how to simplify n write in mathtype
- To: mathgroup at smc.vnet.net
- Subject: [mg78755] how to simplify n write in mathtype
- From: bhargavi <bhargavi.math at gmail.com>
- Date: Sun, 8 Jul 2007 06:18:18 -0400 (EDT)
hi,
i have very huge expression nearly 7papers,i could't do full
simplify.i tried simplify command.then to no use.i want to converrt
that expression to math type.pla any one can suggest me idea.n i can't
make up the brackets where does it start n end.
thanking you
bhargavi.
my expression is:
\!\(=CE=BB/\((=CF=83\_1 - \((\(-420\)\
Da\ \((\((240\ Da\^\(7/
2\)\ \((\(-1\) + \[ExponentialE]\^\(\(=CE=B3\ \
\@=CF=B5\)\/\@Da\))\)\^3\ \((1 + \[ExponentialE]\^\(\(=CE=B3\ \@=CF=B5\)\/\=
@Da\))\)\ =CF=B5
\ =CE=B7 + \
\((\(-1\) + =CE=B3)\)\^5\ =CE=B3\ \((\(-2\)\ \[ExponentialE]\^\(\(=CE=B3\ \=
@=CF=B5\)\/\@Da
\)\ \((\
\(-1\) + =CE=B3)\) + \[ExponentialE]\^\(\(2\ =CE=B3\ \@=CF=B5\)\/\@Da\)\ =
=CE=B3\ \((\(-1\)
+
=CE=B2\ \@=CF=B5)\) - =CE=B3\ \((1 + =CE=B2\ =
\@=CF=B5)\))\)\ \((\
(-1\) + \
\[ExponentialE]\^\(\(2\
=CE=B3\ \@=CF=B5\)\/\@Da\)\ \((\(-1\) + =CE=
=B2\ \@=CF=B5)\)
- =CE=B2\ \
\@=CF=B5)\)\ =CF=B5\^\(3/2\)\ =CE=B7 - 96\ Da\^3\ \((\(-1\) + \[Exponential=
E]\^\(\(=CE=B3\
\
\@=CF=B5\)\/\@Da\))\)\^2\ \@=CF=B5\ \((\((3 + 4\ \[ExponentialE]\^\(\(=CE=
=B3\ \@=CF=B5\)\/
\@Da\) \
+ 3\ \[ExponentialE]\^\(\(2\ =CE=B3\ \@=CF=B5\)\/\@Da\))\)\ \((\(-1\) + =CE=
=B3)\)\ =CE=B7
-
5\ \((\(-1\) + \[ExponentialE]\^\
(\(2\ =CE=B3\ \
\@=CF=B5\)\/\@Da\))\)\ =CE=B2\ \((\(-1\) +
=CE=B3)\)\ \@=CF=B5\ =CE=B7 + =CF=B5\ \((\(=
-1\) + =CE=B3 + =CE=B3\ =CE=B7
+ \
\[ExponentialE]\^\(\(2\ =CE=B3\ \@=CF=B5\)\/\@Da\)\ \((\(-1\) +
=CE=B3 + =CE=B3\ =CE=B7)\) + \[Expo=
nentialE]\^
\(\(=CE=B3\ \
\@=CF=B5\)\/\@Da\)\ \((2 + =CE=B3\ \((\(-2\) + 3\ =CE=B7)\))\))\))\) +
2\ Da\^\(3/2\)\ \((\(-1\) + \[ExponentialE]\^
\(\(=CE=B3\ \
\@=CF=B5\)\/\@Da\))\)\ \((\(-1\) + =CE=B3)\)\ =CF=B5\ \((14 - 18\ =CE=B3 -
6\ =CE=B3\^2 + 10\ =CE=B3\^3 + 28\
=CE=B2\ \@=CF=B5 - 12\ =CE=B2\ =CE=B3\ \@=
=CF=B5 - 60\ =CE=B2\ =CE=B3
\^2\ \@=CF=B5 + \
44\ =CE=B2\ =CE=B3\^3\ \@=CF=B5 + 2\ =CF=B5 - 20\ =CE=B3\ =CF=B5 + 48\ =CE=
=B2\^2\ =CE=B3\ =CF=B5 + 10\ =CE=B3\^2\ =CF=B5 -
96\ =CE=B2\^2\ =CE=B3\^2\ =CF=B5 + 8\ =CE=
=B3\^3\ =CF=B5 + 48\ =CE=B2
\^2\
=CE=B3\^3\ =CF=B5 - 24\ =CE=B2\ =CE=B3\^2\ =
=CF=B5\^\(3/2\) +
24\ =CE=B2\ =CE=B3\^3\ =CF=B5\^\(3/2\) + 7\=
=CE=B7 -
51\ =CE=B3\ =CE=B7 + 87\ =CE=B3\^2\ =CE=B7 =
- 43\
=CE=B3\^3\ =CE=B7 - 30\ =CE=B2\ =CE=B3\ \@=
=CF=B5\ =CE=B7 + 66\ =CE=B2\
=CE=B3\^2\ \@=CF=B5\ =CE=B7 - 36\ =CE=B2\ =
=CE=B3\^3\ \@=CF=B5\ =CE=B7 -
4\ =CE=B3\ =CF=B5\ \
=CE=B7 + 14\ =CE=B3\^2\ =CF=B5\ =CE=B7 - 14\
=CE=B3\^3\ =CF=B5\ =CE=B7 - 4\ =CE=B2\ =
=CE=B3\^3\ =CF=B5\^\(3/2\)\
=CE=B7 + \
\[ExponentialE]\^\(\(2\ =CE=B3\ \@=CF=B5\)\/\@Da\)\ \((\(-14\) + 84\ =CE=B2=
\ \@=CF=B5 - 2\
=CF=B5 +
11\ =CE=B7 + =CE=B3\^2\ \((\(-90\) + 96\ =
=CE=B2\^2\ =CF=B5
+ 6\ =CE=B2\
\ \@=CF=B5\ \((34 + 4\ =CF=B5 - 11\ =CE=B7)\) + 171\ =CE=B7 - 2\ =CF=B5\ \(=
(29 + =CE=B7)\))\) + =CE=B3\ \
((
66 - 48\ =CE=B2\^2\ =CF=B5 - 99\ =CE=B7 + 4=
\ =CF=B5\ \((5
+
=CE=B7)\) + 6\ =CE=B2\ \@=CF=B5\ \((\(-38\)=
