~v350 200 zw#^g]inZi`bVVYYc[Dccb`bZD[Y wx$N_edVQU\VYWlPQU`TOU`TWWTVaWlXS ~w169 8 479 413 0 0 0 0 ~f? 12 11 9 ? 3 1 1 0 ? ? ? "Arial" ? ? ? 0 ? 1 1 "Times" 12 ? ? 5 0 c n 1 1 0 0 k 468 i"?n page ?p?a" ? 0 26177 26178 26115 26178 1 1 1 1 0 0 8405120 0 -1 1 0 -1 -1 -1 -1 -1 1 1 0 0 2 0 ? ? ? ? ? ? ? ? ~Q ]|Expr|[#b @`bb#_b#_b#_})"# b'4`fb#_}" *|: ;bP8&c0!*`g| |1''| |b#(-___| |3b6,b1N| |M,6r;%14!\!!!!.8Ou6I!!!#?!!!!.#Qau+!+R+Zc2[hI2+^2%<-Xr#=A<]!| |2@poEh$2gA!q68GjT??#Z;7S9f[9pCqZ?W)5[sTlP'_`%\j/Y,#I"<4$dm#r| |bTcA'>td]V8WMil`U0Dr5R?G4r:i4@)%*$*M_i..'itl['@TAfs^sFcW$0&)XJ2^BgNUBS<:VC(1QRDsel#_fW8m*2QWL0h"sejR&2\;b1^k#tIe88c| |\\c,<@9>.KH4fW*e^]rN]'pee6NEM"kGDtEbW\Yg^i9$Bdo7og4+<8Z#Mtc!| |Ei"%=H+2NkO[f_3&Mj"h_!)b6Hi!o`:5H*U38k_q]WhOMs| |4@`*Y6D-\nH$MF0l"\'32^1uFom0mWY#_SW$p!L(O?ChiJ.Rm@.39X)Nf]pY| |Lna+liP@?F`n5WUKl\;i@2O`4$W2NRVJ33bCEWfbG,R$O`Sq/KYLaFS"@8\s| |QicQd)W_7OTVcGW,l&YR:%tPo4B>%e$8JJ'g&piYEd[.Ppo#L?;@gI_AF`OV| |8i*b(]=>AL:#Q$M??Pd#%n"G0]a?Jp[4I4IK!@!dJp4S+;Tere%fk6Uhsl=E| |H@-`%Og6B]UgFMmCXI6,QDaq4n;^95+Lqj9O[Qm?C+IH49Ejm2/XjoGHfF3I| |)5-NOi2r\T!:WKYV)5s_]A]lc=J"^7NsU#oXo=(]XO9!(fUS7'8ja| |JriJ'| |9}| |}& b!( b"0 b#8 b$@ b%H b&P!WW}]|[~p1 0 ~Hs(?a*?x^2+?b*?y^2+?c*?x*?y):(?a*?x^2+?c*?x*?y+~ ?b*?y^2)~p0 1 ~Hs(?a*?x^2+?b*?y^2-?c*?x*?y):(?a*?x^2-?c*?x*?y+~ ?b*?y^2)~p0 1 ~Hs(?a*?x^2+?y^2-?b*?x*?y):(?a*?x^2-?b*?x*?y+?y^~ 2)~p0 1 ~Hs(?a*?x^2+?y^2+?b*?x*?y):(?a*?x^2+?b*?x*?y+?y^~ 2)~p0 1 ~Hs(-?a*?x^2-?b*?y^2-?c*?x*?y):(-?a*?x^2-?c*?x*~ ?y-?b*?y^2)~p0 1 ~V?v0 (q)~p0 1 ~V?v0 (p)~p0 1 ~V?v0 (s)~p0 1 ~V?v0 (m)~p0 1 ~Q ]|Expr|[#b @`bb#_b#_b#_})!# b$L" *|: ;bP7&c0!*Trigonometry| |}& b!( b"0 b#8 b$@ b%H b&P!WW}]|[~p1 1 ~V?f276 (arccsc)~p0 2 ~V?f278 (arccot)~p0 2 ~V?f256 (sin)~p0 2 ~V?f257 (cos)~p0 2 ~V?f258 (tan)~p0 2 ~V?f261 (sec)~p0 2 ~V?f260 (csc)~p0 2 ~V?f262 (cot)~p0 2 ~V?f272 (arcsin)~p0 2 ~V?f273 (arccos)~p0 2 ~V?f274 (arctan)~p0 2 ~V?f277 (arcsec)~p0 2 ~Q ]|Expr|[#b @`bb#_b#_b#_})!