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#求解非线性刚度阵1,文献1的公式10h
# [1] Finite-element method for large-amplitude two-dimensional panel flutter at hypersonic speeds.pdf

#w1, s1, w2, s2, ae, x = var('w1, s1, w2, s2, ae, x ')
#本来打算将ae带入到积分中的,但是发现获得多项式太复杂。
#另一方面,ae是和θ相乘的。所以干脆令s1=ae*θ1;s2=ae*θ2

w1, s1, w2, s2, x = var('w1, s1, w2, s2, x ')
ae=1
#形函数
N1=1-3*x*x+2*x*x*x
N2=(x*(1-2*x+x*x))*ae
N3=3*x*x-2*x*x*x
N4=(x*x*x-x*x)*ae
#形函数1阶导数
N1d1=6*x*x-6*x
N2d1=(3*x*x-4*x+1)*ae
N3d1=6*x-6*x*x
N4d1=(3*x*x-2*x)*ae
#形函数2阶导数
N1d2=12*x-6
N2d2=(6*x-4)*ae
N3d2=6-12*x
N4d2=(6*x-2)*ae

f1=N1d1
f2=N2d1
f3=N3d1
f4=N4d1
g=(w1*f1+s1*f2+w2*f3+s2*f4)^2

kk11=g*f1*f1
kk12=g*f1*f2
kk13=g*f1*f3
kk14=g*f1*f4

kk21=g*f2*f1
kk22=g*f2*f2
kk23=g*f2*f3
kk24=g*f2*f4

kk31=g*f3*f1
kk32=g*f3*f2
kk33=g*f3*f3
kk34=g*f3*f4

kk41=g*f4*f1
kk42=g*f4*f2
kk43=g*f4*f3
kk44=g*f4*f4

k11=integral(kk11, x, 0, 1)
k12=integral(kk12, x, 0, 1)
k13=integral(kk13, x, 0, 1)
k14=integral(kk14, x, 0, 1)

k21=integral(kk21, x, 0, 1)
k22=integral(kk22, x, 0, 1)
k23=integral(kk23, x, 0, 1)
k24=integral(kk24, x, 0, 1)

k31=integral(kk31, x, 0, 1)
k32=integral(kk32, x, 0, 1)
k33=integral(kk33, x, 0, 1)
k34=integral(kk34, x, 0, 1)

k41=integral(kk41, x, 0, 1)
k42=integral(kk42, x, 0, 1)
k43=integral(kk43, x, 0, 1)
k44=integral(kk44, x, 0, 1)

print k11;print k12;print k13;print k14
print k21;print k22;print k23;print k24
print k31;print k32;print k33;print k34
print k41;print k42;print k43;print k44

show(k11);show(k12);show(k13);show(k14)
show(k21);show(k22);show(k23);show(k24)
show(k31);show(k32);show(k33);show(k34)
show(k41);show(k42);show(k43);show(k44)

#显示多项式分子部分
temp=420
k11=temp*k11;k12=temp*k12;k13=temp*k13;k14=temp*k14
k21=temp*k21;k22=temp*k22;k23=temp*k23;k24=temp*k24
k31=temp*k31;k32=temp*k32;k33=temp*k33;k34=temp*k34
k41=temp*k41;k42=temp*k42;k43=temp*k43;k44=temp*k44

print k11;print k12;print k13;print k14
print k21;print k22;print k23;print k24
print k31;print k32;print k33;print k34
print k41;print k42;print k43;print k44