+ 5\ =CE=B7)\))
\) +
=CE=B3\^3\ \((38 - 48\ =CE=B2\^2\ =CF=B5 + =
=CF=B5\ \((40 -
6\ \
=CE=B7)\) - 83\ =CE=B7 + 4\
=CE=B2\ \@=CF=B5\ \((\(-15\) + =CF=B5\ \((\=
(-6\) + =CE=B7)
\) + 9\ \
=CE=B7)\))\))\) - \[ExponentialE]\^\(\(=CE=B3\ \@=CF=B5\)\/\@Da\)\ \((14 + =
84\ =CE=B2\ \@=CF=B5
+ 2\ =CF=B5 \
- 11\ =CE=B7 + =CE=B3\^2\ \((90 - 96\ =CE=B2\^2\ =CF=B5 + 6\
=CE=B2\ \@=CF=B5\ \((34 + 4\
=CF=B5 - 11\
=CE=B7)\) - 171\ =CE=B7 + 2\ =CF=B5=
\ \((29 +
=CE=B7)\))\) \
+ =CE=B3\ \((\(-66\) + 48\ =CE=B2\^2\ =CF=B5 + 99\
=CE=B7 - 4\ =CF=B5\ \((5 + =CE=B7)\=
) + 6\ =CE=B2\
\@=CF=B5\ \
\((\(-38\) + 5\ =CE=B7)\))\) + =CE=B3\^3\ \((\(-38\) + 48\ =CE=B2\^2\ =CF=
=B5 + 83\
=CE=B7 + =CF=B5\ \((\(-40\) + 6\ =
=CE=B7)\) +
4\
=CE=B2\ \@=CF=B5\ \((\(-15\) + =CF=
=B5\ \((\
(-6\) +
=CE=B7)\) + 9\ =CE=B7)\))\))\) + \
\[ExponentialE]\^\(\(3\ =CE=B3\ \@=CF=B5\)\/\@Da\)\ \((14 - 28\ =CE=B2\ \@=
=CF=B5 + 2\ =CF=B5 +
7\ =CE=B7 + =CE=B3\ \((\(-18\) + 48=
\ =CE=B2
\^2\ =CF=B5 - \
51\ =CE=B7 - 4\ =CF=B5\ \((5 + =CE=B7)\) + 6\ =CE=B2\ \@=CF=B5\ \((2 + 5\ =
=CE=B7)\))\) + =CE=B3\^2\ \((\
(-6\) -
96\ =CE=B2\^2\ =CF=B5 +
6\ =CE=B2\ \@=CF=B5\ \((10 + 4\ =CF=B5 - 11=
\ =CE=B7)\) +
87\ =CE=B7 + \
2\ =CF=B5\ \((5 + 7\ =CE=B7)\))\) + =CE=B3\^3\ \((10 + 48\
=CE=B2\^2\ =CF=B5 +
=CF=B5\ \((8 - 14\ =CE=B7)\) - 43\ =
=CE=B7 + 4\ =CE=B2
\ \@=CF=B5\ \
\((\(-11\) + =CF=B5\ \((\(-6\) +
=CE=B7)\) + 9\ =CE=B7)\))\))\))\) +=
2\ Da
\ \
\((\(-1\) + =CE=B3)\)\^2\ \@=CF=B5\ \((\((\(-1\) + \[ExponentialE]\^\(\(=CE=
=B3\ \
\@=CF=B5\)\/\@Da\))\)\^2\ \((1 + \[ExponentialE]\^\(\(2\ =CE=B3\ \@=CF=B5\)=
\/\@Da\))\)
\ \
\((\(-1\) + =CE=B3)\)\^3\
=CE=B7 - \((\(-1\) + \
\[ExponentialE]\^\(\(=CE=B3\ \@=CF=B5\)\/\@Da\))\)\^3\ \((1 + \[Exponential=
E]\^\
(\(=CE=B3\ \
\@=CF=B5\)\/\@Da\))\)\
=CE=B2\ \((\(-1\) + =CE=B3)\)\^3\ \@=
=CF=B5\ =CE=B7 +
\
\((\(-1\) + \[ExponentialE]\^\(\(2\ =CE=B3\ \@=CF=B5\)\/\@Da\))\)\^2\ =CE=
=B3\ =CF=B5\^2\ \
((1 + 2\
\ =CE=B3\ \((\(-1\) + 6\ =CE=B2\^2 - =CE=B7)\) + =CE=B3\^2\ \((1 + 2\ =CE=
=B2\^2\ \((\(-6\) + =CE=B7)
\) + 2\ \
=CE=B7)\))\) - \((\(-1\) + \[ExponentialE]\^\(\(2\
=CE=B3\ \@=CF=B5\)\/\@Da\))\)\ =CE=B2\
=CF=B5\^\(3/2\)\ \((\(-2\) + 20\ =CE=
=B3 -
10\ \
=CE=B3\^2 - 8\ =CE=B3\^3 + 5\ =CE=B3\ =CE=B7 - 16\ =CE=B3\^2\ =CE=B7 + 15\ =
=CE=B3\^3\
=CE=B7 - 2\ \[ExponentialE]\^\(\(=CE=B3=
\ \
\@=CF=B5\)\/\@Da\)\ \((\(-1\) + =CE=B3)\)\^2\ \((\(-2\) + =CE=B3\ \((16 + 5=
\ =CE=B7)\))\)
+ \
\[ExponentialE]\^\(\(2\ =CE=B3\ \@=CF=B5\)\/\@Da\)\ \((\(-2\) + 5\ =CE=B3\ =
\((
4 + =CE=B7)\) - 2\ =CE=B3\^2\ \((5 +
8\ =CE=B7)\) + =CE=B3\^3\ \((\(-8\) +=
15\
\
=CE=B7)\))\))\) + =CF=B5\ \((3 + 5\ =CE=B3 - 7\ =CE=B3\^2 - =CE=B3\^3 - 2\ =
=CE=B7 + 11\ =CE=B3\ =CE=B7 - 22\ =CE=B3
\^2\ =CE=B7 \
+ 15\ =CE=B3\^3\ =CE=B7 + 2\ \[ExponentialE]\^\(\(=CE=B3\ \@=CF=B5\)\/\@Da\=
)\ \((\(-1\) +
=CE=B3)\)\^2\
\ \((\(-8\) + =CE=B3\ \((\(-6\) + 5\ =CE=B7)\))\) + 2\ \[ExponentialE]\^\(\=
(3\ =CE=B3
\ \@=CF=B5\)\
\/\@Da\)\ \((\(-1\) + =CE=B3)\)\^2\ \((\(-8\) +
=CE=B3\ \((\(-6\) + 5\
=CE=B7)\))\) + 2\ \[ExponentialE]\^\
(\(2\ =CE=B3\ \
