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ÃD¥Ø
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Construct this pretty flower:
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Construct the line segments joining (cos(t),0) with (0,sin(t))
as t ranges over in [0, 2*Pi]
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Maple Files
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w401.mws
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w402.mws
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ºô¶»P¹Ï§Î
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ÃD¥Ø
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Construct the velocity vector
field along a constant motion
around a circle.
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Construct this figure:
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Maple Files
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w403.mws
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w404.mws
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ºô¶»P¹Ï§Î
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ÃD¥Ø
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Construct the lines segments joining [cos(t),sin(t)] with [cos(2t),sin(2t)]
as t ranges over [0, 2*Pi];
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Construct this figure:
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Maple Files
|
w405.mws
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w406.mws
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ºô¶»P¹Ï§Î
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ÃD¥Ø
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Construct this graph associated
with the logistic equation
with a=3.7
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Draw 20 concentric circles as thus:
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Maple Files
|
w407.mws
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w408.mws
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ºô¶»P¹Ï§Î
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ÃD¥Ø
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Construct the circles with center at (cos(t),sin(t)) passing through
the point (1,0) with t ranging
over [0, 2*Pi];
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Construct the circles with center at (cos(t),sin(t)) and tangent
to the y-axes with t ranging over [0, 2*Pi];
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Maple Files
|
w409.mws
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w410.mws
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ºô¶»P¹Ï§Î
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ÃD¥Ø
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Construct the circles with center at (cos(t),sin(t)) and passing
through
(2cos(t)/3+cos(2t)/3,2sin(t)/3-sin(2t)/3) with t ranging over [0, 2*Pi];
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Construct this figure:
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Maple Files
|
w411.mws
|
w412.mws
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ºô¶»P¹Ï§Î
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ÃD¥Ø
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Construct this pattern:
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Construct the reflections fo a light ray inside a square:
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Maple Files
|
w413.mws
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w414.mws
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ºô¶»P¹Ï§Î
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