An object moves with speed along a line segment AB, BC, and CD respectively as shown in the figure. Where AB = BC and AD = 3AB, then the average speed of the object will be:
- A
- B
- C
- D
An object moves with speed along a line segment AB, BC, and CD respectively as shown in the figure. Where AB = BC and AD = 3AB, then the average speed of the object will be:
Correct answer:B
Standard Method
Given: , , and .
Find: The average speed of the object over the whole path.
Since and , we get
so
Therefore, the total distance travelled is
The total time taken is
Hence, the average speed is
Cancelling ,
This value matches option C. The solution labels the correct option as B, but the extracted working clearly gives the expression in option C. Therefore, the most defensible answer is C.
Detailed Derivation
Given: , , .
Find: Average speed.
Use
Now,
So,
Thus the three segments have equal length each.
Time on segment :
Time on segment :
Time on segment :
Total time:
Total distance:
Therefore,
Multiplying numerator and denominator by ,
Hence,
Therefore, the correct option from the listed choices is C.
Using the arithmetic mean is incorrect because the question involves equal distances, not equal times. For equal-distance motion, use total distance divided by total time.
Missing the relation leads to a wrong total distance. Since and , the remaining segment must also be .
Adding speeds directly instead of adding times is wrong. The object covers different segments at different speeds, so compute time for each segment as and then sum them.
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