\@=CF=B5\)\/\@Da\)\ \((13 + =CE=B3\^2\ \((23 - 6\ =CE=B7)\) + 2\ =CE=B7 - =
=CE=B3\ \((25 + 3\ =CE=B7)
\) + \
=CE=B3\^3\ \((\(-11\) + 9\ =CE=B7)\))\) + \[ExponentialE]\^\(\(4\
=CE=B3\ \@=CF=B5\)\/\@Da\)\ \((3 - 2\=
=CE=B7 + =CE=B3
\ \((5 \
+ 11\ =CE=B7)\) + =CE=B3\^3\ \((\(-1\) + 15\ =CE=B7)\) - =CE=B3\^2\ \((
7 + 22\ =CE=B7)\))\))\))\) + 48\
Da\^\(5/2\)\ \((\(-1\) + \
\[ExponentialE]\^\(\(=CE=B3\ \@=CF=B5\)\/\@Da\))\)\ \((\(-1\) + =CE=B3)\)\ =
\((2\ \((\
(-1\) + \
\[ExponentialE]\^\(\(=CE=B3\ \@=CF=B5\)\/\@Da\))\)\^2\ \((1 + \[Exponential=
E]\^\
(\(=CE=B3\ \
\@=CF=B5\)\/\@Da\))\)\ =CE=B3\ =CF=B5\^2 + \((1 + 4\ \[ExponentialE]\^\(\(=
=CE=B3\ \@=CF=B5\)\/
\@Da\) + \
4\ \[ExponentialE]\^\(\(2\ =CE=B3\ \@=CF=B5\)\/\@Da\) + \[ExponentialE]\^\(=
\(3\ =CE=B3
\ \
\@=CF=B5\)\/\@Da\))\)\ \((\(-1\) + =CE=B3)\)\ =CE=B7 - 2\ \((\(-3\) - \[Exp=
onentialE]
\^\(\(=CE=B3\
\ \@=CF=B5\)\/\@Da\) + \[ExponentialE]\^\(\(2\ =CE=B3\ \@=CF=B5\)\/\@Da\) +=
3\ \
\[ExponentialE]\^\(\(3\ =CE=B3\ \@=CF=B5\)\/\@Da\))\)\ =CE=B2\ \((\(-1\) + =
=CE=B3)\)\ \@=CF=B5\
=CE=B7 - 4\ \
\((\(-1\) + \[ExponentialE]\^\(\(=CE=B3\ \@=CF=B5\)\/\@Da\))\)\ =CE=B2\ =CF=
=B5\^\(3/2\)\ \
\((\(-1\) + =CE=B3 + =CE=B3\ =CE=B7 + \[ExponentialE]\^\(\(2\ =CE=B3\ \@=CF=
=B5\)\/\@Da\)\ \((\
(-1\) +
=CE=B3 + =CE=B3\ =CE=B7)\) + \[Expo=
nentialE]\^
\(\(=CE=B3\ \
\@=CF=B5\)\/\@Da\)\ \((2 + =CE=B3\ \((\(-2\) + 3\ =CE=B7)\))\))\) + \((
1 + \[ExponentialE]\^\(\(=CE=B3\ \
\@=CF=B5\)\/\@Da\))\)\ =CF=B5\ \((\(-2\) + 2\ =CE=B3 +
2\ =CE=B7 - 5\ =CE=B2\^2\ =CE=B7 + 5\=
=CE=B2\^2\ =CE=B3\
=CE=B7 + \
\[ExponentialE]\^\(\(2\ =CE=B3\ \@=CF=B5\)\/\@Da\)\ \((\(-2\) + \((2 - 5\ =
=CE=B2\^2)\)
\ =CE=B7 + \
=CE=B3\ \((2 + 5\ =CE=B2\^2\ =CE=B7)\))\) - 2\ \[ExponentialE]\^\(\(=CE=B3\=
\@=CF=B5\)\/\@Da\)\
\
\((\(-2\) + \((2 -
5\ =CE=B2\^2)\)\ =CE=B7 + =CE=B3\ \=
((
2 + 5\ \((\(-1\) + =CE=B2\^2)\)\ \
=CE=B7)\))\))\))\) + \@Da\ \((\(-1\) + \[ExponentialE]\^\(\(=CE=B3\ \@=CF=
=B5\)\/\@Da
\))\)\ \
\((\(-1\) + =CE=B3)\)\^4\ =CF=B5\ \((\(-\((
1 + \[ExponentialE]\^\(\(=CE=B3\ \@=CF=B5=
\)\/
\@Da\) + \
\[ExponentialE]\^\(\(2\ =CE=B3\ \@=CF=B5\)\/\@Da\) + \[ExponentialE]\^\(\(3=
\ =CE=B3\
\@=CF=B5\)\/\
\@Da\))\)\)\ \((1 - 4\ =CE=B3 + 3\
=CE=B3\^2)\)\
=CE=B7 + \((\(-1\) + \[ExponentialE]\^
\(\(=CE=B3\ \
\@=CF=B5\)\/\@Da\))\)\ =CE=B2\ \((\(-1\) + =CE=B3)\)\ \((\(-1\) +
5\ =CE=B3 + \[ExponentialE]\^\(\(2\
=CE=B3\ \@=CF=B5\
\)\/\@Da\)\ \((\(-1\) + 5\ =CE=B3)\) + \[ExponentialE]\^\(\(=CE=B3\ \@=CF=
=B5\)\/\@Da\)
\ \
\((\(-2\) + 6\ =CE=B3)\))\)\ \@=CF=B5\ =CE=B7 + \((\(-1\) + \[ExponentialE]=
\^\(\(=CE=B3\ \
\@=CF=B5\)\/\@Da\))\)\ \((1 + \[ExponentialE]\^\(\(=CE=B3\ \@=CF=B5\)\/\@Da=
\))\)\^2\ =CE=B2
\ =CE=B3\ =CF=B5\
\^\(3/2\)\ \((\(-2\) + =CE=B3\ \((2 + 5\ =CE=B7)\))\) - \((1 + \[Exponentia=
lE]\^\
(\(=CE=B3\ \
\@=CF=B5\)\/\@Da\))\)\ =CF=B5\ \((\(-1\) + =CE=B3\^2 - 2\ =CE=B2\^2\ =CE=B3\
=CE=B7 + 5\ =CE=B3\^2\ =CE=B7 + 2\ =CE=
=B2\^2\
=CE=B3\^2\ =CE=B7 - 2\ \[ExponentialE=
]\^\(\
(=CE=B3\ \
\@=CF=B5\)\/\@Da\)\ \((\(-1\) + =CE=B3)\)\ \((1 + =CE=B3\ \((\(-1\) + 2\ \(=
(\(-2\) + =CE=B2
\^2)\)\
\ =CE=B7)\))\) + \[ExponentialE]\^\(\(2\ =CE=B3\ \@=CF=B5\)\/\@Da\)\ \((\(-=