show(k11);show(k12);show(k13);show(k14)
show(k21);show(k22);show(k23);show(k24)
show(k31);show(k32);show(k33);show(k34)
show(k41);show(k42);show(k43);show(k44)
18/35*(s1 + s2)*w1 - 18/35*(s1 + s2 + 8*w1)*w2 + 3/35*s1^2 + 3/35*s2^2 + 72/35*w1^2 + 72/35*w2^2 -6/35*(s1 + 3*w1)*w2 - 1/140*s1^2 + 1/70*s1*s2 + 6/35*s1*w1 + 1/140*s2^2 + 9/35*w1^2 + 9/35*w2^2 -18/35*(s1 + s2)*w1 + 18/35*(s1 + s2 + 8*w1)*w2 - 3/35*s1^2 - 3/35*s2^2 - 72/35*w1^2 - 72/35*w2^2 -6/35*(s2 + 3*w1)*w2 + 1/140*s1^2 + 1/70*s1*s2 - 1/140*s2^2 + 6/35*s2*w1 + 9/35*w1^2 + 9/35*w2^2 -6/35*(s1 + 3*w1)*w2 - 1/140*s1^2 + 1/70*s1*s2 + 6/35*s1*w1 + 1/140*s2^2 + 9/35*w1^2 + 9/35*w2^2 -1/70*(s1 - s2)*w1 + 1/70*(s1 - s2 - 12*w1)*w2 + 2/35*s1^2 - 1/70*s1*s2 + 1/210*s2^2 + 3/35*w1^2 + 3/35*w2^2 6/35*(s1 + 3*w1)*w2 + 1/140*s1^2 - 1/70*s1*s2 - 6/35*s1*w1 - 1/140*s2^2 - 9/35*w1^2 - 9/35*w2^2 1/70*(s1 + s2)*w1 - 1/70*(s1 + s2)*w2 - 1/140*s1^2 + 1/105*s1*s2 - 1/140*s2^2 -18/35*(s1 + s2)*w1 + 18/35*(s1 + s2 + 8*w1)*w2 - 3/35*s1^2 - 3/35*s2^2 - 72/35*w1^2 - 72/35*w2^2 6/35*(s1 + 3*w1)*w2 + 1/140*s1^2 - 1/70*s1*s2 - 6/35*s1*w1 - 1/140*s2^2 - 9/35*w1^2 - 9/35*w2^2 18/35*(s1 + s2)*w1 - 18/35*(s1 + s2 + 8*w1)*w2 + 3/35*s1^2 + 3/35*s2^2 + 72/35*w1^2 + 72/35*w2^2 6/35*(s2 + 3*w1)*w2 - 1/140*s1^2 - 1/70*s1*s2 + 1/140*s2^2 - 6/35*s2*w1 - 9/35*w1^2 - 9/35*w2^2 -6/35*(s2 + 3*w1)*w2 + 1/140*s1^2 + 1/70*s1*s2 - 1/140*s2^2 + 6/35*s2*w1 + 9/35*w1^2 + 9/35*w2^2 1/70*(s1 + s2)*w1 - 1/70*(s1 + s2)*w2 - 1/140*s1^2 + 1/105*s1*s2 - 1/140*s2^2 6/35*(s2 + 3*w1)*w2 - 1/140*s1^2 - 1/70*s1*s2 + 1/140*s2^2 - 6/35*s2*w1 - 9/35*w1^2 - 9/35*w2^2 1/70*(s1 - s2)*w1 - 1/70*(s1 - s2 + 12*w1)*w2 + 1/210*s1^2 - 1/70*s1*s2 + 2/35*s2^2 + 3/35*w1^2 + 3/35*w2^2
1835(s1+s2)w11835(s1+s2+8w1)w2+335s12+335s22+7235w12+7235w22\renewcommand{\Bold}[1]{\mathbf{#1}}\frac{18}{35} \, {\left(s_{1} + s_{2}\right)} w_{1} - \frac{18}{35} \, {\left(s_{1} + s_{2} + 8 \, w_{1}\right)} w_{2} + \frac{3}{35} \, s_{1}^{2} + \frac{3}{35} \, s_{2}^{2} + \frac{72}{35} \, w_{1}^{2} + \frac{72}{35} \, w_{2}^{2}
635(s1+3w1)w21140s12+170s1s2+635s1w1+1140s22+935w12+935w22\renewcommand{\Bold}[1]{\mathbf{#1}}-\frac{6}{35} \, {\left(s_{1} + 3 \, w_{1}\right)} w_{2} - \frac{1}{140} \, s_{1}^{2} + \frac{1}{70} \, s_{1} s_{2} + \frac{6}{35} \, s_{1} w_{1} + \frac{1}{140} \, s_{2}^{2} + \frac{9}{35} \, w_{1}^{2} + \frac{9}{35} \, w_{2}^{2}
