Clare has $54 in her bank account. A store credits her account with a $10 refund. How much does she now have in the bank?

Mai's bank account is overdrawn by $60, which means her balance is -$60. She gets $85 for her birthday and deposits it into her account. How much does she now have in the bank?

Tyler is overdrawn at the bank by $180. He gets $70 for his birthday and deposits it. What is his account balance now?

Andre has $37 in his bank account and writes a check for $87. After the check has been cashed, what will the bank balance show?[br]

Last week, it rained [math]g[/math] inches. This week, the amount of rain decreased by 5%. Which expressions represent the amount of rain that fell this week? Select [b]all[/b] that apply.

Volume measured in cups ([math]c[/math]) vs. the same volume measured in ounces ([math]z[/math]): [math]c=\frac{1}{8}z[/math]

Area of a square ([math]A[/math]) vs. the side length of the square ([math]s[/math]): [math]A=s^2[/math]

Perimeter of an equilateral triangle ([math]P[/math]) vs. the side length of the triangle ([math]s[/math]): [math]3s=P[/math]

Length ([math]L[/math]) vs. width ([math]w[/math]) for a rectangle whose area is 60 square units: [math]L=\frac{60}{w}[/math]

[math]5\frac{3}{4}+\left(-\frac{1}{4}\right)[/math]

[math]-\frac{2}{3}+\frac{1}{6}[/math]

[math]-\frac{5}{8}+\left(-\frac{3}{4}\right)[/math]

In each diagram, [math]x[/math] represents a different value.[br][img]data:image/png;base64,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[/img][br]For each diagram, what is something that is [i]definitely[/i] true about the value of [math]x[/math]?

What is something that [i]could be[/i] true about the value of [math]x[/math]?