Priya looks at the inequality [math]12-x>5[/math] and says “I subtract a number from 12 and want a result that is bigger than 5. That means that the solutions should be values of [math]x[/math] that are smaller than something.”[br][br]Do you agree with Priya? Explain your reasoning and include solutions to the inequality in your explanation.

[size=150]When a store had sold [math]\frac{2}{5}[/math] of the shirts that were on display, they brought out another 30 from the stockroom. The store likes to keep at least 150 shirts on display. The manager wrote the inequality [math]\frac{3}{5}x+30\ge150[/math] to describe the situation.[/size][br][br]Explain what [math]\frac{3}{5}[/math] means in the inequality.

Solve the inequality the manager wrote: [math]\frac{3}{5}x+30\ge150[/math] 

Explain what the solution means in the context of the situation.

You know [math]x[/math] is a number less than 4. Select [b]all [/b]the inequalities that [i]must[/i] be true.

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[/img][br][br]If you knew each circle weighed 6 grams, what would that tell you about the weight of each triangle? Explain your reasoning.

If you knew each triangle weighed 3 grams, what would that tell you about the weight of each circle? Explain your reasoning.

Han got $2 from Clare, but still has less than $20.

Mai spent $2 and has less than $20.

If Tyler had twice the amount of money he has, he would have less than $20.

If Priya had half the money she has, she would have less than $20.

The price tag on a shirt says $12.58. Sales tax is 7.5% of the price. How much will you pay for the shirt?

The store buys a helmet for $19.00 and sells it for $31.50. What percentage was the markup?

The shop pays workers $14.25 per hour plus 5.5% commission. If someone works 18 hours and sells $250 worth of merchandise, what is the total amount of their paycheck for this pay period? Explain your reasoning.