Объяснение:
1
\begin{gathered}1 - 8 \sin(2 \beta ) \times \cos( 2\beta ) = 1 - 4 \times 2 \sin( 2\beta ) \cos( 2\beta ) = \\ = 1 - 4 \sin( 4\beta ) \end{gathered}
1−8sin(2β)×cos(2β)=1−4×2sin(2β)cos(2β)=
=1−4sin(4β)
2
\begin{gathered}tg \beta (1 + \cos(2 \beta ) - \sin( 2\beta ) = \\ = tg \beta \times (1 + { \cos }^{2} (\beta) - { \sin}^{2}( \beta )) - \sin( 2\beta ) = \\ = tg \beta \times 2 { \cos }^{2} (\beta ) - \sin( 2\beta ) = \\ = 2 \sin( \beta ) \cos( \beta ) - 2 \sin( \beta ) \cos( \beta ) = 0\end{gathered}
tgβ(1+cos(2β)−sin(2β)=
=tgβ×(1+cos
(β)−sin
(β))−sin(2β)=
=tgβ×2cos
(β)−sin(2β)=
=2sin(β)cos(β)−2sin(β)cos(β)=0
3
\begin{gathered} \frac{2 \sin( \beta ) - \sin( 2\beta ) }{ 2\sin( \beta ) + \sin( 2\beta ) } = \\ = \frac{2 \sin( \beta ) - 2 \sin( \beta ) \cos( \beta ) }{ 2\sin( \beta ) + 2 \sin( \beta ) \cos( \beta ) } = \\ = \frac{2 \sin( \beta )(1 - \cos( \beta )) }{ 2\sin( \beta ) (1 + \cos( \beta )) } = \frac{1 - \cos( \beta ) }{1 + \cos( \beta ) } \end{gathered}
2sin(β)+sin(2β)
2sin(β)−sin(2β)
=
2sin(β)+2sin(β)cos(β)
2sin(β)−2sin(β)cos(β)
2sin(β)(1+cos(β))
2sin(β)(1−cos(β))
1+cos(β)
1−cos(β)
4
\begin{gathered} \frac{ctg(45 - \beta )}{1 - {ctg}^{2}(45 - \beta ) } = - \frac{ctg(45 - \beta )}{ {ctg}^{2} (45 - \beta ) - 1} = \\ = - \frac{2ctg(45 - \ \beta )}{2( {ctg}^{2}(45 - \beta ) - 1) } = - \frac{1}{2ctg(45 - \beta )} \end{gathered}
1−ctg
(45−β)
ctg(45−β)
=−
ctg
(45−β)−1
2(ctg
(45−β)−1)
2ctg(45− β)
2ctg(45−β)
1) 3x² = 0 ⇒ х = 0
2) 9x² = 81 ⇒ х² = 9 ⇒ х₁= -3 и х₂ = 3
3) x² - 27 = 0 ⇒ х² = 27 ⇒ х = ⁺₋ √27 ⇒ х = ⁺₋ 3√3
4) 0.01x² = 4 ⇒ х² = 400 ⇒ х₁= -20 и х₂ = 20
2. Решить уравнения
1) x² + 5x = 0
х(х + 5) = 0
х₁ = 0 или х₂ = -5
2) 4x² = 0.16x
4x² - 0.16x = 0
4х (х - 0,04) = 0
х₁ = 0 или х₂ = 0,04
3) 9x² + 1 = 0
9x² = - 1 - НЕТ решения (корень из отрицательного числа НЕ существует)
3. Решить уравнения
1) 4x² - 169 = 0
4x² = 169
х² =
х₁ = -6,5 или х₂ = 6,5
2) 25 - 16x² = 0
16х² = 25
х₁ = -1,25 или х₂ = 1,25
3) 2x² - 16 = 0
2х² = 16
х² = 8
х₁ = -2√2 или х₂ = 2√2
4) 3x² = 15
х² = 5
х₁ = -√5 или х₂ = √5
5) 2x² =
х² =
х₁ = -0,25 или х₂ = 0,25
6) 3x² =
3х² =
х² =
х₁ = -1
Объяснение:
1
\begin{gathered}1 - 8 \sin(2 \beta ) \times \cos( 2\beta ) = 1 - 4 \times 2 \sin( 2\beta ) \cos( 2\beta ) = \\ = 1 - 4 \sin( 4\beta ) \end{gathered}
1−8sin(2β)×cos(2β)=1−4×2sin(2β)cos(2β)=
=1−4sin(4β)
2
\begin{gathered}tg \beta (1 + \cos(2 \beta ) - \sin( 2\beta ) = \\ = tg \beta \times (1 + { \cos }^{2} (\beta) - { \sin}^{2}( \beta )) - \sin( 2\beta ) = \\ = tg \beta \times 2 { \cos }^{2} (\beta ) - \sin( 2\beta ) = \\ = 2 \sin( \beta ) \cos( \beta ) - 2 \sin( \beta ) \cos( \beta ) = 0\end{gathered}
tgβ(1+cos(2β)−sin(2β)=
=tgβ×(1+cos
2
(β)−sin
2
(β))−sin(2β)=
=tgβ×2cos
2
(β)−sin(2β)=
=2sin(β)cos(β)−2sin(β)cos(β)=0
3
\begin{gathered} \frac{2 \sin( \beta ) - \sin( 2\beta ) }{ 2\sin( \beta ) + \sin( 2\beta ) } = \\ = \frac{2 \sin( \beta ) - 2 \sin( \beta ) \cos( \beta ) }{ 2\sin( \beta ) + 2 \sin( \beta ) \cos( \beta ) } = \\ = \frac{2 \sin( \beta )(1 - \cos( \beta )) }{ 2\sin( \beta ) (1 + \cos( \beta )) } = \frac{1 - \cos( \beta ) }{1 + \cos( \beta ) } \end{gathered}
2sin(β)+sin(2β)
2sin(β)−sin(2β)
=
=
2sin(β)+2sin(β)cos(β)
2sin(β)−2sin(β)cos(β)
=
=
2sin(β)(1+cos(β))
2sin(β)(1−cos(β))
=
1+cos(β)
1−cos(β)
4
\begin{gathered} \frac{ctg(45 - \beta )}{1 - {ctg}^{2}(45 - \beta ) } = - \frac{ctg(45 - \beta )}{ {ctg}^{2} (45 - \beta ) - 1} = \\ = - \frac{2ctg(45 - \ \beta )}{2( {ctg}^{2}(45 - \beta ) - 1) } = - \frac{1}{2ctg(45 - \beta )} \end{gathered}
1−ctg
2
(45−β)
ctg(45−β)
=−
ctg
2
(45−β)−1
ctg(45−β)
=
=−
2(ctg
2
(45−β)−1)
2ctg(45− β)
=−
2ctg(45−β)
1