How to explain?

y

I try to teach my daughter to solve some equations with absolute value signs, such as

 

|x-1| + |2x+1| = 12

 

We can break it into x-1+2x+1=12 and -(x-1)-(2x+1)=12.

 

How can I explain to her that she cannot use

 

x-1-(2x+1)=12 or -(x-1)+2x+1=12 to get the answers?

 

 

www.ddhw.com

 

新用户

考虑边界条件： x-1 >=0    (x>=1) 2x+1 >= 0  (x>=-1/2)   所以，   if x < -1/2 then     |x-1| + |2x+1| 变成 -（x-1) - (2x + 1)   if -1/2 <= x < 1www.ddhw.com     |x-1| + |2x+1| 变成 -（x-1) + (2x + 1)   if x >= 1     |x-1| + |2x+1| 变成 （x-1) + (2x + 1)     原贴： 文章来源: y 于 2005-2-21 12:40:19 标题：How to explain?www.ddhw.com I try to teach my daughter to solve some equations with absolute value signs, such as   |x-1| + |2x+1| = 12   We can break it into x-1+2x+1=12 and -(x-1)-(2x+1)=12.   How can I explain to her that she cannot use   x-1-(2x+1)=12 or -(x-1)+2x+1=12 to get the answers?       www.ddhw.com

Sorry

No offense.  In general, we break the | | sign case by case...   For example,       Assume x-1>=0, 2x+1>=0, www.ddhw.com       then we can break it to x-1+2x+1=12  and get x=4, which satisfies x-1>=0 and 2x+1>=0.. So x=4 is one solution.         Assume x-1>=0 and 2x+1<0,       then we can break it into x-1-(2x+1)=12 and get x=-14, which does not satisfies the two conditions.   Basically, we break the equation that contains the | | sign into four groups of equations and inequality.... Two of four have solutions and the other two do not....     www.ddhw.com

y

Thank both of you for your help.  In general, how many solutions exist for this type of equation?www.ddhw.com   |ax+b|+|cx+d|+...+|mx+n|=constant.www.ddhw.com   (It is better to use a1x..., but I cannot write 1 as subscript)www.ddhw.com   If the answer is bigger than 2, can you show me an example?   www.ddhw.com

fzy

solve each ax+b = 0, and get a sequece of numbers x1www.ddhw.com

乱弹

  Or even infinitely many.

乱弹

  Or no solution

y

It is easy to find a case of no solution, such as |x|=-1 or |x-1|+|x|=0.www.ddhw.com Could show an example for infinitely many solution and 3 solutionswww.ddhw.com Thank you a lot. It seems so easy for you. But I just could not find them.www.ddhw.com

乱弹

Infinitely many:              |x+1|+|x-1|=2.   Obviously, [-1, 1] is the solution set.www.ddhw.com     Three solutions:          Well, I do not have one example. Actually I do not think we can have one. Cause      f(x)=|ax+b|+|cx+d|+...+|mx+n| is convex..... Therefore, if there are only a finite number of solutions, then there are 2, 1, or zero solutions.   Need to check again though.     www.ddhw.com

fzy

it can only be 0, 1, 2, or infinite. And congratulations! www.ddhw.com