1835(s1+s2)w1+1835(s1+s2+8w1)w2335s12335s227235w127235w22\renewcommand{\Bold}[1]{\mathbf{#1}}-\frac{18}{35} \, {\left(s_{1} + s_{2}\right)} w_{1} + \frac{18}{35} \, {\left(s_{1} + s_{2} + 8 \, w_{1}\right)} w_{2} - \frac{3}{35} \, s_{1}^{2} - \frac{3}{35} \, s_{2}^{2} - \frac{72}{35} \, w_{1}^{2} - \frac{72}{35} \, w_{2}^{2}
635(s2+3w1)w2+1140s12+170s1s21140s22+635s2w1+935w12+935w22\renewcommand{\Bold}[1]{\mathbf{#1}}-\frac{6}{35} \, {\left(s_{2} + 3 \, w_{1}\right)} w_{2} + \frac{1}{140} \, s_{1}^{2} + \frac{1}{70} \, s_{1} s_{2} - \frac{1}{140} \, s_{2}^{2} + \frac{6}{35} \, s_{2} w_{1} + \frac{9}{35} \, w_{1}^{2} + \frac{9}{35} \, w_{2}^{2}
635(s1+3w1)w21140s12+170s1s2+635s1w1+1140s22+935w12+935w22\renewcommand{\Bold}[1]{\mathbf{#1}}-\frac{6}{35} \, {\left(s_{1} + 3 \, w_{1}\right)} w_{2} - \frac{1}{140} \, s_{1}^{2} + \frac{1}{70} \, s_{1} s_{2} + \frac{6}{35} \, s_{1} w_{1} + \frac{1}{140} \, s_{2}^{2} + \frac{9}{35} \, w_{1}^{2} + \frac{9}{35} \, w_{2}^{2}
170(s1s2)w1+170(s1s212w1)w2+235s12170s1s2+1210s22+335w12+335w22\renewcommand{\Bold}[1]{\mathbf{#1}}-\frac{1}{70} \, {\left(s_{1} - s_{2}\right)} w_{1} + \frac{1}{70} \, {\left(s_{1} - s_{2} - 12 \, w_{1}\right)} w_{2} + \frac{2}{35} \, s_{1}^{2} - \frac{1}{70} \, s_{1} s_{2} + \frac{1}{210} \, s_{2}^{2} + \frac{3}{35} \, w_{1}^{2} + \frac{3}{35} \, w_{2}^{2}
635(s1+3w1)w2+1140s12170s1s2635s1w11140s22935w12935w22\renewcommand{\Bold}[1]{\mathbf{#1}}\frac{6}{35} \, {\left(s_{1} + 3 \, w_{1}\right)} w_{2} + \frac{1}{140} \, s_{1}^{2} - \frac{1}{70} \, s_{1} s_{2} - \frac{6}{35} \, s_{1} w_{1} - \frac{1}{140} \, s_{2}^{2} - \frac{9}{35} \, w_{1}^{2} - \frac{9}{35} \, w_{2}^{2}
170(s1+s2)w1170(s1+s2)w21140s12+1105s1s21140s22\renewcommand{\Bold}[1]{\mathbf{#1}}\frac{1}{70} \, {\left(s_{1} + s_{2}\right)} w_{1} - \frac{1}{70} \, {\left(s_{1} + s_{2}\right)} w_{2} - \frac{1}{140} \, s_{1}^{2} + \frac{1}{105} \, s_{1} s_{2} - \frac{1}{140} \, s_{2}^{2}
1835(s1+s2)w1+1835(s1+s2+8w1)w2335s12335s227235w127235w22\renewcommand{\Bold}[1]{\mathbf{#1}}-\frac{18}{35} \, {\left(s_{1} + s_{2}\right)} w_{1} + \frac{18}{35} \, {\left(s_{1} + s_{2} + 8 \, w_{1}\right)} w_{2} - \frac{3}{35} \, s_{1}^{2} - \frac{3}{35} \, s_{2}^{2} - \frac{72}{35} \, w_{1}^{2} - \frac{72}{35} \, w_{2}^{2}
635(s1+3w1)w2+1140s12170s1s2635s1w11140s22935w12935w22\renewcommand{\Bold}[1]{\mathbf{#1}}\frac{6}{35} \, {\left(s_{1} + 3 \, w_{1}\right)} w_{2} + \frac{1}{140} \, s_{1}^{2} - \frac{1}{70} \, s_{1} s_{2} - \frac{6}{35} \, s_{1} w_{1} - \frac{1}{140} \, s_{2}^{2} - \frac{9}{35} \, w_{1}^{2} - \frac{9}{35} \, w_{2}^{2}