# b$L" *|: ;bP7&c0!*Hyperbolic| |}& b!( b"0 b#8 b$@ b%H b&P!WW}]|[~p1 1 ~V?f309 (arcsech)~p0 2 ~V?f304 (arcsinh)~p0 2 ~V?f294 (coth)~p0 2 ~V?f310 (arccoth)~p0 2 ~V?f306 (arctanh)~p0 2 ~V?f293 (sech)~p0 2 ~V?f288 (sinh)~p0 2 ~V?f289 (cosh)~p0 2 ~V?f290 (tanh)~p0 2 ~V?f305 (arccosh)~p0 2 ~V?f308 (arccsch)~p0 2 ~V?f292 (csch)~p0 2 ~Q ]|Expr|[#b @`bb#_b#_b#_})%# b$L" *|: ;bP7&c0!*Logarithms ,F Powers| |}& b!( b"0 b#8 b$@ b%H b&P!WW}]|[~p1 1 ~V?f32 (log)~p0 2 ~V?f307 (ln)~p0 2 ~V?f291 (exp)~p0 2 ~V?c2 (e)~p0 2 ~Q ]|Expr|[#b @`bb#_b#_b#_})## b$L" *|: ;bP7&c0!*Standard Rules| |}& b!( b"0 b#8 b$@ b%H b&P!WW}]|[~p1 1 ~Q ]|Expr|[#b @`bb#_b#_b#_})%# b$L" *|: ;bP7&c0!*Logarithms ,F Powers| |}& b!( b"0 b#8 b$@ b%H b&P!WW}]|[~p1 2 ~Ht(?x^(-?y)):(1/?x^?y)~p0 3 ~Hs(exp(?z)):(e^?z)~p0 3 ~Hs(e^(ln(?x))):(?x)~p0 3 ~Hs(10^(log(?x))):(?x)~p0 3 ~Hs(?y^(log_?y(?x))):(?x)~p0 3 ~Hs(ln(e^?x)):(?x)~p0 3 ~Hs(log(10^?x)):(?x)~p0 3 ~Hs(log_?y(?y^?x)):(?x)~p0 3 ~He(ln(?u*?v)):(ln(?u)+ln(?v))~p0 3 ~He(log(?u*?v)):(log(?u)+log(?v))~p0 3 ~He(log_?y(?u*?v)):(log_?y(?u)+log_?y(?v))~p0 3 ~He(ln(?u/?v)):(ln(?u)-ln(?v))~p0 3 ~He(log(?u/?v)):(log(?u)-log(?v))~p0 3 ~He(log_?y(?u/?v)):(log_?y(?u)-log_?y(?v))~p0 3 ~He(ln(?u^?v)):(?v*ln(?u))~p0 3 ~He(log(?u^?v)):(?v*log(?u))~p0 3 ~He(log_?y(?u^?v)):(?v*log_?y(?u))~p0 3 ~He(ln(sqrt(?u))):(1/2*ln(?u))~p0 3 ~He(log(sqrt(?u))):(1/2*log(?u))~p0 3 ~He(log_?y(sqrt(?u))):(1/2*log_?y(?u))~p0 3 ~He(?z^(?x+?y)):(?z^?x*?z^?y)~p0 3 ~He(?z^(?x-?y)):(?z^?x*?z^(-?y))~p0 3 ~Q ]|Expr|[#b @`bb#_b#_b#_})!# b$L" *|: ;bP7&c0!*Trigonometry| |}& b!( b"0 b#8 b$@ b%H b&P!WW}]|[~p1 2 ~Q ]|Expr|[#b @`bb#_b#_b#_})+# b$L" *|: ;bP7&c0!