Step 1: Understanding the Question:
This question asks for the time displayed on a clock when viewed through a vertical mirror, given that the actual time on the clock is 4:25.
Step 2: Key Formula or Approach:
For any time on a standard 12-hour clock, the sum of the actual time and its mirror image is always equal to 12:00.
- To make subtraction simpler when minutes are involved, we represent 12:00 as 11:60.
- The formula is:
\[ \text{Mirror Image Time} = 11:60 - \text{Actual Time} \]
Step 3: Detailed Explanation:
1. Note down the given actual time:
- Hours = 4
- Minutes = 25
2. Apply the mirror image formula by subtracting the actual time from 11:60:
\[ \text{Mirror Image Hours} = 11 - 4 \]
\[ \text{Mirror Image Minutes} = 60 - 25 \]
3. Perform the individual calculations:
- For the hour part: \[ 11 - 4 = 7 \]
- For the minute part: \[ 60 - 25 = 35 \]
4. Combine the hours and minutes to get the final mirror time:
- The resulting time is 7:35.
5. Let us understand the physics behind this:
- A vertical mirror reflects the left side of the clock to the right side and vice versa, while the top (12) and bottom (6) remain on their respective axes.
- At 4:25, the hour hand is between 4 and 5, which reflects to a position between 7 and 8.
- The minute hand is pointing at the 5-mark (25 minutes), which reflects symmetrically across the vertical axis to the 7-mark (35 minutes).
- This geometrically confirms that the reflected time is indeed 7:35.
Step 4: Final Answer:
The time seen in its mirror image will be 7:35. Hence, the correct option is (A).