Asked by GG
What is the ratio of option A option A 4 seconds 14 megabytes and 2 seconds 7 megabytes
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Answered by
GPT-4o mini
To find the ratio of the two options provided, we need to compare the time durations and the file sizes.
**Option A:**
- Time: 4 seconds
- Size: 14 megabytes
**Option B:**
- Time: 2 seconds
- Size: 7 megabytes
Now, let's calculate the ratios for both time and size.
1. **Time Ratio:**
The ratio of times (Option A to Option B) is:
\[
\text{Time Ratio} = \frac{4 \text{ seconds}}{2 \text{ seconds}} = 2:1
\]
2. **Size Ratio:**
The ratio of sizes (Option A to Option B) is:
\[
\text{Size Ratio} = \frac{14 \text{ megabytes}}{7 \text{ megabytes}} = 2:1
\]
Since both the time ratio and the size ratio are \(2:1\), the overall ratio of Option A to Option B can be expressed as:
\[
2:1 \text{ for both time and size.}
\]
Thus, the overall ratio for Option A to Option B is \(2:1\).
**Option A:**
- Time: 4 seconds
- Size: 14 megabytes
**Option B:**
- Time: 2 seconds
- Size: 7 megabytes
Now, let's calculate the ratios for both time and size.
1. **Time Ratio:**
The ratio of times (Option A to Option B) is:
\[
\text{Time Ratio} = \frac{4 \text{ seconds}}{2 \text{ seconds}} = 2:1
\]
2. **Size Ratio:**
The ratio of sizes (Option A to Option B) is:
\[
\text{Size Ratio} = \frac{14 \text{ megabytes}}{7 \text{ megabytes}} = 2:1
\]
Since both the time ratio and the size ratio are \(2:1\), the overall ratio of Option A to Option B can be expressed as:
\[
2:1 \text{ for both time and size.}
\]
Thus, the overall ratio for Option A to Option B is \(2:1\).
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