When the tangent to the curve y=xlogx...

When the tangent to the curve `y=xlogx` is parallel to the chord joining the points (1, 0) and `(e ,\ e)` , the value of `x` is `e^(1//1-e)` (b) `e^((e-1)(2e-1))` (c) `e^((2e-1)/(e-1))` (d) `(e-1)/e`

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about to only mathematics The tangent to the curve y=e^x drawn at the point (c,e^c ) intersects the line joining the points (c−1,e^(c−1) ) and (c+1,e^(c+1) )

When the tangent to the curve `y=xlogx` is parallel to the chord joining the points (1, 0) and `(e ,\ e)` , the value of `x` is `e^(1//1-e)` (b) `e^((e-1)(2e-1))` (c) `e^((2e-1)/(e-1))` (d) `(e-1)/e`

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