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inequalities with x in the denominator (1 Viewer)
- Thread starter kr73114
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x jiim
zimbardooo.
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Because they are inequalities, you have to multiply both sides by the denominator squared [as multiplying by a negative means you have to change the signs around]. Eg:
1/x>4
x > 4x^2
x(4x-1)<0
0<x<1/4
4/(2x-1)<2/3
24x-12<8x^2-8x+2
4x^2-16x+7>0
etc.
Or you could graph it, depending on how yucky the inequality is =\
1/x>4
x > 4x^2
x(4x-1)<0
0<x<1/4
4/(2x-1)<2/3
24x-12<8x^2-8x+2
4x^2-16x+7>0
etc.
Or you could graph it, depending on how yucky the inequality is =\
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Aquawhite
Retiring
+1
I also prefer to approach these questions by using a squaring method in which we would multiply each side by x^2 (if x is the pro numeral) and then you will end up with a nice quadratic to solve most times...
Could also use the case method... although it appears that alot of people don't get it.
I remember in Year 11 the teacher of another class taught this method to his students. Only one of them (out of 30) got it in the test, whereas in our class everyone got the correct answer using the above method.
I remember in Year 11 the teacher of another class taught this method to his students. Only one of them (out of 30) got it in the test, whereas in our class everyone got the correct answer using the above method.
jet
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From its title I can guess how the method works. Though it does seem more difficult.
The squaring method is nice and simple, as long as students understand that they may be introducing solutions.
Aquawhite
Retiring
That only generally occurs when dealing with trigonometric functions though - to my knowledge.
jet
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Nope. If there is a less/greater than or equal to sign, then the boundaries mightn't be included even if the solutions say they are.
The reason being that quadratics have 2 solutions whilst linear equations only have one. When you square a linear equation, you introduce another solution, even if it might just be a double root.
That's why you always always always substitute the boundaries back into the original inequality. If a solution is introduced, it generally means that it will cause an undefined quantity in the equation. (This is analogous to what Aquawhite said, as you might find (with ASTC in trig) that a solution in the wrong quadrant is introduced. t-results are also bad because they skip the solution 180 degrees which is undefined because t = tan(x/2)).
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The case method is quite useful...but I doubt most teachers would understand it
Aquawhite
Retiring
Ah, I'd always subbed the answers back into the equation at the end (unless it was super easy and simple) to ensure I was right and didn't make a silly error for that very reason... Generally you'll find in HSC questions (because these appear in the first or second question) that they are simple and don't require much work.
But for some other types you need to use the case method.
Eg. |5x-2|/x > 0 or |x+1| + |2x-1| < 5
Aquawhite
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What's the case method? Either I know it by a different name or have never learnt it before.
jet
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Aquawhite
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Oh, okay I just didn't know it by that name
hahaWe learnt this method first before I heard about the squaring method (which I prefer) and I didn't know it had a name
I'm not sure what you mean by this?
|5x-2|/x > 0, automatically x > 0.
And for |x+1| + |2x-1| < 5, I just do ++, +-, -+, -- and then substitute back into the equation to see if it works.
Case method does not have to be used.
shady145
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Re: solving inequalities with x in the denominator
you have to know the rule that... if you time or divide both sides by a negative number the inequality sign will flip...
so you make 2 cases... then work through it...
eg first one
1/x>4
case 1, when x>0 ie a positive (this will not make the sign change)
1>4x
1/4>x
x<1/4
so x>0, and x<1/4
so the solution is in that region... 0<x<1/4
case 2, when x<0 ie a negative number (this will make the sign flip)
1<4x
1/4<x
... you can finish this + the rest
you have to know the rule that... if you time or divide both sides by a negative number the inequality sign will flip...
so you make 2 cases... then work through it...
eg first one
1/x>4
case 1, when x>0 ie a positive (this will not make the sign change)
1>4x
1/4>x
x<1/4
so x>0, and x<1/4
so the solution is in that region... 0<x<1/4
case 2, when x<0 ie a negative number (this will make the sign flip)
1<4x
1/4<x
... you can finish this + the rest
Last edited:
pman
Banned
Re: solving inequalities with x in the denominator
you just have to multiply both sides by the denominator squared, can''t remember why squared
you just have to multiply both sides by the denominator squared, can''t remember why squared
Last edited:
Aquawhite
Retiring
Re: solving inequalities with x in the denominator
For that method you have to either use a set of rules or multiply by the square of the denominator (realizing that this can in fact create more answers), and then substitute the answers back in or simply evaluate the answers in your head.