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First Year Mathematics B (Integration, Series, Discrete Maths & Modelling) (2 Viewers)

RenegadeMx

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Re: MATH1231/1241/1251 SOS Thread

to prove its not a v.s in general u either show 0 isnt there (easiest) or that it doesnt satisfy addition/scalar multiplication

only need to show 1 of those conditions as well
 

leehuan

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Re: MATH1231/1241/1251 SOS Thread

Lol sweet.
_______________________

Even if there IS a typo in the notation, this question is actually confusing me to the maximum...



This was the answer I got to part (ii)

 
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leehuan

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Re: MATH1231/1241/1251 SOS Thread

to prove its not a v.s in general u either show 0 isnt there (easiest) or that it doesnt satisfy addition/scalar multiplication

only need to show 1 of those conditions as well
Yeah sweet, that reaffirms what I know
 

Flop21

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Re: MATH1231/1241/1251 SOS Thread

How do I know what values to pick for constructing the triangle? This is in my textbook too, but they still don't explain how to pick the triangle's values.

 

RenegadeMx

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Re: MATH1231/1241/1251 SOS Thread

How do I know what values to pick for constructing the triangle? This is in my textbook too, but they still don't explain how to pick the triangle's values.

its year 9/10 trig. tan = x/2 = opp/adj
 
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Flop21

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Re: MATH1231/1241/1251 SOS Thread

Pythagoras's theorem. Alternatively, recall the identity tan^2 (u) + 1= sec^2 (u).
I'm really confused still. How do you get tan = x/2. The x and the 2, where do they come from.
 

Flop21

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Re: MATH1231/1241/1251 SOS Thread

To find if something is a linear combination... do we do the following always?




What if we wants to see if a bunch of polynomials form spanning set for P2? Can we do the same?

Thanks.
 

InteGrand

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Re: MATH1231/1241/1251 SOS Thread

To find if something is a linear combination... do we do the following always?




What if we wants to see if a bunch of polynomials form spanning set for P2? Can we do the same?

Thanks.


We can also express a non-leading column's vector in the original matrix as a linear combination of the leading column vectors from the original matrix through back substitution etc. after row-reducing (work through an example to get the hang of this).
 

Flop21

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Re: MATH1231/1241/1251 SOS Thread

Why is: a set of 5 vectors in R5 must be a basis for R5, false?

Basically how can I tell how many linear independent vectors can be in Rn. Or how can you tell if they're linearly independent or not just from the number of vectors and Rn?
 

InteGrand

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Re: MATH1231/1241/1251 SOS Thread

Why is: a set of 5 vectors in R5 must be a basis for R5, false?

Basically how can I tell how many linear independent vectors can be in Rn. Or how can you tell if they're linearly independent or not just from the number of vectors and Rn?


 

leehuan

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Re: MATH1231/1241/1251 SOS Thread

I feel like my book is trolling me. Is there any convenience in using second order ODE methods to solve these over bringing in an integrating factor?

 

InteGrand

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Re: MATH1231/1241/1251 SOS Thread

I feel like my book is trolling me. Is there any convenience in using second order ODE methods to solve these over bringing in an integrating factor?

You can solve these like second-order ODE's with constant coefficients. Any order ODE with constant coefficients can be solved via characteristic equation etc.



Without any further info, I don't know what context your book asked these in, but maybe it's just getting you to see that ODE's with constant coefficients of other-than-second order can be solved similarly.

 
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leehuan

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Re: MATH1231/1241/1251 SOS Thread

You can solve these like second-order ODE's with constant coefficients. Any order ODE with constant coefficients can be solved via characteristic equation etc.



Without any further info, I don't know what context your book asked these in, but maybe it's just getting you to see that ODE's with constant coefficients of other-than-second order can be solved similarly.

Yeah I guess so. Makes sense
 

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