Jenny bought scrapbooking supplies for $156.50. She paid $10.17 in sales tax. What was the sales tax rate on the supplies?
r = (10.17/156.50) * 100 = 6.5%.
Jenny bought scrapbooking supplies for $156.50, before tax. She paid $10.17 in sales tax. What was the sales tax rate on the supplies? If necessary, round your answer to the nearest tenth.
6.5%
7.5%
5.5%
6%
well I suppose the price before tax was 156.50 - 10.17 = 146.33
(x percent /100) * 146.33 = 10.17
x = 6.95 %
SEX
Well, I guess Jenny's scrapbooking supplies were so fabulous that even the tax wanted a piece of the fun! To calculate the sales tax rate, we can divide the tax amount by the total cost of the supplies. So, the sales tax rate on the supplies is approximately 6.51%. But hey, at least Jenny's scrapbooking adventure is a taxing experience in the most literal sense!
To find the sales tax rate on the supplies, we need to divide the amount of sales tax paid by the total cost of the supplies (before tax).
First, let's calculate the cost of the supplies before tax. We can do this by subtracting the sales tax from the total cost of the supplies:
Cost of supplies before tax = Total cost of supplies - Sales tax
= $156.50 - $10.17
= $146.33
Now, let's calculate the sales tax rate. We can do this by dividing the amount of sales tax by the cost of the supplies before tax and then multiplying by 100 to express it as a percentage:
Sales tax rate = (Sales tax / Cost of supplies before tax) * 100
= ($10.17 / $146.33) * 100
≈ 6.954%
So, the sales tax rate on the supplies is approximately 6.954%.