JEE Mains · Maths · STD 12 - 7.2 definite integral
Let function \(F\) be defined as \(f\left( x \right) = \int\limits_1^x {\frac{{{e^t}}}{t}dt\,,\,x > 0} \) then the value of the integral \(\int\limits_1^x {\frac{{{e^t}}}{{t + a}}dt\,} \) , where \(a > 0\) , is
- A \({e^a}\left[ {F\left( x \right) - F\left( {1 + a} \right)} \right]\)
- B \({e^{ - a}}\left[ {F\left( {x + a} \right) - F\left( a \right)} \right]\)
- C \({e^a}\left[ {F\left( {x + a} \right) - F\left( 1+a \right)} \right]\)
- D \({e^{ - a}}\left[ {F\left( {x + a} \right) - F\left( {1 + a} \right)} \right]\)
Answer & Solution
Correct Answer
(D) \({e^{ - a}}\left[ {F\left( {x + a} \right) - F\left( {1 + a} \right)} \right]\)
Step-by-step Solution
Detailed explanation
\(F(x)=\int_{1}^{x} \frac{e^{t}}{t} d t, x>0\) Let \(I=\int_{1}^{x} \frac{e^{t}}{t+a} d t\) Put \(t+a=z \Rightarrow t=z-a ; d t=d z\) for \(t=1, z=1+a\) for \(t=x, z=x+a\) \(\therefore \mathrm{I}=\int_{1+a}^{x+a} \frac{e^{z-a}}{z} d t\)…
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