Sample
shahbaz ahmed
August 2024
Second derivative test for Local Extrema.
Suppose f ” is continuous on an open interval that contain
x=c.
1. If f ’(c)=0 and f ′′ (c) < 0, then f has a local maximum at
x=c.
2. If f ’(c)=0 and f ′′ (c) > 0, then f has a local minimum at
x=c.
............................................
ln x
Show that y = x has maximum at x=e
solution
ln x
y=
x
1
, Or
xy = ln x
Taking derivative with respect to x.
d d
(xy) = ln x
dx dx
dx dy 1
y +x =
dx dx x
dy 1
y+x =
dx x
dy 1
x = −y
dx x
dy 1 − xy
x =
dx x
dy 1 − xy
= (1)
dx x2
dy
Putting dx =0
dy 1 − xy
= =0
dx x2
2
shahbaz ahmed
August 2024
Second derivative test for Local Extrema.
Suppose f ” is continuous on an open interval that contain
x=c.
1. If f ’(c)=0 and f ′′ (c) < 0, then f has a local maximum at
x=c.
2. If f ’(c)=0 and f ′′ (c) > 0, then f has a local minimum at
x=c.
............................................
ln x
Show that y = x has maximum at x=e
solution
ln x
y=
x
1
, Or
xy = ln x
Taking derivative with respect to x.
d d
(xy) = ln x
dx dx
dx dy 1
y +x =
dx dx x
dy 1
y+x =
dx x
dy 1
x = −y
dx x
dy 1 − xy
x =
dx x
dy 1 − xy
= (1)
dx x2
dy
Putting dx =0
dy 1 − xy
= =0
dx x2
2
