A young man was embarking on a one-week voyage. He was aware that they provided excellent meals during the journey
A young man was embarking on a one-week voyage. He was aware that they provided excellent meals during the journey. In fact, they served four meals daily. For breakfast, they typically served fish with potatoes. Lunch consisted of three courses. Dinner commenced at 6 o"clock and commenced with soup, followed by fish, salad, cheese, and dessert. There was also a light supper at 10 o"clock. Payment for each meal could be made in advance, or you could pay for all the meals beforehand, which was cheaper. The young man opted to pay for the entire week in advance and did so. When lunchtime arrived, he was not very satisfied.
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When lunchtime arrived on the first day, the young man had a delicious meal consisting of three courses. The next day, he enjoyed another satisfying breakfast with fish and potatoes, followed by a fulfilling lunch. As the days went by, he continued to indulge in the well-prepared meals provided on the ship.Now, let"s calculate the total number of meals the young man had during the week. During each day, he was served four meals - breakfast, lunch, dinner, and a light supper. Since the voyage lasted for one week, which typically consists of seven days, we can multiply the number of meals served daily (4 meals) by the number of days (7 days) to determine the total number of meals:
\(4 \text{ meals/day} \times 7 \text{ days} = 28 \text{ meals}\)
Hence, the young man had a total of 28 meals during the week-long voyage.
Next, let"s consider the payment options. The young man had the choice to either pay for each meal separately or pay for all the meals in advance. He wisely decided to pay for the entire week in advance, which would be cost-effective as it usually comes with a discounted price.
To determine the cost difference, let"s imagine the cost of a single meal is represented by the variable "x." If he had paid for each meal separately, the total cost would be \(28x\), as he had 28 meals in total. On the other hand, by paying for the entire week in advance, he made a single payment, which we can denote as "y."
Based on the information provided, paying for all the meals beforehand is cheaper. Therefore, we can say that \(y < 28x\).
Now, suppose we assign some numerical values to better understand the cost difference. Let"s assume that the cost for a single meal, "x," is 10 units of currency. Therefore, if he had paid for each meal separately, the total cost would be \(28 \times 10 = 280\) units of currency. However, by paying for the entire week in advance, the young man made a single payment of "y" units of currency, which is cheaper than 280 units.
Please note that the actual values of "x" and "y" are not provided in the problem statement, so we cannot provide an exact cost comparison. However, we can conclude that paying for all the meals in advance is the more economical option based on the given information.
Overall, the young man had 28 enjoyable meals during his one-week voyage and made the wise decision to pay for all the meals in advance to secure a more affordable price.