The Men's Warehouse has suites on sale for buy one full priced, get the second 40% discounted and the third 70% discounted. If a full priced suit costs $380, what should someone expect to pay for three suites?
Amy has been saving for her high school graduation trip for a long time. After two years of saving she was able to save $1800. She decides to go to the airport and was able to book a four day trip to Hawaii. The flight itself cost $650 which she had to pay at the aiport and all her left over money will be used as her spending money there. If she plans on spending the same amount of money on each of the four days (or she will try to at least), make a table showing her spending for the trip and than graph your results.
380 + (380 * 0.6) + (380 * 0.3) = ?
(1800 - 650) / 4 = ______ expenditure per day
To determine the cost of three suits at The Men's Warehouse, we need to consider the discounts for each suit.
The first suit is full-priced at $380.
The second suit is discounted by 40%. To find the discounted price, we multiply the original price by (100% - 40%) = 60%. So, the second suit costs 60% of $380, which is $380 * 0.60 = $228.
The third suit is discounted by 70%. Similarly, we multiply the original price by (100% - 70%) = 30%. So, the third suit costs 30% of $380, which is $380 * 0.30 = $114.
Adding up the prices of all three suits, we get $380 + $228 + $114 = $722.
Therefore, someone should expect to pay $722 for three suits.
Now, let's move on to Amy's trip expenses.
Since Amy has $1800 and the flight costs $650, she will have $1800 - $650 = $1150 left for her spending money.
To calculate her spending for each of the four days, we divide the remaining amount evenly: $1150 ÷ 4 = $287.50 per day.
Here's a table showing Amy's spending for the trip:
| Day | Spending |
|-----|---------|
| 1 | $287.50 |
| 2 | $287.50 |
| 3 | $287.50 |
| 4 | $287.50 |
Now, let's graph the results. Since Amy spends the same amount each day, the graph will be a straight line at $287.50.
On the x-axis, we represent the four days, and on the y-axis, we represent the spending amount. We plot four points at equal distances on the x-axis, each corresponding to $287.50 on the y-axis.
The graph would look like a horizontal line at $287.50 for all four days.