*Simplify ,M negation| | and common zeros}& b!( b"0 b#8 b$@ b%H b&P!WW}]|[~p1 3 ~Hs(sin(-?x)):(-sin(?x))~p0 4 ~Hs(cos(-?x)):(cos(?x))~p0 4 ~Hs(tan(-?x)):(-tan(?x))~p0 4 ~Hs(sin('p)):(0)~p0 4 ~Hs(sin(?n*'p)):(0)~p0 4 ~Hs(cos(1/2*'p)):(0)~p0 4 ~Hs(cos(?n/2*'p)):(0)~p0 4 ~Hs(-(cos(?x))^2-(sin(?x))^2):(-1)~p0 4 ~Hs(cos('p/2)):(0)~p0 4 ~Q ]|Expr|[#b @`bb#_b#_b#_})'# b$L" *|: ;bP7&c0!*Transform to basic| | types}& b!( b"0 b#8 b$@ b%H b&P!WW}]|[~p1 3 ~Ht(tan(?x)):((sin(?x))/(cos(?x)))~p0 4 ~Ht(csc(?x)):(1/(sin(?x)))~p0 4 ~Ht(sin(?x)):(1/(csc(?x)))~p0 4 ~Ht(sec(?x)):(1/(cos(?x)))~p0 4 ~Ht(cos(?x)):(1/(sec(?x)))~p0 4 ~Ht(cot(?x)):((cos(?x))/(sin(?x)))~p0 4 ~Q ]|Expr|[#b @`bb#_b#_b#_})## b$L" *|: ;bP7&c0!*Trig Addition| |}& b!( b"0 b#8 b$@ b%H b&P!WW}]|[~p1 3 ~Ht(cos(?x+?y)):(cos(?x)*cos(?y)-sin(?x)*sin(?y))~p0 4 ~Ht(sin(?x+?y)):(cos(?x)*sin(?y)+sin(?x)*cos(?y))~p0 4 ~Ht(cos(2*?x)):(2*(cos(?x))^2-1)~p0 4 ~Ht(sin(2*?x)):(2*cos(?x)*sin(?x))~p0 4 ~Ht(sin(?n*?x)):(cos((?n-1)*?x)*sin(?x)+cos(?x)*~ sin((?n-1)*?x))~p0 4 ~Ht(cos(?n*?x)):(cos(?x)*cos((?n-1)*?x)-sin(?x)*~ sin((?n-1)*?x))~p0 4 ~Q ]|Expr|[#b @`bb#_b#_b#_})/# b$L" *|: ;bP7&c0!*Transform ,M into| | another flavor of trig function}& b!( b"0 b#8 b$@ b%H b&P!WW}]|[~p1 3 ~Ht((sin(?x))^2):(1-(cos(?x))^2)~p0 4 ~Ht((cos(?x))^2):(1-(sin(?x))^2)~p0 4 ~Ht((tan(?x))^2):((sec(?x))^2-1)~p0 4 ~Ht((sec(?x))^2):((tan(?x))^2+1)~p0 4 ~Ht((csc(?x))^2):((cot(?x))^2+1)~p0 4 ~Ht((cot(?x))^2):((csc(?x))^2-1)~p0 4 ~Hs((sin(?x))^2+(cos(?x))^2):(1)~p0 4 ~Q ]|Expr|[#b @`bb#_b#_b#_})b @# b%4" *|: ;bP7&c0!*substituting | |z,]tan,Hx,O2,I into a rational function in sin,Hx,I and cos,H| |x,I}& b!( b"0 b#8 b$@ b%H b&P!WW}]|[~p1 3 ~Hs(cos(2*arctan(?z))):((1-?z^2)/(1+?z^2))~p0 4 ~Hs(sin(2*arctan(?z))):(2*?z/(1+?z^2))~p0 4 ~Q ]|Expr|[#b @`bb#_b#_b#_})## b$L" *|: ;bP7&c0!