= 44y/2/-(9x/2/-6xy+y/2/) = 44y/2/-9x/2/+6xy-y/2/=43y/2/-9x/2/+6xy
(5)ˇ2. xˇ(-8)/xˇ(-9).2.xˇ(6)=
=(5)ˇ2 .xˇ(-8)/2.xˇ(-9+6)=25.xˇ(-8)/2.xˇ(-3)=
=25.xˇ(-8).xˇ3/2=12,5.xˇ(-8+3)=12,5.xˇ(-5=12,5/(xˇ5)
<h3>sin4x + sin2x = 0</h3>
sin2x = 2•sinx•cosx - синус двойного аргумента
<h3>2•sin2x•cos2x + sin2x = 0</h3><h3>sin2x•(2cos2x + 1) = 0</h3><h3>1) sin2x = 0 ⇔ 2x = πn ⇔ x = πn/2, n ∈ Z</h3><h3>2) 2cos2x + 1 = 0 ⇔ cos2x = - 1/2 ⇔ 2x = (± 2π/3) + 2πk ⇔ x = (± π/3) + πk, k ∈ Z</h3><h3><em><u>ОТВЕТ: πn/2, n ∈ Z ; (± π/3) + πk, k ∈ Z</u></em></h3><h3><em><u /></em></h3>