Variable

Toast · 2007-02-14 19:53:08

We have a problem where we have to prove that

is true no matter what the value of x.

Actually, to be precise, we were given the following information:

Think of a number...Add one...Double it...Take away 3...Add the number you first thought of...Add 7... Divide by 3... Take away the number you first thought of... You should be left with 2. Explain why this works.

So I try to solve for x:

This proves that the value of x does not matter since it will be eliminated anyway.

Some of my friends, however, think that I must leave the right side equaled to 2 for it to be correct:

Does it really matter?

Last edited by Toast (2007-02-14 19:53:47)

George,Y · 2007-02-14 19:58:07

Those both have a presumption that you need to determin x. And this assumption is not good.
Typically you need only evaluate the left blindly, without knowing it equating to 2, then naturally derive 2 as the result. Through this process you only assumed x any value.

Toast · 2007-02-14 20:08:19

Sorry I don't quite understand =.=

George,Y · 2007-02-14 22:20:12

Sorry I made a mistake. The 3 ways (yours, your friend's and mine) are all correct.

Toast · 2007-02-14 22:44:34

I've received several similar problems where the variable eliminates itself. Some of these problems contain 2 variables, x and y. If they are both eliminated that means either of them could take any value, right?

MathsIsFun · 2007-02-14 22:50:07

Isn't it neater just to show that x gets cancelled?

Isolate "x": (2x+x)/3 - x = 3x/3 - x = x-x

Toast · 2007-02-14 22:55:26

Hmm well I supposed so

Thanks George and mathsisfun

mathsyperson · 2007-02-15 02:10:01

MathsIsFun's method isn't enough, is it?
Surely all that would do is show that the expression is always some constant, no matter what x is. It doesn't show that that constant is 2.

George,Y · 2007-02-15 14:02:50

His method is enough, actually his method is what I proposed in Post 4. This method has the assumption that x is arbitary when dealing it algebraically, so when the result shows 2, it means whatever x is, the result is (always) 2.

George,Y · 2007-02-15 14:09:41

And the method of Toast and his friend is generally the solving equation approach. And every manupulation of the equation, every changing is called equivalent transformation, until 2=2. Equivalent literally means if one holds, the other too.

Then when x satisfies what 2=2 holds, the answer is x=any. So x=any => 2=2 is true => the original equation holds. That means regardless the value of x, the original equation is true. And that means always true.

Toast · 2007-02-15 22:21:17

Also, does

?

Last edited by Toast (2007-02-15 22:22:07)

George,Y · 2007-02-15 23:24:54

Logically yes. 2*3=2*3, 6/3=6/3

Math Is Fun Forum

#1 2007-02-14 19:53:08

Variable

#2 2007-02-14 19:58:07

Re: Variable

#3 2007-02-14 20:08:19

Re: Variable

#4 2007-02-14 22:20:12

Re: Variable

#5 2007-02-14 22:44:34

Re: Variable

#6 2007-02-14 22:50:07

Re: Variable

#7 2007-02-14 22:55:26

Re: Variable

#8 2007-02-15 02:10:01

Re: Variable

#9 2007-02-15 14:02:50

Re: Variable

#10 2007-02-15 14:09:41

Re: Variable

#11 2007-02-15 22:21:17

Re: Variable

#12 2007-02-15 23:24:54

Re: Variable

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