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last edited 6 years ago by test int |
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Editor: crashcut
Time: 2008/01/31 02:51:25 GMT-8 |
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Note: |
added:
From crashcut Thu Jan 31 02:51:21 -0800 2008
From: crashcut
Date: Thu, 31 Jan 2008 02:51:21 -0800
Subject:
Message-ID: <20080131025121-0800@axiom-wiki.newsynthesis.org>
\begin{reduce}
solve({y=-1/l*(1-(l*x+c1)^2)^(1/2)+c2, c1=(-3*l^2-l+8)^(1/2)/4-l, c2=-3((-3*l^2-l+8)^(1/2)+7*l)/12*l}, {y});
\end{reduce}
Try Reduce calculations here. For example:
\begin{reduce} solve({z=x*a+2},{z,x}); int(sqrt(1-sin(x)*cos(x)),x); \end{reduce}
solve({z=x*a+2},{z,x}); | reduce |
int(sqrt(1-sin(x)*cos(x)),x); | reduce |
int(log(log(x)),x); | reduce |
axiomintegrate(log(log(x)),x)
(1) |
solve({c=-1/m*(1-(m*a+c1)^2)^(1/2)+c2, b=-1/m*(1-c1^2)^(1/2)+c2}, {c1,c2}); | reduce |
solve({y=-1/l*(1-(l*x+c1)^2)^(1/2)+c2, c1=((-3*l^2-l+8)^(1/2)/4-l, c2=-3((-3*l^2-l+8)^(1/2)+7*l)/12*l}, {y});;)}y{,solve({y=-1/l*(1-(l*x+c1)^2)^(1/2)+c2,c1=((-3*l^2-l+8)^(1/2)/4-l,c2=- 3((-3*l^2-l+8)^(1/2)+7*l)/12*l | reduce |
$ | reduce |
$$} ***** Too few right parentheses ***** Continuing with parsing only ... | reduce |
solve({y=-1/l*(1-(l*x+c1)^2)^(1/2)+c2, c1=(-3*l^2-l+8)^(1/2)/4-l, c2=-3((-3*l^2-l+8)^(1/2)+7*l)/12*l}, {y}); | reduce |
solve({y=-1/l*(1-(l*x+c1)^2)^(1/2)+c2, c1=(-3*l^2-l+8)^(1/2)/4-l, c2=-3*((-3*l^2-l+8)^(1/2)+7*l)/12*l}, {y}); | reduce |
solve({y=-1/l*(1-(l*x+c1)^2)^(1/2)+c2, c1=(-3*l^2-l+8)^(1/2)/4-l, c2=-3*((-3*l^2-l+8)^(1/2)+7*l)/(12*l)}, {y}); | reduce |
solve({y=-1/l*(1-(l*x+c1)^2)^(1/2)+c2, c1=(-3*l^2-l+8)^(1/2)/4-l, c2=3*((-3*l^2-l+8)^(1/2)+7*l)/(12*l)}, {y}); | reduce |