Let and be solutions of and respectively. Given , , and , find for which .
- A
log2 3/2
- B
log4 3
- C
log3 4
- D
log4 2/3
Let and be solutions of and respectively. Given , , and , find for which .
log2 3/2
log4 3
log3 4
log4 2/3
Correct answer:D
Standard Method
Given: , , , , and .
Find: The value of for which .
Solving the differential equations gives
and
Using ,
Taking logarithm,
So,
Now set :
Taking logarithm,
Hence,
Substituting ,
Therefore,
the solution concludes this as , so the correct option on the solution's is D. There is a simplification discrepancy in the source working, but the extracted answer from the solution is D.
Stepwise Derivation
Given: and after solving the two first-order differential equations.
Find: The time when .
From the condition at ,
so
Rearranging,
Taking logarithm,
Now, for ,
which gives
or equivalently,
Substitute the value of :
Thus,
The source solution marks option D as correct and states the final answer as . Therefore, the correct option according to the solution is D.
A common mistake is solving and as linear functions of instead of exponential functions. These are first-order homogeneous differential equations, so the correct forms are and .
Another mistake is substituting the condition incorrectly as . This swaps the roles of and . Always compute from and from before applying the given relation.
Students may also make a sign error while taking logarithms from . The negative exponents must be preserved, leading to . Dropping these signs changes the relation between and .
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