1\) - 2\ =CE=B2
\^2\ =CE=B3\ \
=CE=B7 + =CE=B3\^2\ \((1 + \((5 + 2\ =CE=B2\^2)\)\ =CE=B7)\))\))\))\) + 4\ =
Da\^2\ \@=CF=B5\ \
((6 - 18\
=CE=B3 + 18\ =CE=B3\^2 -
6\ =CE=B3\^3 + 24\ =CE=B2\ \@=CF=B5 - 72\ =CE=B2\=
=CE=B3\ \@=CF=B5 +
72\ =CE=B2\ =CE=B3\^2\ \@=CF=B5 - 24\ =CE=B2\
=CE=B3\^3\ \@=CF=B5 - 14\ =CF=B5 + 24\ =CE=
=B2\^2\ =CF=B5 + 6\ =CE=B3
\ =CF=B5 - \
72\ =CE=B2\^2\ =CE=B3\ =CF=B5 + 30\ =CE=B3\^2\ =CF=B5 + 72\ =CE=B2\^2\ =CE=
=B3\^2\ =CF=B5 -
22\ =CE=B3\^3\ =CF=B5 - 24\ =CE=B2\^2\ =CE=
=B3\^3\ =CF=B5 - 48\ =CE=B2
\ =CE=B3\
=CF=B5\^\(3/2\) + 96\ =CE=B2\ =CE=B3\^2\ =
=CF=B5\^\(3/
2\) - 48\ =CE=B2\ =CE=B3\^3\ =CF=B5\^\(3/2\=
) + 6\ =CE=B3
\^2\ =CF=B5\^2 \
- 6\ =CE=B3\^3\ =CF=B5\^2 - 27\ =CE=B7 + 81\ =CE=B3\ =CE=B7 - 81\ =CE=B3\^2=
\ =CE=B7 + 27\ =CE=B3\^3\ =CE=B7 - 24\ =CE=B2
\ \@=CF=B5\
=CE=B7 + 48\ =CE=B2\ =CE=B3\ \@=CF=
=B5\ =CE=B7 -
24\ =CE=B2\ =CE=B3\^2\ \@=CF=B5\ =
=CE=B7 + 15\ =CE=B3\ =CF=B5
\ =CE=B7 -
24\ =CE=B2\^2\ =CE=B3\ =CF=B5\ =CE=
=B7 -
33\ =CE=B3\^2\ =CF=B5\ =CE=B7 + 48\=
=CE=B2\^2\
=CE=B3\^2\ =CF=B5\ =CE=B7 + 18\ =CE=
=B3\^3\ =CF=B5\ =CE=B7 -
24\
=CE=B2\^2\ =CE=B3\^3\ =CF=B5\ =CE=B7 +
=CE=B3\^3\
=CF=B5\^2\ =CE=B7 + 4\ \[Exponentia=
lE]\^\
(\(=CE=B3\ \
\@=CF=B5\)\/\@Da\)\ \((\(-1\) + =CE=B3)\)\^2\ \((\(-2\)\ \((\(-7\) +
=CE=B3)\)\ =CF=B5 - 6\ =CE=B2\^2\ =CF=B5\ \=
((4 + =CE=B3\ \((\
(-4\) + \
=CE=B7)\))\) + 6\ =CE=B2\ \@=CF=B5\ \((=CE=B3\ \((2 + 4\
=CF=B5 - 5\ =CE=B7)\) + 2\ \((\(-1\) + =CE=
=B7)\))\) +
3\ \
\((2 - 5\ =CE=B3)\)\ =CE=B7)\) - 4\ \[ExponentialE]\^\(\(3\ =CE=B3\ \@=CF=
=B5\)\/\@Da\)\ \
((\(-1\) \
+ =CE=B3)\)\^2\ \((2\ \((\(-7\) + =CE=B3)\)\ =CF=B5 + 6\ =CE=B2\^2\ =CF=B5\=
\((4 + =CE=B3\ \((\(-4\)
+ \
=CE=B7)\))\) + 6\ =CE=B2\ \@=CF=B5\ \((=CE=B3\ \((2 + 4\ =CF=B5 - 5\ =CE=B7=
)\) +
2\ \((\(-1\) + =CE=B7)\))\) +
3\ \((\(-2\) + 5\ =CE=B3)\)\ =CE=B7=
)\) +
\
\[ExponentialE]\^\(\(4\ =CE=B3\ \@=CF=B5\)\/\@Da\)\ \((6 - 14\ =CF=B5 + 24\
=CE=B2\^2\ =CF=B5 + 24\ =CE=B2\ \@=CF=B5\ \=
((\(-1\) +
=CE=B7)\) - 27\ =CE=B7 + 3\ =CE=B3\^2\ \((6 + 2\ =CF=B5\^2 + =CF=B5\ \((10 =
- 11\
=CE=B7)\) - 8\ =CE=B2\ \@=CF=B5\ \((3 +=
4\
=CF=B5 - =CE=B7)\) - 27\ =CE=B7 + 8\ =
=CE=B2\^2\
=CF=B5\ \((3 + 2\ =CE=B7)\))\) - 3\ =
=CE=B3\ \((
6 - 8\ =CE=B2\ \@=CF=B5\ \((3 + 2\ =CF=B5 -=
2\ =CE=B7)\) -
27\
=CE=B7 + 8\ =CE=B2\^2\ =CF=B5\ \((3 +
=CE=B7)\) -
=CF=B5\ \((2 + 5\ =CE=B7)\))\) + =
=CE=B3\^3\ \
\((\(-6\) + 24\ =CE=B2\ \@=CF=B5\ \((1 + 2\ =CF=B5)\) + =CF=B5\^2\ \((\(-6\=
) + =CE=B7)\) +
27\ =CE=B7 - 24\ =CE=B2\^2\ =CF=B5\=
\((1 + =CE=B7)
\) + 2\
=CF=B5\ \((\(-11\) +
9\ =CE=B7)\))\))\) - 2\ \
\[ExponentialE]\^\(\(2\ =CE=B3\ \@=CF=B5\)\/\@Da\)\ \((
6 + \((42 - 72\
=CE=B2\^2)\)\ =CF=B5 - 3\ =CE=B7 - =
3\ =CE=B3\ \((6
- 11\
=CE=B7 + =CF=B5\ \((38 - 5\ =CE=B7 +
8\ =CE=B2\^2\ \((\(-9\) + 2\ =CE=B7=
)\))
\))\) +
=CE=B3\^3\ \((\(-6\) + =CF=B5\^2\ \=
((\
(-6\) + \
=CE=B7)\) + 27\ =CE=B7 - 6\ =CF=B5\ \((5 - 3\ =CE=B7 + 4\ =CE=B2\^2\ \((\(-=
3\) + 2\
=CE=B7)\))\))\) + 3\ =CE=B3\^2\ \((6 =
+ 2\ =CF=B5
\^2 -
19\ =CE=B7 + =CF=B5\ \((34 - 11\ =
=CE=B7 +
8\ =CE=B2\^2\ \((\(-9\) + 4\
