US just agreed put 13.5B dollars to support Ukraine. How come P was that confident for himself. The decision makers from Kosovo war not die yet . They’ve been through death many times especially volunteered[酷]. They don’t need ,they are ordering lives. United States alone has deployed more than 15,000 troops to Europe, while committing an additional 12,000 to NATO’s response force if necessary. NATO&G7&OECD&QUAD&Indo-pacific etc, Matrix!! Now, advancing integrated deterrence. Is the show finishing? I don’t think so .
Anyway, Zelenskiy tied to make video conference with P which refused. Lol, P would think such bi*ch definitely cry & yall in front everybody [鄙视]. If standing in the neutral, Z is really a bi*ch hahahahaha. That’s why put him there to maneuver . His best card is he doesn’t need face. sometimes we need as*hore to break situation. He is even not qualified for hyena.
Anyway, Zelenskiy tied to make video conference with P which refused. Lol, P would think such bi*ch definitely cry & yall in front everybody [鄙视]. If standing in the neutral, Z is really a bi*ch hahahahaha. That’s why put him there to maneuver . His best card is he doesn’t need face. sometimes we need as*hore to break situation. He is even not qualified for hyena.
Dynamical system xk+1 = Axk
for a 2x2 matrix A which has a pair of complex eigenvalues 入1 = a-bi,
入2 = a+bi,
ifrank A = 1 -> rank (C = P-1AP) = 1
-> I入I = 1
->the trajectory of xk+1 is a an ellipse
.........................................................................
Let A be a real 2 x 2 matrix with a complex eigenvalue 入 = a - bi (b !=0) and
an associated eigenvector v in C2. Then
A = PCP-1 , where P = [ Re v Im v ] and C = [a -b]
[b a]
1 find complex eigenvalue 入 = find the turnning angle
2 find associated eigenvector v = find the column vectors of P ,those vectors
rotate as a whole like a rigid body
(counter-clockwise)
3 for 入 = a + bi (b!=0) , the order of the associated column vectors of P
is clockwise , and these vectors rotate
clockwise during the transformation A,
the absolute angle of rotation = those of 入 = a - bi,
All of these make them equivalent to 入 = a - bi
4 there are countless eigenvectors ,
i [ Re v Im v] = Column vectors of P in a position of -90 degree relative
to P = [Re v Im v]
(cos45 + sin45 i ) [Re v Im v] = column vector of P in a position of -45
degree relative to P = [Re v Im v]
3 [ Re v Imv ] = [3 0] [Re v Im v]
[0 3]
...........................................................
for a 2x2 matrix A which has a pair of complex eigenvalues 入1 = a-bi,
入2 = a+bi,
ifrank A = 1 -> rank (C = P-1AP) = 1
-> I入I = 1
->the trajectory of xk+1 is a an ellipse
.........................................................................
Let A be a real 2 x 2 matrix with a complex eigenvalue 入 = a - bi (b !=0) and
an associated eigenvector v in C2. Then
A = PCP-1 , where P = [ Re v Im v ] and C = [a -b]
[b a]
1 find complex eigenvalue 入 = find the turnning angle
2 find associated eigenvector v = find the column vectors of P ,those vectors
rotate as a whole like a rigid body
(counter-clockwise)
3 for 入 = a + bi (b!=0) , the order of the associated column vectors of P
is clockwise , and these vectors rotate
clockwise during the transformation A,
the absolute angle of rotation = those of 入 = a - bi,
All of these make them equivalent to 入 = a - bi
4 there are countless eigenvectors ,
i [ Re v Im v] = Column vectors of P in a position of -90 degree relative
to P = [Re v Im v]
(cos45 + sin45 i ) [Re v Im v] = column vector of P in a position of -45
degree relative to P = [Re v Im v]
3 [ Re v Imv ] = [3 0] [Re v Im v]
[0 3]
...........................................................
48 Xiǎoshí nèi tígōng dàikuǎn
nǐ hǎo, nǐ hǎo
wǒ yǒuyī bǐ zīběn yòng yú xiàng rènhé zhēnzhèng xīwàng jièkuǎn de rènhé rén tígōng 2000 ōuyuán zhì 25,000,000 ōuyuán de duǎnqí hé tèshū chángqí dàikuǎn. Měinián lìxí 2%, zhè qǔjué yú tèbié bùxiǎng wéifǎn gāolìdài fǎlǜ de dàikuǎn é. Nín kěyǐ zhīfù 3 zhì 25 nián, qǔjué yú dàikuǎn de zuìdà jīn'é. Zhè qǔjué yú nǐ de měi yuè fùkuǎn. Xúnzhǎo dàikuǎn, dàikuǎn (xiāofèi, gēngxīn, shāngyè fángdìchǎn děng) wǒ xūyào tígōng bìyào de róngzī, měinián de jìngzhēng lì wèi 2%, zuìgāo xiéyì zài 48 xiǎoshí nèi yǔ hétóng gōngzhèng yǐ zhèngmíng qǐdòng. Rúguǒ nín yǒu xìngqù, qǐng liúyán nín suǒyǒu de wénjiàn jiāng kě gōng nín jìn háng zhuǎnràng.
Xièxiè nǐ
diànyóu:Toddemmanuel229@gmail.Com
nǐ hǎo, nǐ hǎo
wǒ yǒuyī bǐ zīběn yòng yú xiàng rènhé zhēnzhèng xīwàng jièkuǎn de rènhé rén tígōng 2000 ōuyuán zhì 25,000,000 ōuyuán de duǎnqí hé tèshū chángqí dàikuǎn. Měinián lìxí 2%, zhè qǔjué yú tèbié bùxiǎng wéifǎn gāolìdài fǎlǜ de dàikuǎn é. Nín kěyǐ zhīfù 3 zhì 25 nián, qǔjué yú dàikuǎn de zuìdà jīn'é. Zhè qǔjué yú nǐ de měi yuè fùkuǎn. Xúnzhǎo dàikuǎn, dàikuǎn (xiāofèi, gēngxīn, shāngyè fángdìchǎn děng) wǒ xūyào tígōng bìyào de róngzī, měinián de jìngzhēng lì wèi 2%, zuìgāo xiéyì zài 48 xiǎoshí nèi yǔ hétóng gōngzhèng yǐ zhèngmíng qǐdòng. Rúguǒ nín yǒu xìngqù, qǐng liúyán nín suǒyǒu de wénjiàn jiāng kě gōng nín jìn háng zhuǎnràng.
Xièxiè nǐ
diànyóu:Toddemmanuel229@gmail.Com
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