Solution :
The integration of \(e^x\) with respect to x is \(e^x\) + C.
Since \(d\over dx\) \(e^x\) = \(e^x\) dx
On integrating both sides, we get
\(\int\) \(e^x\) dx = \(e^x\)
Hence, the integration of \(e^x\) is \(e^x\) + C
The integration of \(e^x\) with respect to x is \(e^x\) + C.
Since \(d\over dx\) \(e^x\) = \(e^x\) dx
On integrating both sides, we get
\(\int\) \(e^x\) dx = \(e^x\)
Hence, the integration of \(e^x\) is \(e^x\) + C