Question
Download Solution PDFThe rate of change of a variable is proportional to that variable. How will the variation of that variable with respect to time?
Answer (Detailed Solution Below)
Detailed Solution
Download Solution PDFConcept:
Let the variable is x which is varying with time t.
\(\frac{dx}{dt} \propto x\)
Calculation:
Given:
\(\frac{dx}{dt} \propto x\)
\(⇒ \frac{dx}{dt} =kx\)
\(⇒ \int\frac{dx}{x} =\int kdt\)
\(⇒ ln x =kt + p\)
Where p is a constant.
Now, take antilog,
⇒ x = e(kt +p)
⇒ x = e(kt) ep
Let c = ep
⇒ x = c e(kt)
So, the variation will be exponential.
Last updated on Jun 17, 2025
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