1835(s1+s2)w11835(s1+s2+8w1)w2+335s12+335s22+7235w12+7235w22\renewcommand{\Bold}[1]{\mathbf{#1}}\frac{18}{35} \, {\left(s_{1} + s_{2}\right)} w_{1} - \frac{18}{35} \, {\left(s_{1} + s_{2} + 8 \, w_{1}\right)} w_{2} + \frac{3}{35} \, s_{1}^{2} + \frac{3}{35} \, s_{2}^{2} + \frac{72}{35} \, w_{1}^{2} + \frac{72}{35} \, w_{2}^{2}
635(s2+3w1)w21140s12170s1s2+1140s22635s2w1935w12935w22\renewcommand{\Bold}[1]{\mathbf{#1}}\frac{6}{35} \, {\left(s_{2} + 3 \, w_{1}\right)} w_{2} - \frac{1}{140} \, s_{1}^{2} - \frac{1}{70} \, s_{1} s_{2} + \frac{1}{140} \, s_{2}^{2} - \frac{6}{35} \, s_{2} w_{1} - \frac{9}{35} \, w_{1}^{2} - \frac{9}{35} \, w_{2}^{2}
635(s2+3w1)w2+1140s12+170s1s21140s22+635s2w1+935w12+935w22\renewcommand{\Bold}[1]{\mathbf{#1}}-\frac{6}{35} \, {\left(s_{2} + 3 \, w_{1}\right)} w_{2} + \frac{1}{140} \, s_{1}^{2} + \frac{1}{70} \, s_{1} s_{2} - \frac{1}{140} \, s_{2}^{2} + \frac{6}{35} \, s_{2} w_{1} + \frac{9}{35} \, w_{1}^{2} + \frac{9}{35} \, w_{2}^{2}
170(s1+s2)w1170(s1+s2)w21140s12+1105s1s21140s22\renewcommand{\Bold}[1]{\mathbf{#1}}\frac{1}{70} \, {\left(s_{1} + s_{2}\right)} w_{1} - \frac{1}{70} \, {\left(s_{1} + s_{2}\right)} w_{2} - \frac{1}{140} \, s_{1}^{2} + \frac{1}{105} \, s_{1} s_{2} - \frac{1}{140} \, s_{2}^{2}
635(s2+3w1)w21140s12170s1s2+1140s22635s2w1935w12935w22\renewcommand{\Bold}[1]{\mathbf{#1}}\frac{6}{35} \, {\left(s_{2} + 3 \, w_{1}\right)} w_{2} - \frac{1}{140} \, s_{1}^{2} - \frac{1}{70} \, s_{1} s_{2} + \frac{1}{140} \, s_{2}^{2} - \frac{6}{35} \, s_{2} w_{1} - \frac{9}{35} \, w_{1}^{2} - \frac{9}{35} \, w_{2}^{2}
170(s1s2)w1170(s1s2+12w1)w2+1210s12170s1s2+235s22+335w12+335w22\renewcommand{\Bold}[1]{\mathbf{#1}}\frac{1}{70} \, {\left(s_{1} - s_{2}\right)} w_{1} - \frac{1}{70} \, {\left(s_{1} - s_{2} + 12 \, w_{1}\right)} w_{2} + \frac{1}{210} \, s_{1}^{2} - \frac{1}{70} \, s_{1} s_{2} + \frac{2}{35} \, s_{2}^{2} + \frac{3}{35} \, w_{1}^{2} + \frac{3}{35} \, w_{2}^{2}
216*(s1 + s2)*w1 - 216*(s1 + s2 + 8*w1)*w2 + 36*s1^2 + 36*s2^2 + 864*w1^2 + 864*w2^2 -72*(s1 + 3*w1)*w2 - 3*s1^2 + 6*s1*s2 + 72*s1*w1 + 3*s2^2 + 108*w1^2 + 108*w2^2 -216*(s1 + s2)*w1 + 216*(s1 + s2 + 8*w1)*w2 - 36*s1^2 - 36*s2^2 - 864*w1^2 - 864*w2^2 -72*(s2 + 3*w1)*w2 + 3*s1^2 + 6*s1*s2 - 3*s2^2 + 72*s2*w1 + 108*w1^2 + 108*w2^2 -72*(s1 + 3*w1)*w2 - 3*s1^2 + 6*s1*s2 + 