[size=150]What is the slope of the graph of [math]5x-2y=20[/math]?[/size]

[size=150]What is the [math]y[/math]-intercept of each equation?[/size][br][br][math]y=6x+2[/math]

[math]10x+5y=30[/math]

[math]y-6=2(3x-4)[/math]

[size=150]Han wanted to find the intercepts of the graph of the equation [math]10x+4y=20[/math]. He decided to put the equation in slope-intercept form first. Here is his work:[br][center][math]10x+4y=20[/math][br][math]4y=20-10x[/math][br][math]y=5-10x[/math][/center]He concluded that the [math]x[/math]-intercept is [math](\frac{1}{2},0)[/math] and the y-intercept is [math](0,5)[/math].[/size][br][br]What error did Han make?[br]

What are the [math]x[/math]- and [math]y[/math]-intercepts of the line? Explain or show your reasoning.[br]

[size=150]Which graph represents the equation [math]12=3x+4y[/math]? Explain how you know.[/size][br][table][tr][td]A[br][img]data:image/png;base64,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[/img][/td][td]B[br][img]data:image/png;base64,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[/img][/td][td]C[br][img]data:image/png;base64,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[/img][/td][/tr][/table]

Find one possibility for the number of nickels and number of dimes that could be in Priya's pocket.[br]

Write an equation that describes the relationship between the number of dimes and the number of nickels in Priya's pocket.

Explain what the point [math](13,6)[/math] means in this situation.[br]

Is the point [math](13,6)[/math] a solution to the equation you wrote? Explain your reasoning.[br]

[img]data:image/png;base64,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[/img][br]Based on this information, are there any outliers in the data? Explain your reasoning.

[img]data:image/png;base64,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[/img][br]How much money does Priya have in the account after 10 weeks?[br]

How long did it take her to save $200?

How much money did Priya have in her savings account when she started to save regularly?

Write an equation to represent the dollar amount in her savings account and the number of weeks of saving. Be sure to specify what each variable represents.

[size=150]Noah has a coin jar containing [math]d[/math] dimes and [math]q[/math] quarters worth a total of $5.00.[/size][br][br]Select [b]all[/b] the equations that represent this situation.

He orders an extra-large pizza with [math]t[/math] toppings that costs a total of [math]d[/math] dollars.[br][br]Select all of the equations that represent the relationship between the number of toppings [math]t[/math] and total cost [math]d[/math] of the pizza with [math]t[/math] toppings.

[size=150]The graph shows the possible combinations of the number of adult tickets sold and the number of student tickets sold.[/size][br][img]data:image/png;base64,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[/img][br]What does the vertical intercept [math](0,200)[/math] tell us in this situation?