Select [b]all[/b] the points that are on the graph of the equation [math]4y-6x=12[/math].
[size=150]Here is a graph of the equation [math]x+3y=6[/math].[/size][br][img]data:image/png;base64,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[/img][br]Select [b]all[/b] coordinate pairs that represent a solution to the equation.
They collect $275 after selling [math]x[/math] adult tickets and [math]y[/math] children’s tickets.[br][img]data:image/png;base64,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[/img][br]What does the point [math](30,7)[/math] mean in this situation?
Write an equation that represents the relationship between the dollar amount in her bank account and the number of weeks of saving.[br]
How many weeks does it take her to have $250 in her bank account? Mark this point on the graph.[br]
Han says that both cities had a similar pattern of precipitation in the month of August. Do you agree with Han? Explain your reasoning.
[size=150]Han and three of his friends decided to form a team and play a round. [br]Write an expression, an equation, or an inequality for each quantity described here. If you use a variable, specify what it represents. [/size][br][br]the allowable number of players on a team
the number of points Han's team earns in one round if every player earns a perfect score[br]
the number of points Han's team earns in one round if no players earn a perfect score[br]
the number of players in a game with six teams of different sizes: two teams have 4 players each and the rest have 3 players each[br]
the possible number of players in a game with eight teams[br]
[size=150]Write an equation to describe the relationship between the distance she runs in miles, [math]D[/math], and her running speed, in miles per hour, when she runs:[/size][br][br]at a constant speed of 4 miles per hour for the entire 30 minutes[br]
at a constant speed of 5 miles per hour the first 20 minutes, and then at 4 miles per hour the last 10 minutes[br]
at a constant speed of 6 miles per hour the first 15 minutes, and then at 5.5 miles per hour for the remaining 15 minutes[br]
at a constant speed of [math]a[/math] miles per hour the first 6 minutes, and then at 6.5 miles per hour for the remaining 24 minutes [br]
at a constant speed of 5.4 miles per hour for [math]m[/math] minutes, and then at [math]b[/math] miles per hour for [math]n[/math] minutes[br]
Write an equation to express the relationship between hands, [math]h[/math], and cubits, [math]c[/math].
Write an equation to express the relationship between hands, [math]h[/math], and paces, [math]p[/math].
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[/img][br][br]Select [b]all[/b] the equations that represent the relationship between the amount of money, [math]A[/math], and the number of months, [math]m[/math].