Finding length of vector with unknown variable

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cathal84
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Finding length of vector with unknown variable.
Purely for study purposes.
Find the smallest possible length of the vector →v .
Let vector V = (-2/3,b,16/7)
Equation for finding length of vector : Sqrt(a^2+b^2+c^2)Question would be quite straight forward had there been no unknown variable but since there is i am quite stuck.
when i work out the equation as per normal i get Sqrt(50/21+b^2)
Is it possible to work out the unknown variable in this question? I don't think it is but please correct me if I'm wrong
 
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cathal84 said:
Find the smallest possible length of the vector →v .
That is when the sqrt(a^2+b^2+c^2) is minimal.
 
cathal84 said:
i work out the equation as per normal i get Sqrt(50/21+b^2)
I'd check that again...
 
cathal84 said:
Is it possible to work out the unknown variable in this question? I don't think it is but please correct me if I'm wrong
Yes, you can thus you are wrong :)
 
Well, we had these questions for a level. But it doesent make sense to me.

Dont you mean if length of vector x is Y units, and vector X = (-2/3,b,16/7), thus find the value of b.

Otherwise how..:sorry: You must have been given a length for the vector, and then told to find the unknown component.? unless length of vector can also be zero.
 
Bipolar Demon said:
Well, we had these questions for a level. But it doesent make sense to me.
Dont you mean if length of vector x is Y units, and vector X = (-2/3,b,16/7), thus find the value of b.
Otherwise how..:sorry: You must have been given a length for the vector, and then told to find the unknown component.?
It does make sense, hwever its strange how it doesn't matter what a and c are :)
 
Replusz said:
It does make sense, hwever its strange how it doesn't matter what a and c are :)

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edit: got it. sorry, long time
 
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Only if a=b=c=0 then the length l=sqrt(0)=0, yes. But this wasnt the question
 
Replusz said:
Yes, you can thus you are wrong :)
thanks for your reply, since it is possible to find the unknown variable, could you possibly point me in the right direction on how to do so?
 
the length is sqrt(a^2+b^2+c^2)=sqrt(somehtin+b^2)
something is a number, like 2 or 5, or ... You miscalculated it though. It is a^2+c^2
Now a root is minimal if the thing inseide it is minmal. So b^2 + something is minimal. So b^2 is minimal
So now, what is b?
 
Replusz said:
the length is sqrt(a^2+b^2+c^2)=sqrt(somehtin+b^2)
something is a number, like 2 or 5, or ... You miscalculated it though. It is a^2+c^2
Now a root is minimal if the thing inseide it is minmal. So b^2 + something is minimal. So b^2 is minimal
So now, what is b?
still struggling with the question, i don't believe i have come across the concept of a minimal root and can't seem to find it in my textbook, is it possible you could explain further? thanks
 
cathal84 said:
still struggling with the question, i don't believe i have come across the concept of a minimal root and can't seem to find it in my textbook, is it possible you could explain further? thanks

You are over-thinking the problem. If ##b## is allowed to be any real number whatsoever, what is the smallest possible value of ##b^2##?
 
Ray Vickson said:
You are over-thinking the problem. If ##b## is allowed to be any real number whatsoever, what is the smallest possible value of ##b^2##?
Ah right, that makes a lot more senses haha thanks Ray and Replusz for your contribution.