The abscissae of a point, tangent at whi...

The abscissae of a point, tangent at which to the curve `y = e^x sin x, x in [0, pi]` has maximum slope is

A

0

B

`pi/4`

C

`pi/2`

D

`pi`

Text Solution

Verified by Experts

The correct Answer is:

C

The slope m of the tangent at which to the curve `y=e^x` sin x ata any pint (x,y) `m=(dy)/(dx)=e^x(sin x +cos x )`
`rArr (dm)/(dx)=2e^(cos)x and (d^2y)/(dx^2)=2e^x(cos x -sin x)`
For maximum of minimum values of m,we must have
`(dm)/(dx)=0 rArr 2e^x cos x=0 rArr x=(pi)/(2)`
Clearly `((d^2m)/(dx))_(x=(pi/2))=-2e^(pi//2) lt 0`
Hence , m is maximum when `x=(pi/2)`

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