*Other rules| |}& b!( b"0 b#8 b$@ b%H b&P!WW}]|[~p1 3 ~Ht((cos(?x))^2):(1/2*(cos(2*?x)+1))~p0 4 ~Ht((sin(?x))^2):(1/2*(-cos(2*?x)+1))~p0 4 ~Ht(cos(?x)*sin(?x)):(1/2*sin(2*?x))~p0 4 ~Hs(sin(arccos(?x))):(sqrt(-?x^2+1))~p0 4 ~Hs(cos(arcsin(?x))):(sqrt(-?x^2+1))~p0 4 ~Q ]|Expr|[#b @`bb#_b#_b#_})!# b!T" *|: ;bP7&c0!*Hyperbolic| |}& b!( b"0 b#8 b$@ b%H b&P!WW}]|[~p1 2 ~Q ]|Expr|[#b @`bb#_b#_b#_})+# b$L" *|: ;bP7&c0!*Simplify ,M negation| | and common zeros}& b!( b"0 b#8 b$@ b%H b&P!WW}]|[~p1 3 ~Hs(sinh(-?x)):(-sinh(?x))~p0 4 ~Hs(cosh(-?x)):(cosh(?x))~p0 4 ~Hs(tanh(-?x)):(-tanh(?x))~p0 4 ~Q ]|Expr|[#b @`bb#_b#_b#_})'# b$L" *|: ;bP7&c0!*Transform into | |other types}& b!( b"0 b#8 b$@ b%H b&P!WW}]|[~p1 3 ~Ht((sinh(?x))^2):((cosh(?x))^2-1)~p0 4 ~Ht((cosh(?x))^2):(1+(sinh(?x))^2)~p0 4 ~Ht((tanh(?x))^2):(1-(sech(?x))^2)~p0 4 ~Ht(sinh(?x)):((e^?x-e^(-?x))/2)~p0 4 ~Ht(cosh(?x)):((e^?x+e^(-?x))/2)~p0 4 ~Ht(tanh(?x)):((e^?x-e^(-?x))/(e^?x+e^(-?x)))~p0 4 ~Ht(tanh(?x)):((sinh(?x))/(cosh(?x)))~p0 4 ~Hs((cosh(?x))^2-(sinh(?x))^2):(1)~p0 4 ~Hs(-(cosh(?x))^2+(sinh(?x))^2):(-1)~p0 4 ~Q ]|Expr|[#b @`bb#_b#_b#_})%# b$L" *|: ;bP7&c0!*Other hyperbolic| | rules}& b!( b"0 b#8 b$@ b%H b&P!WW}]|[~p1 3 ~Ht((cosh(?x))^2):(1/2*(cosh(2*?x)+1))~p0 4 ~Ht((sinh(?x))^2):(1/2*(cosh(2*?x)-1))~p0 4 ~Ht(sinh(2*?x)):(2*cosh(?x)*sinh(?x))~p0 4 ~Ht(cosh(2*?x)):(2*(cosh(?x))^2-1)~p0 4 ~Q ]|Expr|[#b @`bb#_b#_b#_})!# b'4" *|: ;bP7&c0!*Constants| |}& b!( b"0 b#8 b$@ b%H b&P!WW}]|[~p1 1 ~V?c0 (C)~p0 2 ~V?c5 ('o)~p0 2 ~V?c1 ('p)~p0 2 ~V?c0 (c)~p0 2 ~V?c0 (b)~p0 2 ~V?c0 (a)~p0 2 ~V?c4 (i)~p0 2 ~V?c3 ('N)~p0 2 ~Q ]|Expr|[#b @`bb#_b#_b#_})!# b'4" *|: ;bP7&c0!*Variables| |}& b!