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Find the area enclosed between the curve...

Find the area enclosed between the curves: `y = log_e (x + e) , x = log_e (1/y)` & the x-axis.

A

2 sq. units

B

1 sq. units

C

4 sq. units

D

None of these

Text Solution

Verified by Experts

The correct Answer is:
A
`y=log_(e)(x+e),x=log_(e)((1)/(y))or y=e^(-x).`
For `y=log_(e)(x+e),` Shift the graph of `y=log_(e)x,e` units to the left hand side.

`"Required area "=overset(0)underset(1-e)intlog_(e)(x+e)dx+overset(oo)underset(0)inte^(-x)dx`
`=|x log_(e)(x+e)|_(1-e)^(0)-overset(0)underset(1-e)int(x)/(x+e)dx-|e^(-x)|_(0)^(oo)`
`=overset(1-e)underset(0)int(1-(e)/(x+e))dx-e^(oo)+e^(0)`
`=|x-elog (x+e)|_(0)^(1-e)-0+1`
`=1-e+elog e+1 =2` sq. units.
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