To find the total amount she paid, we need to add the sales tax to the original total.
Sales tax amount = 6% of $176 = 0.06 * $176 = $10.56
Total amount she paid = $176 + $10.56 = $186.56
Therefore, she paid a total of $186.56.
christa went shopping for back-to-school clothes. before the tax was added on, her total was $176. if the sales tax is 6%, what was the total amount she paid?
7 answers
if x = 16, which equation is true? A. 4(24 - x) = 32 B. 2x + 20 = 50 C. 2(x + 5) = 41 D. 4x - 51 = 12
To determine which equation is true when x = 16, we can substitute x with 16 in each equation and see which one makes the equation true.
A. 4(24 - x) = 32
Substitute x = 16
4(24 - 16) = 32
4(8) = 32
32 = 32
B. 2x + 20 = 50
Substitute x = 16
2(16) + 20 = 50
32 + 20 = 50
52 = 50
C. 2(x + 5) = 41
Substitute x = 16
2(16 + 5) = 41
2(21) = 41
42 = 41
D. 4x - 51 = 12
Substitute x = 16
4(16) - 51 = 12
64 - 51 = 12
13 = 12
Therefore, the equation that is true when x = 16 is A. 4(24 - x) = 32.
A. 4(24 - x) = 32
Substitute x = 16
4(24 - 16) = 32
4(8) = 32
32 = 32
B. 2x + 20 = 50
Substitute x = 16
2(16) + 20 = 50
32 + 20 = 50
52 = 50
C. 2(x + 5) = 41
Substitute x = 16
2(16 + 5) = 41
2(21) = 41
42 = 41
D. 4x - 51 = 12
Substitute x = 16
4(16) - 51 = 12
64 - 51 = 12
13 = 12
Therefore, the equation that is true when x = 16 is A. 4(24 - x) = 32.
sara earned $7.25 per hour plus an additional $105 in tips waiting tables last week. she earned at least $329.75. if h represents the minimum number of hours that sara could have worked, which inequality represents all the possible values of h?
We can represent the total amount Sara earned as a function of the number of hours worked, h.
Total earnings = (hourly wage * hours worked) + tips
Total earnings = (7.25h) + 105
We are given that Sara earned at least $329.75, so we can write this as an inequality:
(7.25h) + 105 β₯ 329.75
Now we can solve this inequality for h:
7.25h β₯ 329.75 - 105
7.25h β₯ 224.75
Divide both sides of the inequality by 7.25 to solve for h:
h β₯ 224.75 / 7.25
h β₯ 31
Therefore, the inequality that represents all the possible values of h is h β₯ 31. This means that the minimum number of hours Sara could have worked is 31 hours.
Total earnings = (hourly wage * hours worked) + tips
Total earnings = (7.25h) + 105
We are given that Sara earned at least $329.75, so we can write this as an inequality:
(7.25h) + 105 β₯ 329.75
Now we can solve this inequality for h:
7.25h β₯ 329.75 - 105
7.25h β₯ 224.75
Divide both sides of the inequality by 7.25 to solve for h:
h β₯ 224.75 / 7.25
h β₯ 31
Therefore, the inequality that represents all the possible values of h is h β₯ 31. This means that the minimum number of hours Sara could have worked is 31 hours.
sara earned $7.25 per hour plus an additional $105 in tips waiting tables last week. she earned at least $329.75. if h represents the minimum number of hours that sara could have worked, which inequality represents all the possible values of h? A. 105h + 7.25 > 329.75 B. 105h + 7.25 < 329.75 C. 7.25 + 105 > 329.75 D. 7.25h + 105 < 329.75
To find the inequality that represents all the possible values of h, we need to set up the equation based on the given information.
Sara earned $7.25 per hour plus an additional $105 in tips. Let h represent the minimum number of hours.
Total earnings = (Hourly wage * Hours worked) + Tips
Since Sara earned at least $329.75, the inequality will be:
(7.25h) + 105 β₯ 329.75
Simplifying the inequality further:
7.25h + 105 β₯ 329.75
The inequality is represented by option A. 105h + 7.25 > 329.75.
Sara earned $7.25 per hour plus an additional $105 in tips. Let h represent the minimum number of hours.
Total earnings = (Hourly wage * Hours worked) + Tips
Since Sara earned at least $329.75, the inequality will be:
(7.25h) + 105 β₯ 329.75
Simplifying the inequality further:
7.25h + 105 β₯ 329.75
The inequality is represented by option A. 105h + 7.25 > 329.75.
35 answers