( b"0 b#8 b$@ b%H b&P!WW}]|[~p1 1 ~V?v0 (n)~p0 2 ~V?v0 (h)~p0 2 ~V?v0 (v)~p0 2 ~V?v0 (u)~p0 2 ~V?v0 (w)~p0 2 ~V?v0 ('f)~p0 2 ~V?v0 ('r)~p0 2 ~V?v0 ('q)~p0 2 ~V?v0 (r)~p0 2 ~V?v0 (t)~p0 2 ~V?v0 (z)~p0 2 ~V?v0 (y)~p0 2 ~V?v0 (x)~p0 2 ~V?v0 (k)~p0 2 ~Q ]|Expr|[#b @`bb#_b#_b#_})!# b'4" *|: ;bP7&c0!*Functions| |}& b!( b"0 b#8 b$@ b%H b&P!WW}]|[~p1 1 ~V?f162 (max)~p0 2 ~V?f161 (min)~p0 2 ~V?f132 (FromSpherical)~p0 2 ~V?f130 (FromCylindrical)~p0 2 ~V?f128 (FromPolar)~p0 2 ~V?f144 (RowsOf)~p0 2 ~V?f146 (ColsOf)~p0 2 ~V?d16 (d)~p0 1 ~Q ]|Expr|[#b @`bb#_b#_b#_})*# b'4" *|: ;bP8&c0!*Aufgaben zu binomischen| | Formeln 5,N}& b!( b"0 b#8 b$@ b%H b&P!WW}]|[~p0 0 ~Q ]|Expr|[#b @`bb#_b#_b#_}`f#})## b'4" *|: ;bP8&c0!*a,I | |}& b!( b"0 b#8 b$@ b%H b&P!WW}]|[~p0 0 ~A((x+2)^2+(x+3)^2)~p1 0 ~A((x+2)^2+(x+3)^2=(x^2+4*x+4)+(x^2+6*x+9))~p0 1 ~sb/_!! } "(! c#T"!c"L"!c%X"_c/__c/__} ^ _~A(~ (x+2)^2+(x+3)^2=2*x^2+10*x+13)~p3 2 ~sb/_!! } !&! c#T"!c"L"_c/__c/__} ^ _~A((x+~ 2)^2+(x+3)^2=(x^2+4*x+4)+(x+3)^2)~p0 3 ~sb/^!! } "(! c#T"!c"L" c%X"_c/__c/__} ^ _~Q ]|Expr|[#b @`bb#_b#_b#_}`f#})"# b'4" *|: ;bP8&c0!*b,I| |}& b!( b"0 b#8 b$@ b%H b&P!WW}]|[~p0 0 ~A((t-4)^2+(t+5)^2)~p1 0 ~A((t-4)^2+(t+5)^2=(t^2-8*t+16)+(t^2+10*t+25))~p0 1 ~sb/_!! } "(! c#T"!c"L"!c%X"_c/__c/__} ^ _~A(~ (t-4)^2+(t+5)^2=2*t^2+2*t+41)~p3 0 ~sb/_!! } "&! c#T"!c"L"_c/__c/__} ^ _~A((t-~ 4)^2+(t+5)^2=(t^2-8*t+16)+(t+5)^2)~p0 1 ~sb/^!! } "(! c#T"!c"L" c%X"_c/__c/__} ^ _~Q ]|Expr|[#b @`bb#_b#_b#_}`f#})"# b'4" *|: ;bP8&c0!*c,I| |}& b!( b"0 b#8 b$@ b%H b&P!WW}]|[~p0 0 ~A((2*x+3*y)^2+(2*x-3*y)^2)~p1 0 ~A((2*x+3*y)^2+(2*x-3*y)^2=(4*x^2+12*x*y+9*y^2)+~ (4*x^2-12*x*y+9*y^2))~p0 1 ~sb/_!! } "(! c#T"!c"L"!c%X"_c/__c/__} ^ _~A(~ (2*x+3*y)^2+(2*x-3*y)^2=8*x^2+18*y^2)~p3 0 ~sb/_!! } "&! c#T"!c"L"_c/__c/__} ^ _~A((2*~ x+3*y)^2+(2*x-3*y)^2=(4*x^2+12*x*y+9*y^2)+(2*x-~ 3*y)^2)~p0 1 ~sb/^!! } "(! c#T"!c"L" c%X"_c/__c/__} ^ _~Q ]|Expr|[#b @`bb#_b#_b#_}`f#})"# b'4" *|: ;bP8&c0!