16

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course 158

1040am 10/16/12

014. `* 14*********************************************

Question: * 1.6.12 (was 1.6.6). Explain how you found the real solutions of the equation | 1 - 2 z | + 6 = 9.

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Your solution:

| 1-2z | +6=9

|1-2z|=3

1-2z=3

-2z=3-1

-2z=2

Z=-1

confidence rating #$&*: 3

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Given Solution:

* * Starting with

| 1-2z| +6 = 9 we add -6 to both sides to get

| 1 - 2z| = 3. We then use the fact that | a | = b means that a = b or a = -b:

1-2z=3 or 1-2z= -3 Solving both of these equations:

-2z = 2 or -2z = -4 we get

z= -1 or z = 2 We express our solution set as

{-1, 2} **

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Self-critique (if necessary):ok

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Self-critique Rating:3

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Question: * 1.6.30 (was 1.6.24). Explain how you found the real solutions of the equation | x^2 +3x - 2 | = 2

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Your solution:

|x^2+3x-2|=2

X^2+3x-2-2=0

X^2+3x-4=0

(x+4)(x-1)

X=-4 x=1

X^2+3x-2=2

X^2+3x=2-2

X^2+3x=0

X(x+3)=0

X=-3

X=0

confidence rating #$&*: 3

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Given Solution:

* * My note here might be incorrect.

If the equation is | x^2 +3x -2 | = 2 then we have

x^2 + 3x - 2 = 2 or x^2 + 3x - 2 = -2.

In the first case we get x^2 + 3x - 4 = 0, which factors into (x-1)(x+4) = 0 with solutions x = 1 and x = -4.

In the second case we have x^2 + 3x = 0, which factors into x(x+3) = 0, with solutions x = 0 and x = -3. **

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Self-critique (if necessary):ok

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Self-critique Rating:3

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Question: * 1.6.40 \ 36 (was 1.6.30). Explain how you found the real solutions of the inequality | x + 4 | + 3 < 5.

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Your solution:

|x+4|+3<5

|x+4|<5-3

|x+4|<2

X+4<2

X<2-4

X<-2

-2

-2-4<

-6

-6

confidence rating #$&*: 2

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Given Solution:

* * STUDENT SOLUTION: | x+4| +3 < 5

| x+4 | < 2

-2 < x+4 < 2

-6 < x < -2

STUDENT QUESTION

I was hoping to see more in the given solution as to why we move 2 to the left of the inequality. I think there is a formula for that, but I don’t remember what it is.

Could you explain why we move the 2?

INSTRUCTOR RESPONSE

The 2 doesn't get moved. To understand what's going on:

Think about the inequality

| A | < = 4.

This is clearly true if A = 4, 3, 2, 1 or 0.

It's also clearly true if A = -1, -2, -3 or -4.

It's not true if A = -5 or -6 or -7, etc..

So

| A | < = 4 means the same thing as

-4 <= A <= 4.

More generally

| A | < B says the same thing as

- B < A < B.

In your solution you said that

| x + 4 | + 3 < 5 add -3 to both sides give us

x + 4 < 2

This isn't so. The | | signs don't go away when you add -3 to both sides. You get

| x + 4 | < 2, which means the same thing as

-2 < x + 4 < 2 because of the rule we just say, that | A | < B means -B < A < B.

Correcting your solution:

| x + 4 | + 3 < 5 add -3 to both sides

| x + 4 | < 2 add -2 to the left of the inequality

-2 < x + 4 < 2 apply the rule for | A | < B with A = x + 4 and B = 2

-2-4 < x+4-4 < 2-4 simplify to get

-6 < x < -2

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Self-critique (if necessary):ok

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Self-critique Rating:3

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Question: * 1.6.52 \ 48 (was 1.6.42). Explain how you found the real solutions of the inequality | -x - 2 | >= 1.

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Your solution:

|-x-2|>=1

-x-2>1

-x-2<-1

-x-2>1

-x>1+2

-x>3

X<-3

-x-2<=-1

-x<=-1+2

-x<=1

x>=-1

confidence rating #$&*: 2

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Given Solution:

* * Correct solution:

| -x -2 | >= 1 Since | a | > b means a > b or a < -b (note the word 'or') we have

-x-2 >= 1 or -x -2 <= -1. These inequalities are easily solved to get

-x >= 3 or -x <= 1 or

x <= -3 or x >= -1.

So our solution is

{-infinity, -3} U {-1, infinity}. **

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Self-critique (if necessary):ok

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Self-critique Rating:3

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&#Very good responses. Let me know if you have questions. &#