in the same ratio, so

3:2 = s:1 = t:5.

Since 3:2 = s:1 (i.e. 3/2 = s/1), we have s = 3/2.

Since t:5 = 3:2 (t/5 = 3/2), we have t = 5*3/2 = 15/2.
 

leehuan

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Re: MATH1131 help thread



this is probably really simple: they are vectors
Haha liking the LaTeX (y)

(Yeah just remember that two parallel vectors are scalar multiples of each other)
 

turntaker

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Re: MATH1131 help thread

Haha liking the LaTeX (y)

(Yeah just remember that two parallel vectors are scalar multiples of each other)
OH. SCALAR PRODUCT!

that makes sense lmaoo
 

InteGrand

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Re: MATH1131 help thread

It's not really scalar "product" (the term "scalar product" commonly refers to the dot product). Better to say scalar "multiple".
 

leehuan

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Re: MATH1131 help thread

It's not really scalar "product" (the term "scalar product" commonly refers to the dot product). Better to say scalar "multiple".
I edited already lol. I realised.
 

turntaker

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Re: MATH1131 help thread

It's not really scalar "product" (the term "scalar product" commonly refers to the dot product). Better to say scalar "multiple".
TRUU

this makes sense too, thanks.
 

Flop21

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Re: MATH1131 help thread

How do I know what interval to use for this question (I get how to use it after that)?

x^3 + root(3)x - 6

use intermediate value theorem to prove that f has at least one real root
 

leehuan

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Re: MATH1131 help thread

How do I know what interval to use for this question (I get how to use it after that)?

x^3 + root(3)x - 6

use intermediate value theorem to prove that f has at least one real root
If you're just showing that it has a zero you can pick any arbitrary interval. We just care that you know to pick one that conveniently has one side negative and the other positive.

Oh and of course it's continuous on that interval as well.
 

Flop21

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Re: MATH1131 help thread

If you're just showing that it has a zero you can pick any arbitrary interval. We just care that you know to pick one that conveniently has one side negative and the other positive.

Oh and of course it's continuous on that interval as well.
Yes that's what I'm asking how do I do that?
 

leehuan

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Re: MATH1131 help thread

Yes that's what I'm asking how do I do that?
That's not even hard. Just put random numbers (for x) into your calculator and get something >0 and something <0 ?

E.g. prove your function has a root.
I could pick 0 and 10

Or I could pick -1000 and 1000
 

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