X = Y + 25
Y * ( Y + 25 ) = 396
Y^2 + 25Y - 396 = 0
D = 625 + 1584 = 2209 ; √ D = 47
Y1 = ( - 25 + 47 ) : 2 = 11
Y2 = ( - 25 - 47 ) : 2 = - 36
X1 = 11 + 25 = 36
X2 = - 36 + 25 = - 11
Во вложении скриншот расчетов и сами расчеты в экселе - пользуйтесь
√2(sin2x•cosπ/4+cos2x•sinπ/4)+
√3cosx=sin2x-1
sin2x+cos2x+√3cosx=sin2x-1
cos2x+√3cosx+1=0
2cos²x+√3cosx=0
cosx(2cosx+√3)=0
1)cosx=0
x=π/2+πk
2)2cosx=-√3
cosx=-√3/2
x=±(π-√6)+2πk
x=±5π/6+2πk;k€Z
А) ах^2-ау^2=а(х^2-у^2)=а(х-у)(х+у);
б) х^2+10х+25=(х+5)^2=(х+5)(х+5);
<span>Решение
</span>ctgx+cos(pi/2+2x)=0
<span>ctgx-sin2x=0
cosx/sinx - 2sinxcosx = 0 * (sinx </span>≠ 0, x ≠ πk, k ∈ Z)
cosx - 2sin²xcosx = 0
cosx(1 - 2sin²x) = 0
1) cosx = 0
x = π/2 + πn, n ∈ Z
2) 1 - 2sin<span>²x = 0
</span> 2sin<span>²x = 1
</span>sin²x = 1/2
sinx = - √2/2
x = (-1)^(n)(5π/4) + πn, n ∈ Z
sinx = √2/2
x = (-1)^(n)(π/4) + πn, n ∈ Z
Ответ: x = π/2 + πn, n ∈ Z; x = (-1)^(n)* (5π/4) + πn, n ∈ Z;
<span>x = (-1)^(n)* (π/4) + πn, n ∈ Z</span>
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