Challenge for 2u peeps (1 Viewer)

fishrushed

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Can't seem to get the answer by itself. I keep getting an extra bit on top of what I have to show (k< -25)
Must be bad news for me :(
 

Sy123

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Can't seem to get the answer by itself. I keep getting an extra bit on top of what I have to show (k< -25)
Must be bad news for me :(
The only thing you need to actually show is that k > 1.

The upper bound ( k < 25/24) comes much more simply than you might think.
 

darlking

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Oh ok, well that was last year and don't expect me to remember my topic names last year.
 

Sy123

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How do you show k >1 when you can also show k < 25/24. I found the 25/24 one.
By using the quadratic formula, we can find that:





What do we get when alpha - beta?

We get an inequality in terms of k.

What is the solution to this inequality?
One of them is k > 1.
 

superSAIyan2

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Too get the other inequality use discriminant properties and your knowledge of real and unreal roots (i.e. what is the definite condition for there to be real roots)
 

Trebla

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By using the quadratic formula, we can find that:





What do we get when alpha - beta?

We get an inequality in terms of k.

What is the solution to this inequality?
One of them is k > 1.
Umm...doesn't that lead an inequality with an unknown in the denominator which is beyond the 2u course?

This is what I get without requiring an unknown in the denominator.

Suppose that and are the roots where . We are given that

Sum of roots:



Product of roots:



But



Since



then



Substituting the result we get



Note that since the denominator is always non-negative, the sign of the inequality is unchanged (whereas in your case you need to deal with cases where k is positive/negative etc).

Looking at the left inequality we immediately get the upper bound.



Looking at the right inequality.



Tehnically speaking, putting the inequalities together we should get



Missing a solution set haya! :p
 
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fishrushed

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The only thing you need to actually show is that k > 1.

The upper bound ( k < 25/24) comes much more simply than you might think.
yea, I got k< 25/24 and k>1, but I happened to also have gotten k<-25 along with the k>1 and I just stopped there
 

hayabusaboston

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Umm...doesn't that lead an inequality with an unknown in the denominator which is beyond the 2u course?

This is what I get without requiring an unknown in the denominator.

Suppose that and are the roots where . We are given that

Sum of roots:



Product of roots:



But



Since



then



Substituting the result we get



Note that since the denominator is always non-negative, the sign of the inequality is unchanged (whereas in your case you need to deal with cases where k is positive/negative etc).

Looking at the left inequality we immediately get the upper bound.



Looking at the right inequality.



Tehnically speaking, putting the inequalities together we should get



Missing a solution set haya! :p
Well thats certainly the most cheerie way anyone has addressed me in the past few days LOL
Indeed.
Well the intention was to make it neat, so I just left that extra one out in the question.
 

Amiiiiiin

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I found that k > 1 by finding K. but i cant get the relation between k 25/24
 

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