COMEDK · Maths · 28. Indefinite Integration
\(\int\left(e^{x \log _e 6}\right) e^x d x=\phi(x)+c\) then \(\phi(x)=\)
- A \(\dfrac{6^x}{1+\log _e 6}\)
- B \(\dfrac{e^x}{\log 6 e}\)
- C \(\dfrac{(6 e)^x}{1+\log _e 6}\)
- D \(6^x e^x\)
Answer & Solution
Correct Answer
(C) \(\dfrac{(6 e)^x}{1+\log _e 6}\)
Step-by-step Solution
Detailed explanation
The integral is given by \(I = \int (e^{x \log_{e} 6}) e^x dx\). Using the property \(e^{x \log_{e} a} = (e^{\log_{e} a})^x = a^x\), we have \(e^{x \log_{e} 6} = 6^x\). Substituting this into the integral, \(I = \int 6^x e^x dx = \int (6e)^x dx\). Using the standard integral…
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