=CE=B7)\))\))\))\))\))\)\
=CE=BB - 2\ \@=CF=B5\ \((96\
Da\^3\ \((\(-1\) + \
\[ExponentialE]\^\(\(=CE=B3\ \@=CF=B5\)\/\@Da\))\)\^4\ =CF=B5 - \((\(-1\) +
=CE=B3)\)\^5\ \((\(-1\) -
2\ \[ExponentialE]\^\(\(=CE=B3\ \@=CF=B5\)\=
/\@Da
\)\ \((\
\(-1\) + =CE=B3)\) + \[ExponentialE]\^\(\(2\ =CE=B3\ \@=CF=B5\)\/\@Da\)\ \(=
(\(-1\) + =CE=B3
\ \
\((\(-1\) + 2\ =CE=B2\ \@=CF=B5)\))\) - =CE=B3\ \((1 + 2\ =CE=B2\ \@=CF=B5)=
\))\)\ \((\(-1\) + \
\[ExponentialE]\^\(\(2\ =CE=B3\ \@=CF=B5\)\/\@Da\)\ \((\(-1\) +
=CE=B2\ \@=CF=B5)\) - =CE=B2\ \@=CF=
=B5)\)\
=CF=B5 - 96\ Da\^\(5/2\)\ \((\(-1\)
+ \
\[ExponentialE]\^\(\(=CE=B3\ \@=CF=B5\)\/\@Da\))\)\^3\ \@=CF=B5\ \((\(-1\) =
- 2\ =CE=B2\
\@=CF=B5 +
=CE=B3\ \((
1 + 2\ =CE=B2\ \@=CF=B5 + =CF=B5)\) + \[Exp=
onentialE]
\^\(\(=CE=B3\
\ \@=CF=B5\)\/\@Da\)\ \((\(-1\) + 2\ =CE=B2\ \@=CF=B5 +
=CE=B3\ \((1 - 2\ =CE=B2\ \@=CF=B5 +
=CF=B5)\))\))\) + 4\ Da\ \((\(-1\) +
=CE=B3)\)\^2\
\ =CF=B5\ \((9\ =CE=B3 -
3\ =CE=B3\^2 + 2\ \[ExponentialE]\^\(\(=CE=B3\ \@=
=CF=B5\)\/
\@Da\)\ \
\((\(-1\) + =CE=B3)\)\ \((5 + 2\ =CE=B3\ \((2 + 7\ =CE=B2\ \@=CF=B5)\) - 5\=
=CE=B2\ \@=CF=B5)\) - 2\
\
\[ExponentialE]\^\(\(3\ =CE=B3\ \@=CF=B5\)\/\@Da\)\ \((\(-1\) +
=CE=B3)\)\ \((\(-5\) - 4\ =CE=B3 -
5\ =CE=B2\ \@=CF=B5 + 14\
=CE=B2\ =CE=B3\ \@=CF=B5)\) - 5\ =CE=B2=
\ \@=CF=B5 + 19\ =CE=B2\
=CE=B3\ \@=CF=B5 -
2\ =CE=B2\ =CE=B3\^2\ \@=CF=B5 + 2\ =CE=B3\=
=CF=B5 - 2\ =CE=B3\^2\ =CF=B5
+ 6\ =CE=B2\
\^2\ =CE=B3\^2\ =CF=B5 + \[ExponentialE]\^\(\(4\
=CE=B3\ \@=CF=B5\)\/\@Da\)\ \((
5\ =CE=B2\ \@=CF=B5 + =CE=B3\ \((9 - =
19\
=CE=B2\ \@=CF=B5 +
2\ =CF=B5)\) + =CE=B3\^2\ \((\(-3\)=
+
2\
=CE=B2\ \@=CF=B5 - 2\ =CF=B5 + 6\ =
=CE=B2\^2\
=CF=B5)\))\) - 2\ \[ExponentialE]\^\(\(2\ =CE=B3\=
\@=CF=B5\)
\/\@Da\
\)\ \((\(-10\) + =CE=B3\ \((11 + 2\ =CF=B5)\) +
=CE=B3\^2\ \((\(-7\) + \((\(-2\) + 6\
=CE=B2\^2)\)\ =CF=B5)\))\))\) + 24\
Da\^2\ \((\(-1\) + \
\[ExponentialE]\^\(\(=CE=B3\ \@=CF=B5\)\/\@Da\))\)\^2\ \((1 - 2\ =CE=B3 + =
=CE=B3\^2 + 4\ =CE=B2
\ \@=CF=B5 -
8\ =CE=B2\ =CE=B3\ \@=CF=B5 +
4\ =CE=B2\ =CE=B3\^2\ \@=CF=B5 - 3\ =CF=B5 + 4\ =
=CE=B2\^2\ =CF=B5 - 8\ =CE=B2
\^2\ =CE=B3\ =CF=B5 \
+ 3\ =CE=B3\^2\ =CF=B5 + 4\ =CE=B2\^2\ =CE=B3\^2\ =CF=B5 - 8\ =CE=B2\ =CE=
=B3\ =CF=B5\^\(3/2\) + 8\ =CE=B2\ =CE=B3\^2\ \
=CF=B5\^\(3/2\) + =CE=B3\^2\ =CF=B5\^2 + 2\ \[ExponentialE]\^\(\(=CE=B3\ \@=
=CF=B5\)\/\@Da\)\ \
((1 + \
\((3 - 4\ =CE=B2\^2)\)\ =CF=B5 + =CE=B3\ \((\(-2\) + 8\ \((\(-1\) + =CE=B2\=
^2)\)\ =CF=B5)\) + =CE=B3
\^2\ \
\((1 + \((5 - 4\
=CE=B2\^2)\)\ =CF=B5 + =CF=B5\^2)\))\) + \
[ExponentialE]\^\
\(\(2\ =CE=B3\ \@=CF=B5\)\/\@Da\)\ \((1 - 4\ =CE=B2\ \@=CF=B5 - 3\ =CF=B5 +=
4\ =CE=B2\^2\ =CF=B5 + =CE=B3\ \((\
(-2\) \
- 8\ =CE=B2\^2\ =CF=B5 + 8\ =CE=B2\ \@=CF=B5\ \((1 + =CF=B5)\))\) + =CE=B3\=
^2\ \((1 + 3\ =CF=B5 + 4\ =CE=B2
\^2\ =CF=B5 + =CF=B5\
\^2 - 4\ =CE=B2\ \@=CF=B5\ \((1 + 2\ =CF=B5)\))\))\))\) +
4\ Da\^\(3/2\)\ \((\(-1\) + \
[ExponentialE]\^\
\(\(=CE=B3\ \@=CF=B5\)\/\@Da\))\)\ \((\(-1\) + =CE=B3)\)\ \@=CF=B5\ \((9 - =
6\
=CE=B3 - 3\ =CE=B3\^2 + 18\ =CE=B2\=
\@=CF=B5 -
18\
=CE=B2\ =CE=B3\^2\ \@=CF=B5 + 4\ =
=CF=B5 - 17\ =CE=B3\ =CF=B5
+ 24\