*d,I| |}& b!( b"0 b#8 b$@ b%H b&P!WW}]|[~p0 0 ~A((4*u-3*v)^2+(4*u+3*v)^2)~p1 0 ~A((4*u-3*v)^2+(4*u+3*v)^2=(16*u^2-24*u*v+9*v^~ 2)+(16*u^2+24*u*v+9*v^2))~p0 1 ~sb/_!! } "(! c#T"!c"L"!c%X"_c/__c/__} ^ _~A(~ (4*u-3*v)^2+(4*u+3*v)^2=32*u^2+18*v^2)~p3 0 ~sb/_!! } "&! c#T"!c"L"_c/__c/__} ^ _~A((4*~ u-3*v)^2+(4*u+3*v)^2=(16*u^2-24*u*v+9*v^2)+(4*~ u+3*v)^2)~p0 1 ~sb/^!! } "(! c#T"!c"L" c%X"_c/__c/__} ^ _~Q ]|Expr|[#b @`bb#_b#_b#_}`f#})"# b'4" *|: ;bP8&c0!*e,I| |}& b!( b"0 b#8 b$@ b%H b&P!WW}]|[~p0 0 ~A(2*(y+5)^2-(y+6)^2)~p1 0 ~A(2*(y+5)^2-(y+6)^2=2*(y^2+10*y+25)-(y^2+12*y+~ 36))~p0 1 ~sb/_!! } "*! c#T"!c"L"!c"T! c%X"_c/__c/__} ^ _~ ~A(2*(y+5)^2-(y+6)^2=(2*y^2+20*y+50)-(y^2+12*y+~ 36))~p0 2 ~sb/_!! } "(! c#T"!c"L" c"H"_c/__c/__} ^ _~A(~ 2*(y+5)^2-(y+6)^2=y^2+8*y+14)~p3 0 ~sb/_!! } "&! c#T"!c"L"_c/__c/__} ^ _~A(2*(~ y+5)^2-(y+6)^2=2*(y^2+10*y+25)-(y+6)^2)~p0 1 ~sb/^!! } "(! c#T"!c"L" c"H"_!"} ^ _~Q ]|Expr|[#b @`bb#_b#_b#_}`f#})"# b'4" *|: ;bP8&c0!*f,I| |}& b!( b"0 b#8 b$@ b%H b&P!WW}]|[~p0 0 ~A((m+4)^2-3*(7+m)^2)~p1 0 ~A((m+4)^2-3*(7+m)^2=(m^2+8*m+16)-3*(m^2+14*m+~ 49))~p0 1 ~sb/_!! } ",! c#T"!c"L"!c"T! c"H"!c%X"_c/__c/__} ^ _~ ~A((m+4)^2-3*(7+m)^2=(m^2+8*m+16)-(3*m^2+42*m+~ 147))~p0 2 ~sb/_!! } "*! c#T"!c"L"!c"T! c"H"_c/__c/__} ^ _~ ~A((m+4)^2-3*(7+m)^2=-2*m^2-34*m-131)~p3 0 ~sb/_!! } "&! c#T"!c"L"_c/__c/__} ^ _~A((m+~ 4)^2-3*(7+m)^2=(m^2+8*m+16)-3*(7+m)^2)~p0 1 ~sb/^!! } "(! c#T"!c"L" c%X"_c/__c/__} ^ _~Q ]|Expr|[#b @`bb#_b#_b#_}`f#})"# b'4" *|: ;bP8&c0!*g,I| |}& b!( b"0 b#8 b$@ b%H b&P!WW}]|[~p0 0 ~A(-3*(5*r+2*s)^2-(5*r-2*s)^2)~p1 0 ~A(-3*(5*r+2*s)^2-(5*r-2*s)^2=-3*(25*r^2+20*r*~ s+4*s^2)-(25*r^2-20*r*s+4*s^2))~p0 1 ~sb/_!! } "*! c#T"!c"L"!c"T! c%X"_c/__c/__} ^ _~ ~A(-3*(5*r+2*s)^2-(5*r-2*s)^2=(-75*r^2-60*r*s-~ 12*s^2)+(-25*r^2-4*s^2+20*r*s))~p0 2 ~sb/_! } !