texpower package demotexpower.sourceforge.net/doc/pdfslidemo.pdf · 2003. 5. 15. · pdfslide demo...
TRANSCRIPT
-
1/6
JJIIJI
Back
Close
The texpower Packagepdfslide Demo
Stephan Lehmkemailto:[email protected]
-
2/6
JJIIJI
Back
Close
Contents
1 A list environment 3
2 An aligned equation 4
3 An array 5
4 A picture 6
-
3/6
JJIIJI
Back
Close
A list environment
-
3/6
JJIIJI
Back
Close
A list environment
foo.
-
3/6
JJIIJI
Back
Close
A list environment
foo. bar.
-
3/6
JJIIJI
Back
Close
A list environment
foo. bar.
baz.
-
3/6
JJIIJI
Back
Close
A list environment
foo. bar.
baz. qux.
-
4/6
JJIIJI
Back
Close
An aligned equation
-
4/6
JJIIJI
Back
Close
An aligned equation
n∑i=1
i (1)
(2)
(3)
(4)
-
4/6
JJIIJI
Back
Close
An aligned equation
n∑i=1
i = 1 + 2 + · · · + (n− 1) + n (1)
(2)
(3)
(4)
-
4/6
JJIIJI
Back
Close
An aligned equation
n∑i=1
i = 1 + 2 + · · · + (n− 1) + n (1)
= 1 + n + 2 + (n− 1) + · · · (2)(3)
(4)
-
4/6
JJIIJI
Back
Close
An aligned equation
n∑i=1
i = 1 + 2 + · · · + (n− 1) + n (1)
= 1 + n + 2 + (n− 1) + · · · (2)= (1 + n) + · · · + (1 + n) (3)
(4)
-
4/6
JJIIJI
Back
Close
An aligned equation
n∑i=1
i = 1 + 2 + · · · + (n− 1) + n (1)
= 1 + n + 2 + (n− 1) + · · · (2)= (1 + n) + · · · + (1 + n)︸ ︷︷ ︸
×n2
(3)
(4)
-
4/6
JJIIJI
Back
Close
An aligned equation
n∑i=1
i = 1 + 2 + · · · + (n− 1) + n (1)
= 1 + n + 2 + (n− 1) + · · · (2)= (1 + n) + · · · + (1 + n)︸ ︷︷ ︸
×n2
(3)
=(1 + n)
(4)
-
4/6
JJIIJI
Back
Close
An aligned equation
n∑i=1
i = 1 + 2 + · · · + (n− 1) + n (1)
= 1 + n + 2 + (n− 1) + · · · (2)= (1 + n) + · · · + (1 + n)︸ ︷︷ ︸
×n2
(3)
=(1 + n) · n
2(4)
-
5/6
JJIIJI
Back
Close
An array
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0 —
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0 — —
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0 — — 0
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0 — — 0 1
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0 — — 0 11
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0 — — 0 11 0
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0 — — 0 11 0 0
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0 — — 0 11 0 0 1
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0 — — 0 11 0 0 1 2
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0 — — 0 11 0 0 1 22
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0 — — 0 11 0 0 1 22 1
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0 — — 0 11 0 0 1 22 1 2
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0 — — 0 11 0 0 1 22 1 2 4
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0 — — 0 11 0 0 1 22 1 2 4 4
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0 — — 0 11 0 0 1 22 1 2 4 43
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0 — — 0 11 0 0 1 22 1 2 4 43 1.6
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0 — — 0 11 0 0 1 22 1 2 4 43 1.6 4.8
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0 — — 0 11 0 0 1 22 1 2 4 43 1.6 4.8 9
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0 — — 0 11 0 0 1 22 1 2 4 43 1.6 4.8 9 8
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0 — — 0 11 0 0 1 22 1 2 4 43 1.6 4.8 9 84
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0 — — 0 11 0 0 1 22 1 2 4 43 1.6 4.8 9 84 2
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0 — — 0 11 0 0 1 22 1 2 4 43 1.6 4.8 9 84 2 8
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0 — — 0 11 0 0 1 22 1 2 4 43 1.6 4.8 9 84 2 8 16
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0 — — 0 11 0 0 1 22 1 2 4 43 1.6 4.8 9 84 2 8 16 16
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0 — — 0 11 0 0 1 22 1 2 4 43 1.6 4.8 9 84 2 8 16 165
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0 — — 0 11 0 0 1 22 1 2 4 43 1.6 4.8 9 84 2 8 16 165 2.3
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0 — — 0 11 0 0 1 22 1 2 4 43 1.6 4.8 9 84 2 8 16 165 2.3 11.6
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0 — — 0 11 0 0 1 22 1 2 4 43 1.6 4.8 9 84 2 8 16 165 2.3 11.6 25
-
5/6
JJIIJI
Back
Close
An array
n log n n log n n2 2n
0 — — 0 11 0 0 1 22 1 2 4 43 1.6 4.8 9 84 2 8 16 165 2.3 11.6 25 32
-
6/6
JJIIJI
Back
Close
A picture
-
6/6
JJIIJI
Back
Close
A picture
-
x(t)
-
y(t)
-
6/6
JJIIJI
Back
Close
A picture
-
x(t)
-
y(t)
��
��
��
QQ
QQ
QQ
ϕ
-
6/6
JJIIJI
Back
Close
A picture
-
x(t)
-
y(t)
��
��
��
QQ
QQ
QQ
ϕ -Ft = ϕ
(x(t)
)
-
6/6
JJIIJI
Back
Close
A picture
-
x(t)
-
y(t)
��
��
��
QQ
QQ
QQ
ϕ -Ft = ϕ
(x(t)
) Φ
-
6/6
JJIIJI
Back
Close
A picture
-
x(t)
-
y(t)
��
��
��
QQ
QQ
QQ
ϕ -Ft = ϕ
(x(t)
) Φ -Gt = Φ
( )
-
6/6
JJIIJI
Back
Close
A picture
-
x(t)
-
y(t)
��
��
��
QQ
QQ
QQ
ϕ -Ft = ϕ
(x(t)
) Φ -Gt = Φ
(ϕ
( ))
-
6/6
JJIIJI
Back
Close
A picture
-
x(t)
-
y(t)
��
��
��
QQ
QQ
QQ
ϕ -Ft = ϕ
(x(t)
) Φ -Gt = Φ
(ϕ
(x(t)
))
-
6/6
JJIIJI
Back
Close
A picture
-
x(t)
-
y(t)
��
��
��
QQ
QQ
QQ
ϕ -Ft = ϕ
(x(t)
) Φ -Gt = Φ
(ϕ
(x(t)
)) QQQ
QQQ
��
��
��
δ
A list environmentAn aligned equationAn arrayA picture