=CE=B2\^2\ =CE=B3\ =CF=B5 +
=CE=B3\^2\ =CF=B5 - 24\ =CE=B2\^2\ =
=CE=B3\^2\ =CF=B5 -
12\
=CE=B2\ =CE=B3\^2\
=CF=B5\^\(3/2\) + \[ExponentialE]\^\
(\(3\ \
=CE=B3\ \@=CF=B5\)\/\@Da\)\ \((9 - 18\ =CE=B2\ \@=CF=B5 + 4\
=CF=B5 + =CE=B3\ \((\(-6\) + \((\(-17\)=
+
24\ =CE=B2\^2)\
\)\ =CF=B5)\) + =CE=B3\^2\ \((\(-3\) + =CF=B5 - 24\ =CE=B2\^2\ =CF=B5 + 6\ =
=CE=B2\ \@=CF=B5\ \((3 + 2\
=CF=B5)\))\))\) - \[ExponentialE]\^\
(\(=CE=B3\ \
\@=CF=B5\)\/\@Da\)\ \((9 + 54\ =CE=B2\ \@=CF=B5 + 4\ =CF=B5 + =CE=B3\ \((\(=
-30\) - 96\ =CE=B2\ \@=CF=B5 -
17\
=CF=B5 + 24\ =CE=B2\^2\ =CF=B5)\) +=
=CE=B3\^2\ \
((21 +
25\ =CF=B5 - 24\ =CE=B2\^2\ =CF=B5 =
+ 6\
=CE=B2\ \@=CF=B5\ \((7 + 2\ =CF=B5)\))\=
))\) + \
\[ExponentialE]\^\(\(2\ =CE=B3\ \@=CF=B5\)\/\@Da\)\ \((\(-9\) + 54\
=CE=B2\ \@=CF=B5 -
4\ =CF=B5 + =CE=B3\ \((30 - 96\ =CE=
=B2\ \@=CF=B5 +
17\ =CF=B5 - \
24\ =CE=B2\^2\ =CF=B5)\) + =CE=B3\^2\ \((\(-21\) - 25\ =CF=B5 + 24\ =CE=B2\=
^2\ =CF=B5 + 6\ =CE=B2\ \@=CF=B5\ \
((7 +
2\ =CF=B5)\))\))\))\) - 2\ \@Da\ \
((\(-1\) \
+ \[ExponentialE]\^\(\(=CE=B3\ \@=CF=B5\)\/\@Da\))\)\ \((\(-1\) + =CE=B3)\)=
\^4\ \@=CF=B5\ \
((1 - \
=CE=B3 + 3\ =CE=B2\ \@=CF=B5 - 3\ =CE=B2\ =CE=B3\ \@=CF=B5 - 2\ =CF=B5 + 2\=
=CE=B2\^2\ =CF=B5 - 3\
=CE=B3\ =CF=B5 - 2\ =CE=B2\^2\ =CE=B3\ =CF=
=B5 - 5\ =CE=B2\ =CE=B3\ =CF=B5\^
\(3/2\) - \
\[ExponentialE]\^\(\(=CE=B3\ \@=CF=B5\)\/\@Da\)\ \((\(-1\) + =CE=B2\ \@=CF=
=B5 - 2\ =CF=B5 +
2\ =CE=B2\^2\ =CF=B5 + =CE=B3\ \((1 +
7\ =CF=B5 - 2\ =CE=B2\^2\
=CF=B5 + =CE=B2\ \@=CF=B5\ \((\(-1\) + 5\ =CF=
=B5)\))\))\) +
\
\[ExponentialE]\^\(\(2\ =CE=B3\ \@=CF=B5\)\/\@Da\)\ \((1 + =CE=B2\ \@=CF=B5=
+ 2\ =CF=B5 - 2\
=CE=B2\^2\ =CF=B5 + =CE=B3\ \((\(-1\) - 7\ =
=CF=B5 + 2\ =CE=B2\^2\
=CF=B5 + =CE=B2\ \
\@=CF=B5\ \((\(-1\) + 5\ =CF=B5)\))\))\) + \[ExponentialE]\^\(\(3\
=CE=B3\ \@=CF=B5\)\/\@Da\)\ \((1 - 3\ =
=CE=B2\ \@=CF=B5
- 2\ =CF=B5 \
+ 2\ =CE=B2\^2\ =CF=B5 + =CE=B3\ \((\(-1\) - 3\ =CF=B5 - 2\ =CE=B2\^2\
=CF=B5 + =CE=B2\ \@=CF=B5\ \((3 + 5\ =
=CF=B5)\))\))\))
\))\)\ =CF=83\
\_1)\) + \((\(-1\) + =CE=B3)\)\^2\ =CF=B5\ \((\((1 - =CE=B3)\)\ \((6720\
Da\^3\ \((\(-1\) + \
\[ExponentialE]\^\(\(=CE=B3\ \@=CF=B5\)\/\@Da\))\)\^4\ \@=CF=B5 - 17\ \((\(=
-1\) +
=CE=B3)\)\^6\ \((
1 + \[ExponentialE]\^\(\(2\ =CE=B3\ \
\@=CF=B5\)\/\@Da\)\ \((1 - =CE=B2\ \@=CF=B5)\) + =CE=B2\ \@=CF=B5)\)\^2\ \@=
=CF=B5 - 153\ \@Da\ \((\
(-1\) + \
\[ExponentialE]\^\(\(2\ =CE=B3\ \@=CF=B5\)\/\@Da\))\)\ \((\(-1\) + =CE=B3)\=
)\^5\ \((\
(-1\) + \
\[ExponentialE]\^\(\(2\ =CE=B3\ \@=CF=B5\)\/\@Da\)\ \((\(-1\) + =CE=B2\ \@=
=CF=B5)\) - =CE=B2\
\@=CF=B5)\)\ \
=CF=B5 - 840\ Da\^\(5/2\)\ \((\(-1\) + \[ExponentialE]\^\(\(=CE=B3\ \@=CF=
=B5\)\/\@Da
\))\)\^3\
\ \((\(-4\) - 8\ =CE=B2\ \@=CF=B5 - 5\ =CF=B5 + =CE=B3\ \((4 + 8\ =CE=B2\ \=
@=CF=B5 + 9\ =CF=B5)\) + \
\[ExponentialE]\^\(\(=CE=B3\ \@=CF=B5\)\/\@Da\)\ \((\(-4\) + 8\
=CE=B2\ \@=CF=B5 - 5\ =CF=B5 + =CE=B3\ \(=
(4 -
8\ =CE=B2\ \@=CF=B5 + 9\ =CF=B5)\))\))\) + =
84\ Da\^2\
\
\((\(-1\) + \[ExponentialE]\^\(\(=CE=B3\ \@=CF=B5\)\/\@Da\))\)\^2\ \((\(-1\=
) + =CE=B3)
\)\ \
\@=CF=B5\ \((\(-3\) - 60\ =CE=B2\ \@=CF=B5 + =CE=B3\ \((43 + 100\ =CE=B2\ \=