72*s1*w1 + 3*s2^2 + 108*w1^2 + 108*w2^2 -6*(s1 - s2)*w1 + 6*(s1 - s2 - 12*w1)*w2 + 24*s1^2 - 6*s1*s2 + 2*s2^2 + 36*w1^2 + 36*w2^2 72*(s1 + 3*w1)*w2 + 3*s1^2 - 6*s1*s2 - 72*s1*w1 - 3*s2^2 - 108*w1^2 - 108*w2^2 6*(s1 + s2)*w1 - 6*(s1 + s2)*w2 - 3*s1^2 + 4*s1*s2 - 3*s2^2 -216*(s1 + s2)*w1 + 216*(s1 + s2 + 8*w1)*w2 - 36*s1^2 - 36*s2^2 - 864*w1^2 - 864*w2^2 72*(s1 + 3*w1)*w2 + 3*s1^2 - 6*s1*s2 - 72*s1*w1 - 3*s2^2 - 108*w1^2 - 108*w2^2 216*(s1 + s2)*w1 - 216*(s1 + s2 + 8*w1)*w2 + 36*s1^2 + 36*s2^2 + 864*w1^2 + 864*w2^2 72*(s2 + 3*w1)*w2 - 3*s1^2 - 6*s1*s2 + 3*s2^2 - 72*s2*w1 - 108*w1^2 - 108*w2^2 -72*(s2 + 3*w1)*w2 + 3*s1^2 + 6*s1*s2 - 3*s2^2 + 72*s2*w1 + 108*w1^2 + 108*w2^2 6*(s1 + s2)*w1 - 6*(s1 + s2)*w2 - 3*s1^2 + 4*s1*s2 - 3*s2^2 72*(s2 + 3*w1)*w2 - 3*s1^2 - 6*s1*s2 + 3*s2^2 - 72*s2*w1 - 108*w1^2 - 108*w2^2 6*(s1 - s2)*w1 - 6*(s1 - s2 + 12*w1)*w2 + 2*s1^2 - 6*s1*s2 + 24*s2^2 + 36*w1^2 + 36*w2^2
216(s1+s2)w1216(s1+s2+8w1)w2+36s12+36s22+864w12+864w22\renewcommand{\Bold}[1]{\mathbf{#1}}216 \, {\left(s_{1} + s_{2}\right)} w_{1} - 216 \, {\left(s_{1} + s_{2} + 8 \, w_{1}\right)} w_{2} + 36 \, s_{1}^{2} + 36 \, s_{2}^{2} + 864 \, w_{1}^{2} + 864 \, w_{2}^{2}
72(s1+3w1)w23s12+6s1s2+72s1w1+3s22+108w12+108w22\renewcommand{\Bold}[1]{\mathbf{#1}}-72 \, {\left(s_{1} + 3 \, w_{1}\right)} w_{2} - 3 \, s_{1}^{2} + 6 \, s_{1} s_{2} + 72 \, s_{1} w_{1} + 3 \, s_{2}^{2} + 108 \, w_{1}^{2} + 108 \, w_{2}^{2}
216(s1+s2)w1+216(s1+s2+8w1)w236s1236s22864w12864w22\renewcommand{\Bold}[1]{\mathbf{#1}}-216 \, {\left(s_{1} + s_{2}\right)} w_{1} + 216 \, {\left(s_{1} + s_{2} + 8 \, w_{1}\right)} w_{2} - 36 \, s_{1}^{2} - 36 \, s_{2}^{2} - 864 \, w_{1}^{2} - 864 \, w_{2}^{2}
72(s2+3w1)w2+3s12+6s1s23s22+72s2w1+108w12+108w22\renewcommand{\Bold}[1]{\mathbf{#1}}-72 \, {\left(s_{2} + 3 \, w_{1}\right)} w_{2} + 3 \, s_{1}^{2} + 6 \, s_{1} s_{2} - 3 \, s_{2}^{2} + 72 \, s_{2} w_{1} + 108 \, w_{1}^{2} + 108 \, w_{2}^{2}
72(s1+3w1)w23s12+6s1s2+72s1w1+3s22+108w12+108w22\renewcommand{\Bold}[1]{\mathbf{#1}}-72 \, {\left(s_{1} + 3 \, w_{1}\right)} w_{2} - 3 \, s_{1}^{2} + 6 \, s_{1} s_{2} + 72 \, s_{1} w_{1} + 3 \, s_{2}^{2} + 108 \, w_{1}^{2} + 108 \, w_{2}^{2}
6(s1s2)w1+6(s1s212w1)w2+24s126s1s2+2s22+36w12+36w22\renewcommand{\Bold}[1]{\mathbf{#1}}-6 \, {\left(s_{1} - s_{2}\right)} w_{1} + 6 \, {\left(s_{1} - s_{2} - 12 \, w_{1}\right)} w_{2} + 24 \, s_{1}^{2} - 6 \, s_{1} s_{2} + 2 \, s_{2}^{2} + 36 \, w_{1}^{2} + 36 \, w_{2}^{2}
