With c as arbitrary constant the solution of the differential equation dy/dx=ky is
Question
With c as arbitrary constant the solution of the differential equation dy/dx=ky is
Solution
The solution to the differential equation dy/dx = ky is y = Ce^(kt), where C is an arbitrary constant.
Here are the steps to solve it:
- Separate the variables: dy/y = k dx.
- Integrate both sides: ∫dy/y = ∫k dx.
- Apply the integral of 1/x which is ln|x|: ln|y| = kx + C.
- Apply the exponential function to both sides to solve for y: y = e^(kx+C).
- Simplify the equation using the property of exponents a^(m+n) = a^m * a^n: y = e^(kx) * e^C.
- Since e^C is also a constant, we can replace it with another constant, say C': y = C' e^(kx).
- So the general solution is y = Ce^(kt), where C is an arbitrary constant.
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