@=CF=B5 + 25\ =CF=B5)\) +
2\ \[ExponentialE]\^\(\(=CE=B3\ \
\@=CF=B5\)\/\@Da\)\ \((\(-57\) + =CE=B3\ \((57 +
25\ =CF=B5)\))\) + \[ExponentialE]\^
\(\(2\ \
=CE=B3\ \@=CF=B5\)\/\@Da\)\ \((\(-3\) + 60\ =CE=B2\ \@=CF=B5 + =CE=B3\ \((4=
3 - 100\ =CE=B2\ \@=CF=B5 +
25\ =CF=B5)\))\
\))\) + 4\ Da\ \((\(-1\) + =CE=B3)\)\^3\ \@=CF=B5\ \((112 - 7\
=CE=B3 - 224\ \[ExponentialE]\^\
(\(3\
=CE=B3\ \@=CF=B5\)\/\@Da\)\ \((\(-1\)=
+ =CE=B3)
\)\ \((\
\(-1\) + =CE=B2\ \@=CF=B5)\) + 224\ \[ExponentialE]\^\(\(=CE=B3\ \@=CF=B5\)=
\/\@Da\)\ \((\
(-1\) + \
=CE=B3)\)\ \((1 + =CE=B2\ \@=CF=B5)\) + 112\ =CE=B2\ \@=CF=B5 + 98\ =CE=B2\=
=CE=B3\ \@=CF=B5 + 97\ =CF=B5 - 97\
=CE=B3\ =CF=B5 + 105\ =CE=B2\^2\ =CE=B3\ =
=CF=B5 + \
\[ExponentialE]\^\(\(4\ =CE=B3\ \@=CF=B5\)\/\@Da\)\ \((112 - 112\ =CE=B2\ \=
@=CF=B5 + 97\ =CF=B5
+ =CE=B3\ \
\((\(-7\) - 98\ =CE=B2\ \@=CF=B5 - 97\ =CF=B5 + 105\ =CE=B2\^2\
=CF=B5)\))\) - 2\ \[ExponentialE]\^\
(\(2\ \
=CE=B3\ \@=CF=B5\)\/\@Da\)\ \((\(-112\) + 97\ =CF=B5 + =CE=B3\ \((7 + \((\(=
-97\) + 105\ =CE=B2
\^2)\)\
=CF=B5)\))\))\) + 28\ Da\^\(3/
2\)\ \((\(-1\) + \[ExponentialE]\^\
(\(=CE=B3\ \
\@=CF=B5\)\/\@Da\))\)\ \((\(-1\) + =CE=B3)\)\^2\ \((15 - 15\ =CE=B3 + 45\ =
=CE=B2\ \@=CF=B5 -
45\ =CE=B2\ =CE=B3\ \
\@=CF=B5 - 82\ =CF=B5 + 30\ =CE=B2\^2\ =CF=B5 - 8\ =CE=B3\ =CF=B5 - 30\ =CE=
=B2\^2\ =CE=B3\ =CF=B5 - 90\ =CE=B2\ =CE=B3\ =CF=B5\^
\(3/
2\) + \[ExponentialE]\^\(\(=CE=B3\ \@=CF=B5\)\/\@=
Da\)\
\((15 \
- 15\ =CE=B2\ \@=CF=B5 + 82\ =CF=B5 - 30\ =CE=B2\^2\ =CF=B5 + =CE=B3\ \((\(=
-15\) + 15\ =CE=B2\ \((1 - 6\
=CF=B5)\)\ \
\@=CF=B5 - 172\ =CF=B5 + 30\ =CE=B2\^2\ =CF=B5)\))\) + \[ExponentialE]\^\(\=
(3\
=CE=B3\ \@=CF=B5\)\/\@Da\)\ \((15 -=
45\ =CE=B2
\ \@=CF=B5 \
- 82\ =CF=B5 + 30\ =CE=B2\^2\ =CF=B5 + =CE=B3\ \((\(-15\) - 8\ =CF=B5 - 30\=
=CE=B2\^2\ =CF=B5 +
45\ =CE=B2\ \@=CF=B5\ \((1 + 2\ =CF=B5)=
\))\))\) +
\
\[ExponentialE]\^\(\(2\ =CE=B3\ \@=CF=B5\)\/\@Da\)\ \((
15 + 15\ =CE=B2\ \@=CF=B5 + 82\ =CF=
=B5 - 30\ =CE=B2
\^2\
=CF=B5 + =CE=B3\ \((\(-15\) - 172\ =
=CF=B5 +
30\ =CE=B2\^2\
\ =CF=B5 + 15\ =CE=B2\ \@=CF=B5\ \((\(-1\) + 6\ =CF=B5)\))\))\))\))\)\ =CE=
=BB - 140\ \((144\
Da\^3\ \((\(-1\) + \[ExponentialE]
\^\(\(=CE=B3\
\ \@=CF=B5\)\/\@Da\))\)\^4\ \@=CF=B5 - \((\(-1\) + =CE=B3)\)\^6\ \((
1 + \[ExponentialE]\^\(\(2\ =CE=B3\ \
\@=CF=B5\)\/\@Da\)\ \((1 - =CE=B2\ \@=CF=B5)\) + =CE=B2\ \@=CF=B5)\)\^2\ \@=
=CF=B5 - 8\ \@Da\ \((\
(-1\) + \
\[ExponentialE]\^\(\(2\ =CE=B3\ \@=CF=B5\)\/\@Da\))\)\ \((\(-1\) + =CE=B3)\=
)\^5\ \((\
(-1\) + \
\[ExponentialE]\^\(\(2\ =CE=B3\ \@=CF=B5\)\/\@Da\)\ \((\(-1\) + =CE=B2\ \@=
=CF=B5)\) - =CE=B2\
\@=CF=B5)\)\ \
=CF=B5 + 24\ Da\^2\ \((\(-1\) + \[ExponentialE]\^\(\(=CE=B3\ \@=CF=B5\)\/\@=
Da\))\)
\^2\ \
\((\(-1\) +
=CE=B3)\)\ \@=CF=B5\ \((\(-5\)\ =CE=B2\ \@=
=CF=B5 + =CE=B3\ \((3
+ 8\ =CE=B2\
\ \@=CF=B5 + 2\ =CF=B5)\) + 2\ \[ExponentialE]\^\(\(=CE=B3\ \@=CF=B5\)\/\@D=
a\)\ \((\(-5\)
+ =CE=B3\ \
\((5 + 2\ =CF=B5)\))\) + \[ExponentialE]\^\(\(2\ =CE=B3\ \@=CF=B5\)\/\@Da\)=
\ \((5\ =CE=B2\
\@=CF=B5 + \
=CE=B3\ \((3 -
8\ =CE=B2\ \@=CF=B5 + 2\ =CF=B5)\))=
\))\) -
24\ \