72(s1+3w1)w2+3s126s1s272s1w13s22108w12108w22\renewcommand{\Bold}[1]{\mathbf{#1}}72 \, {\left(s_{1} + 3 \, w_{1}\right)} w_{2} + 3 \, s_{1}^{2} - 6 \, s_{1} s_{2} - 72 \, s_{1} w_{1} - 3 \, s_{2}^{2} - 108 \, w_{1}^{2} - 108 \, w_{2}^{2}
6(s1+s2)w16(s1+s2)w23s12+4s1s23s22\renewcommand{\Bold}[1]{\mathbf{#1}}6 \, {\left(s_{1} + s_{2}\right)} w_{1} - 6 \, {\left(s_{1} + s_{2}\right)} w_{2} - 3 \, s_{1}^{2} + 4 \, s_{1} s_{2} - 3 \, s_{2}^{2}
216(s1+s2)w1+216(s1+s2+8w1)w236s1236s22864w12864w22\renewcommand{\Bold}[1]{\mathbf{#1}}-216 \, {\left(s_{1} + s_{2}\right)} w_{1} + 216 \, {\left(s_{1} + s_{2} + 8 \, w_{1}\right)} w_{2} - 36 \, s_{1}^{2} - 36 \, s_{2}^{2} - 864 \, w_{1}^{2} - 864 \, w_{2}^{2}
72(s1+3w1)w2+3s126s1s272s1w13s22108w12108w22\renewcommand{\Bold}[1]{\mathbf{#1}}72 \, {\left(s_{1} + 3 \, w_{1}\right)} w_{2} + 3 \, s_{1}^{2} - 6 \, s_{1} s_{2} - 72 \, s_{1} w_{1} - 3 \, s_{2}^{2} - 108 \, w_{1}^{2} - 108 \, w_{2}^{2}
216(s1+s2)w1216(s1+s2+8w1)w2+36s12+36s22+864w12+864w22\renewcommand{\Bold}[1]{\mathbf{#1}}216 \, {\left(s_{1} + s_{2}\right)} w_{1} - 216 \, {\left(s_{1} + s_{2} + 8 \, w_{1}\right)} w_{2} + 36 \, s_{1}^{2} + 36 \, s_{2}^{2} + 864 \, w_{1}^{2} + 864 \, w_{2}^{2}
72(s2+3w1)w23s126s1s2+3s2272s2w1108w12108w22\renewcommand{\Bold}[1]{\mathbf{#1}}72 \, {\left(s_{2} + 3 \, w_{1}\right)} w_{2} - 3 \, s_{1}^{2} - 6 \, s_{1} s_{2} + 3 \, s_{2}^{2} - 72 \, s_{2} w_{1} - 108 \, w_{1}^{2} - 108 \, w_{2}^{2}
72(s2+3w1)w2+3s12+6s1s23s22+72s2w1+108w12+108w22\renewcommand{\Bold}[1]{\mathbf{#1}}-72 \, {\left(s_{2} + 3 \, w_{1}\right)} w_{2} + 3 \, s_{1}^{2} + 6 \, s_{1} s_{2} - 3 \, s_{2}^{2} + 72 \, s_{2} w_{1} + 108 \, w_{1}^{2} + 108 \, w_{2}^{2}
6(s1+s2)w16(s1+s2)w23s12+4s1s23s22\renewcommand{\Bold}[1]{\mathbf{#1}}6 \, {\left(s_{1} + s_{2}\right)} w_{1} - 6 \, {\left(s_{1} + s_{2}\right)} w_{2} - 3 \, s_{1}^{2} + 4 \, s_{1} s_{2} - 3 \, s_{2}^{2}
72(s2+3w1)w23s126s1s2+3s2272s2w1108w12108w22\renewcommand{\Bold}[1]{\mathbf{#1}}72 \, {\left(s_{2} + 3 \, w_{1}\right)} w_{2} - 3 \, s_{1}^{2} - 6 \, s_{1} s_{2} + 3 \, s_{2}^{2} - 72 \, s_{2} w_{1} - 108 \, w_{1}^{2} - 108 \, w_{2}^{2}
6(s1s2)w16(s1s2+12w1)w2+2s126s1s2+24s22+36w12+36w22\renewcommand{\Bold}[1]{\mathbf{#1}}6 \, {\left(s_{1} - s_{2}\right)} w_{1} - 6 \, {\left(s_{1} - s_{2} + 12 \, w_{1}\right)} w_{2} + 2 \, s_{1}^{2} - 6 \, s_{1} s_{2} + 24 \, s_{2}^{2} + 36 \, w_{1}^{2} + 36 \, w_{2}^{2}