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# Inequalities and Absolute Value Homework -- Homework: Inequalities

Module by: Kenny M. Felder. E-mail the author

Summary: This module provides practice problems related to inequalities.

## Exercise 1

2x + 7 4x + 4 2x + 7 4x + 4 size 12{2x+7 <= 4x+4} {}

• a. Solve for xx size 12{x} {}.
• b. Draw a number line, and show where the solution set to this problem is.
• c. Pick an xx size 12{x} {}-value which, according to your drawing, is inside the solution set. Plug it into the original inequality 2x+74x+42x+74x+4 size 12{2x+7 <= 4x+4} {}. Does the inequality hold true?
• d. Pick an xx size 12{x} {}-value which, according to your drawing, is outside the solution set. Plug it into the original inequality 2x+74x+42x+74x+4 size 12{2x+7 <= 4x+4} {}. Does the inequality hold true?

## Exercise 2

14 2x < 20 14 2x < 20 size 12{"14" - 2x<"20"} {}

• a. Solve for xx size 12{x} {}.
• b. Draw a number line, and show where the solution set to this problem is.
• c. Pick an xx size 12{x} {}-value which, according to your drawing, is inside the solution set. Plug it into the original inequality 142x<20142x<20 size 12{"14" - 2x<"20"} {}. Does the inequality hold true?
• d. Pick an xx size 12{x} {}-value which, according to your drawing, is outside the solution set. Plug it into the original inequality 142x<20142x<20 size 12{"14" - 2x<"20"} {}. Does the inequality hold true?

## Exercise 3

10 < 3x + 2 5 10 < 3x + 2 5 size 12{ - "10"<3x+2 <= 5} {}

• a. Solve for xx size 12{x} {}.
• b. Draw a number line, and show where the solution set to this problem is.
• c. Pick an xx size 12{x} {}-value which, according to your drawing, is inside the solution set. Plug it into the original inequality 10<3x+2510<3x+25 size 12{ - "10"<3x+2 <= 5} {}. Does the inequality hold true?
• d. Pick an xx size 12{x} {}-value which, according to your drawing, is outside the solution set. Plug it into the original inequality 10<3x+2510<3x+25 size 12{ - "10"<3x+2 <= 5} {}. Does the inequality hold true?

## Exercise 4

x<3x<3 size 12{x<3} {} and x<7x<7 size 12{x<7} {}. Draw a number line, and show where the solution set to this problem is.

## Exercise 5

x<3x<3 size 12{x<3} {} or x<7x<7 size 12{x<7} {}. Draw a number line, and show where the solution set to this problem is.

## Exercise 6

x 2y 4 x 2y 4 size 12{x - 2y >= 4} {}

• a. Solve for yy size 12{y} {}.
• b. Now—for the moment—let’s pretend that your equation said equals instead of “greater than” or “less than.” Then it would be the equation for a line. Find the slope and the y-intercept of that line, and graph it.
• Slope: _________
• y-intercept__________
• c. Now, pick any point (x,y)(x,y) size 12{ $$x,y$$ } {} that is above that line. Plug the xx size 12{x} {} and yy size 12{y} {} coordinates into your inequality from part (a). Does this point fit the inequality? (Show your work…)
• d. Now, pick any point (x,y)(x,y) size 12{ $$x,y$$ } {} that is below that line. Plug the xx size 12{x} {} and yy size 12{y} {} coordinates into your inequality from part (a). Does this point fit the inequality? (Show your work…)
• e. So, is the solution to the inequality the points below or above the line? Shade the appropriate region on your graph.

## Exercise 7

Using a similar technique, draw the graph of yx2yx2 size 12{y >= x rSup { size 8{2} } } {}. (If you don’t remember what the graph of yx2yx2 size 12{y >= x rSup { size 8{2} } } {} looks like, try plotting a few points!)

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