Da\^\(5/2\)\ \((\(-1\) + \[ExponentialE]\^\(\(=CE=B3\ \@=CF=B5\)\/\@Da\))\)=
\^3\ \
((\(-3\
\) - 6\ =CE=B2\ \@=CF=B5 - 4\ =CF=B5 + =CE=B3\ \((3 + 6\
=CE=B2\ \@=CF=B5 + 7\ =CF=B5)\) + \[Exp=
onentialE]
\^\(\(=CE=B3\
\ \@=CF=B5\)\/\@Da\)\ \((\(-3\) + 6\ =CE=B2\ \@=CF=B5 -
4\ =CF=B5 + =CE=B3\ \((3 - 6\ =CE=B2\ \@=CF=
=B5 + 7\ =CF=B5)\))
\))\) + \
2\ Da\ \((\(-1\) + =CE=B3)\)\^3\ \@=CF=B5\ \((9 - 3\ =CE=B3 - 18\ \[Exponen=
tialE]\^\
(\(3\ =CE=B3\ \
\@=CF=B5\)\/\@Da\)\ \((\(-1\) + =CE=B3)\)\ \((\(-1\) + =CE=B2\ \@=CF=B5)\) =
+ 18\ \
\[ExponentialE]\^\(\(=CE=B3\ \@=CF=B5\)\/\@Da\)\ \((\(-1\) + =CE=B3)\)\ \((=
1 + =CE=B2\ \@=CF=B5)
\) +
9\ =CE=B2\ \@=CF=B5 + 3\ =CE=B2\ =CE=B3=
\ \@=CF=B5 + 8\ =CF=B5 -
8\ =CE=B3\ =CF=B5 \
+ 6\ =CE=B2\^2\ =CE=B3\ =CF=B5 + \[ExponentialE]\^\(\(4\ =CE=B3\ \@=CF=B5\)=
\/\@Da\)\ \((9 - 9\ =CE=B2
\ \@=CF=B5 \
+ 8\ =CF=B5 + =CE=B3\ \((\(-3\) - 3\ =CE=B2\ \@=CF=B5 - 8\ =CF=B5 + 6\ =CE=
=B2\^2\
=CF=B5)\))\) -
2\ \[ExponentialE]\^\(\(2\ =CE=B3\
\@=CF=B5\)\/\
\@Da\)\ \((\(-9\) + 8\ =CF=B5 + =CE=B3\ \((3 + \((\(-8\) + 6\
=CE=B2\^2)\)\ =CF=B5)\))\))\) + 12\ D=
a\^
\(3/
2\)\ \((\(-1\) + \[ExponentialE]
\^\(\(=CE=B3\
\ \@=CF=B5\)\/\@Da\))\)\ \((\(-1\) + =CE=B3)\)\^2\ \((1 - =CE=B3 + 3\ =CE=
=B2\ \@=CF=B5 - 3\ =CE=B2\ =CE=B3
\ \@=CF=B5 \
- 6\ =CF=B5 + 2\ =CE=B2\^2\ =CF=B5 + =CE=B3\ =CF=B5 - 2\ =CE=B2\^2\ =CE=B3\=
=CF=B5 - 5\ =CE=B2\ =CE=B3\ =CF=B5\^\(3/
2\) - \[ExponentialE]\^\(\(=CE=B3\ \@=
=CF=B5\)
\/\@Da\
\)\ \((\(-1\) + =CE=B2\ \@=CF=B5 - 6\ =CF=B5 + 2\ =CE=B2\^2\ =CF=B5 + =CE=
=B3\ \((1 + 11\ =CF=B5 - 2\ =CE=B2
\^2\ =CF=B5 +
=CE=B2\ \@=CF=B5\ \((\(-1\) +
5\ =CF=B5)\))\))\) + \
\[ExponentialE]\^\(\(2\ =CE=B3\ \@=CF=B5\)\/\@Da\)\ \((1 + =CE=B2\ \@=CF=B5=
+ 6\ =CF=B5 - 2\ =CE=B2
\^2\ =CF=B5 +
=CE=B3\ \((\(-1\) -
11\ =CF=B5 + 2\ =CE=B2\^2\ =CF=B5 + =CE=
=B2\ \@=CF=B5\ \((\
(-1\) + \
5\ =CF=B5)\))\))\) + \[ExponentialE]\^\(\(3\ =CE=B3\ \@=CF=B5\)\/\@Da\)\ \(=
(1 - 3\ =CE=B2\
\@=CF=B5 -
6\ =CF=B5 + 2\ =CE=B2\^2\ =CF=B5 + =
=CE=B3\ \((\(-1\)
+ =CF=B5 -
2\ =CE=B2\^2\ =CF=B5 +
=CE=B2\ \@=CF=B5\ \((3 + 5\
=CF=B5)\))\))\))\))\)\ =CF=83\_1)\)=
)\)/\
((140\ \
\@=CF=B5\ \((24\ Da\^2\ \((\(-1\) + \[ExponentialE]\^\(\(=CE=B3\ \@=CF=B5\)=
\/\@Da\))\)
\^2\ \
\@=CF=B5 + \((\(-1\) + =CE=B3)\)\^4\ \((\(-1\) + \[ExponentialE]\^\(\(2\ =
=CE=B3\ \@=CF=B5\)
\/\@Da\
\)\ \((\(-1\) + =CE=B2\ \@=CF=B5)\) - =CE=B2\ \@=CF=B5)\)\ \@=CF=B5 -
12\ Da\ \((\(-1\) + =CE=B3)\)\ \((\
(-1\) - 2\
\ \[ExponentialE]\^\(\(=CE=B3\ \@=CF=B5\)\/\@Da\)\ \((\(-1\) + =CE=B3)\) + \
[ExponentialE]\^\
\(\(2\ =CE=B3\ \@=CF=B5\)\/\@Da\)\ \((\(-1\) + =CE=B2\ =CE=B3\ \@=CF=B5)\) =
- =CE=B2\
=CE=B3\ \@=CF=B5)\)\ \@=CF=B5 + 4\ \@Da\ \((\=
(-1\) + \
\[ExponentialE]\^\(\(2\ =CE=B3\ \@=CF=B5\)\/\@Da\))\)\ \((\(-1\) + =CE=B3)\=
)\^3\ =CF=B5 -
12\ \
Da\^\(3/2\)\ \((\(-1\) + \[ExponentialE]\^\(\(=CE=B3\ \@=CF=B5\)\/\@Da\))\)=
\ \((\
(-1\) \
- 2\ =CE=B2\ \@=CF=B5 + =CE=B3\ \((1 + 2\ =CE=B2\ \@=CF=B5 + =CF=B5)\) + \[=
ExponentialE]\^\(\(=CE=B3\ \
\@=CF=B5\)\/\@Da\)\ \((\(-1\) + 2\ =CE=B2\ \@=CF=B5 + =CE=B3\ \((1 - 2\ =CE=
=B2\ \@=CF=B5 + \
=CF=B5)\))\))\))\)\^2)\))\)\)