[img]data:image/png;base64,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[/img][br][br]_______ > _______
Jada says that she found three different ways to complete the first question correctly. Do you think this is possible? Explain your reasoning.[br]
List a possible value for each letter on the number line based on its location.
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[/img][br][br]Write an inequality for each of the the three height requirements. Use [math]h[/math] for the unknown height.
Han’s cousin is 55 inches tall. Han doesn’t think she is tall enough to ride the High Bounce, but Kiran believes that she is tall enough. Do you agree with Han or Kiran? Why?
Priya can ride the Climb-A-Thon, but she cannot ride the High Bounce or the Twirl-O-Coaster. Which, if any, of the following could be Priya’s height?
Priya can ride the Climb-A-Thon, but she cannot ride the High Bounce or the Twirl-O-Coaster. What could be Priya’s height? Why?
Jada is 56 inches tall. Which rides can she go on?
Kiran is 60 inches tall. Which rides can he go on?
The inequalities [math]h<75[/math] and [math]h>64[/math] represent the height restrictions, in inches, of another ride. Write three values that are [b]solutions [/b]to both of these inequalities.
Which part of the number line is shaded with all 3 colors?
Name one possible height a person could be in order to go on all three rides.
Below are two applets of cards—one set shows inequalities and the other shows numbers. The inequality cards face up where everyone can see them. The number cards are shuffled face down.[br][br]To play:[br][list][*]One person in your group is the detective. The other people will give clues.[br][/*][*]Pick one number card from the stack and show it to everyone except the detective.[br][/*][*]The people giving clues each choose an inequality that will help the detective identify the unknown number.[br][/*][*]The detective studies the inequalities and makes three guesses.[br][/*][list][*]If the detective does not guess the right number, each person chooses another inequality to help.[br][/*][*]When the detective does guess the right number, a new person becomes the detective.[/*][/list][/list]Repeat the game until everyone has had a turn being the detective.[br]