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Section 3: Personal Finance 2.) Jackson really wants a PS5, but he has to pay for it with his own money. He decides to put 65%...Asked by optinal
Section 3: Personal Finance
2.) Jackson really wants a PS5, but he has to pay for it with his own money. He decides to put 65% of what he makes each week into his savings account. If he does that for 6 weeks, how much money will he have saved?
(1 point)
Responses
$600.00
$600.00
$640.00
$640.00
$585.00
$585.00
$540.00
$540.00
2.) Jackson really wants a PS5, but he has to pay for it with his own money. He decides to put 65% of what he makes each week into his savings account. If he does that for 6 weeks, how much money will he have saved?
(1 point)
Responses
$600.00
$600.00
$640.00
$640.00
$585.00
$585.00
$540.00
$540.00
Answers
Answered by
optinal
150.00
Answered by
GPT-4o mini
To determine how much Jackson will have saved after 6 weeks, we need to know his weekly earnings. Since that information is not provided, we can't calculate the exact amount saved.
However, we can express the savings mathematically:
Let \( x \) be Jackson's weekly earnings.
He saves 65% of his earnings, which means each week he saves:
\[ 0.65x \]
Over 6 weeks, the total amount saved would be:
\[ 6 \times 0.65x = 3.9x \]
Now we can check the options given to see if any of them can fit this expression under the condition of different values for \( x \).
- If he saves $600 in total:
\[ 3.9x = 600 \Longrightarrow x \approx 153.85 \] (this scenario can work)
- If he saves $640 in total:
\[ 3.9x = 640 \Longrightarrow x \approx 164.10 \] (this scenario can work)
- If he saves $585 in total:
\[ 3.9x = 585 \Longrightarrow x \approx 150 \] (this scenario can work)
- If he saves $540 in total:
\[ 3.9x = 540 \Longrightarrow x \approx 138.46 \] (this scenario can work)
Since all values can technically work for different weekly earnings, we cannot determine a specific answer without knowing Jackson's weekly earnings. Thus, if the problem assumes a specific earning that leads to one of those values, it would be crucial to have that information.
If this question was designed for a specific answer, it could be possible that Jackson has a target figure that we assess instead. Assuming that he had $600 in total after 6 weeks, we'd conclude that he made approximately $153.85 weekly. Thus, without knowing Jackson's exact weekly earnings, an answer can't be definitively chosen.
However, we can express the savings mathematically:
Let \( x \) be Jackson's weekly earnings.
He saves 65% of his earnings, which means each week he saves:
\[ 0.65x \]
Over 6 weeks, the total amount saved would be:
\[ 6 \times 0.65x = 3.9x \]
Now we can check the options given to see if any of them can fit this expression under the condition of different values for \( x \).
- If he saves $600 in total:
\[ 3.9x = 600 \Longrightarrow x \approx 153.85 \] (this scenario can work)
- If he saves $640 in total:
\[ 3.9x = 640 \Longrightarrow x \approx 164.10 \] (this scenario can work)
- If he saves $585 in total:
\[ 3.9x = 585 \Longrightarrow x \approx 150 \] (this scenario can work)
- If he saves $540 in total:
\[ 3.9x = 540 \Longrightarrow x \approx 138.46 \] (this scenario can work)
Since all values can technically work for different weekly earnings, we cannot determine a specific answer without knowing Jackson's weekly earnings. Thus, if the problem assumes a specific earning that leads to one of those values, it would be crucial to have that information.
If this question was designed for a specific answer, it could be possible that Jackson has a target figure that we assess instead. Assuming that he had $600 in total after 6 weeks, we'd conclude that he made approximately $153.85 weekly. Thus, without knowing Jackson's exact weekly earnings, an answer can't be definitively chosen.
Answered by
GPT-4o mini
If Jackson's weekly earnings are $150.00, we can calculate his savings over 6 weeks based on his decision to save 65% of his income.
1. **Calculate his weekly savings**:
\[
\text{Weekly Savings} = 0.65 \times 150 = 97.50
\]
2. **Calculate total savings over 6 weeks**:
\[
\text{Total Savings} = 6 \times 97.50 = 585.00
\]
So, after 6 weeks, Jackson would have saved **$585.00**. Therefore, the correct answer is:
**$585.00**
1. **Calculate his weekly savings**:
\[
\text{Weekly Savings} = 0.65 \times 150 = 97.50
\]
2. **Calculate total savings over 6 weeks**:
\[
\text{Total Savings} = 6 \times 97.50 = 585.00
\]
So, after 6 weeks, Jackson would have saved **$585.00**. Therefore, the correct answer is:
**$585.00**