( c#T"!c"L"!c"T!_c/__c/__} ^ _~A(~ -3*(5*r+2*s)^2-(5*r-2*s)^2=-100*r^2-40*r*s-16*~ s^2)~p3 0 ~sb/_!! } !&! c#T"!c"L"_c/__c/__} ^ _~A(-3*~ (5*r+2*s)^2-(5*r-2*s)^2=(-75*r^2-60*r*s-12*s^2)-~ (25*r^2-20*r*s+4*s^2))~p0 1 ~sb/_!! } "(! c#T"!c"L" c"T!_c/__c/__} ^ _~A(~ -3*(5*r+2*s)^2-(5*r-2*s)^2=-3*(25*r^2+20*r*s+4*~ s^2)-(5*r-2*s)^2)~p0 1 ~sb/^!! } ",! c#T"!c"L" c"T! c"H"!c%X"_c/__c/__} ^ _~ ~Q ]|Expr|[#b @`bb#_b#_b#_}`f#})"# b'4" *|: ;bP8&c0!*h,I| |}& b!( b"0 b#8 b$@ b%H b&P!WW}]|[~p0 0 ~A(7*(3*p-q)^2-8*(3*p+q)^2)~p1 0 ~A(7*(3*p-q)^2-8*(3*p+q)^2=7*(9*p^2-6*p*q+q^2)-~ 8*(9*p^2+6*p*q+q^2))~p0 1 ~sb/_!! } ",! c#T"!c"L"!c"T! c"H"!c%X"_c/__c/__} ^ _~ ~A(7*(3*p-q)^2-8*(3*p+q)^2=(63*p^2-42*p*q+7*q^~ 2)+(-72*p^2-48*p*q-8*q^2))~p0 2 ~sb/_!! } "(! c#T"!c"L"!c"T!_c/__c/__} ^ _~A(~ 7*(3*p-q)^2-8*(3*p+q)^2=-9*p^2-q^2-90*p*q)~p3 0 ~sb/_!! } "&! c#T"!c"L"_c/__c/__} ^ _~A(7*(~ 3*p-q)^2-8*(3*p+q)^2=(63*p^2-42*p*q+7*q^2)-8*(~ 9*p^2+6*p*q+q^2))~p0 1 ~sb/_!! } "(! c#T"!c"L" c"H"_c/__c/__} ^ _~A(~ 7*(3*p-q)^2-8*(3*p+q)^2=7*(9*p^2-6*p*q+q^2)-8*~ (3*p+q)^2)~p0 1 ~sb/^!! } "*! c#T"!c"L" c"H"!c%X"_c/__c/__} ^ _~c1 163 -1 165 -1 ~c1 164 -1 163 -1 ~c1 165 -1 162 -1 ~c1 168 -1 170 -1 ~c1 169 -1 168 -1 ~c1 170 -1 167 -1 ~c2 173 -1 175 -1 2 -1 ~c1 174 -1 173 -1 ~c2 175 -1 172 -1 1 -1 ~c2 178 -1 180 -1 1 -1 ~c1 179 -1 178 -1 ~c2 180 -1 177 -1 2 -1 ~c1 183 -1 186 -1 ~c1 184 -1 183 -1 ~c1 185 -1 184 -1 ~c1 186 -1 182 -1 ~c1 189 -1 192 -1 ~c1 190 -1 189 -1 ~c1 191 -1 190 -1 ~c1 192 -1 188 -1 ~c2 195 -1 199 -1 2 -1 ~c1 196 -1 198 -1 ~c2 197 -1 196 -1 5 -1 ~c3 198 -1 195 -1 1 -1 5 -1 ~c2 199 -1 194 -1 1 -1 ~c2 202 -1 206 -1 4 -1 ~c4 203 -1 205 -1 4 -1 1 -1 5 -1 ~c1 204 -1 203 -1 ~c3 205 -1 202 -1 3 -1 2 -1 ~c2 206 -1 201 -1 3 -1 ~e