Two cars P and Q are moving on a road in the same direction. Acceleration of car P increases linearly with time whereas car Q moves with a constant acceleration. Both cars cross each other at time , for the first time. The maximum possible number of crossing(s) (including the crossing at ) is:
JEE Physics 2025 Question with Solution
Answer
Correct answer:3
Step-by-step solution
Standard Method
Given: Car P has acceleration increasing linearly with time, so . Car Q has constant acceleration, so . Both cars are at the same position at .
Find: The maximum possible number of crossings, including the one at .
Let the initial velocities at be and .
For car P:
Integrating,
Again integrating,
For car Q:
So,
and
The cars cross whenever their positions are equal:
Therefore,
Rearranging,
Factor out :
One root is , which is the given first crossing.
The remaining crossings are determined by the quadratic equation
A quadratic can have at most two real roots. Hence, besides , there can be at most two more crossings.
So the maximum possible total number of crossings is .
Therefore, the required numerical answer is .
Root Counting Interpretation
Given: The position equality condition decides the crossings.
Find: The maximum number of times the two cars can be at the same position.
Since acceleration of car P varies as , its position contains a term. Since car Q has constant acceleration, its position contains a term. Thus, the equation obtained by setting their positions equal is a cubic in .
From the working,
So the crossing condition is
This cubic already has one known root, , because the cars cross there.
After factoring out ,
The bracket is a quadratic expression, and a quadratic can contribute at most two real roots.
Hence the total number of real crossing times can be at most
including the crossing at .
Therefore, the maximum possible number of crossings is .
Common mistakes
Assuming that equal velocities imply crossing. This is wrong because crossing requires equal positions, not equal velocities. First write and , then set .
Forgetting the initial velocities and while integrating acceleration. This is wrong because the general velocity expressions are not just functions of acceleration terms. Include the constants of integration before finding position.
Stopping after finding the factor and concluding there is only one crossing. This is wrong because the remaining quadratic factor can still produce two more real times. Always analyze the quadratic factor completely.
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