1) -4у + 10 > 2(1 - у) + 24
-4у + 10 > 2 - 2y + 24
-4y + 2y > 2 + 24 - 10
-2y > 16
y < -8
2) 49 - 3(3 - 2z) < 1 - 4z
49 - 9 + 6z < 1 - 4z
6z + 4z < 1 - 49 + 9
10z < - 39
z < - 3,9
3) 7(6 - 5t) - 5 < 1 - 41t
42 - 35t - 5 < 1 - 41t
-35t + 41t < 1 - 42 + 5
6t < -36
t < -6
4) -0,5(8x + 9) - 0,9 > 4x - 3
-4x - 4,5 - 0,9 > 4x - 3
-4x -4x > -3 + 4,5 + 0,9
-8x > 2.4
x < -0.3
3
a)x+y=π/2⇒x=π/2-y
sin²x-sin²y=1⇒sin²(π/2-y)-sin²y=1⇒cos²y-sin²y=1⇒cos2y=1⇒2y=0⇒y=0
x=π/2-0=π/2
b)x-y=π/6⇒x=y+π/6
sinx*cosy=1/2⇒sin(y+π/6)*siny=1/2⇒1/2(sinπ/6+sin(2y+π/6))=
=1/2⇒1/2+sin(2y+π/6)=1⇒sin(2y+π/6)=1/2⇒2y+π/6=π/6⇒2y=0⇒y=0
x=0+π/6=π/6
4
a)sin4x-sinx=0
2sin(3x/2)cos(5x/2)=0
sin(3x/2)=0⇒3x/2=πn⇒x=2πn/3 ⇒x=8π/3∈[3π;5π/2]
cos(5x/2)=0⇒5x/2=π/2+πn⇒x=π/5+2πn/5 ⇒x=11π/5∈[3π;5π/2]
b)2sin(π/2-x)*cos(π/2+x)=√3cosx
2cosx*(-sinx)=√3cosx
√3cosx+2cosxsinx=0
cosx(√3+2sinx)=0
cosx=0⇒x=π/2+πn ⇒x={-3π/2;-π/2}∈[-2π;-π/2]
sinx=-√3/2⇒x=(-1)^n+1*π/3+πn x =-2π/3∈[-2π;-π/2]
А) 3х - ху + 3у + у² = (х-у) (3-у)
б)ах - ау + су - сх - х + у = <span>(х-у) (а-с-1) </span>