<span>у= (5х+3)/√(11х-х^2-10)
</span><span>11х - х^2 - 10 > 0
</span>x^2 - 11x + 10 < 0<span>
x^2 - 11x + 10 = 0
x1 = 1
x2 = 10
+ - +
------------------------------------------------------------------>
1 10 x
x </span>∈ (1;10)<span>
</span>
1)
1) √12 = 2√3
2) 2√3( 2√3 + 3√5 ) = 4*3 + 6√15 = 12 + 6√15
3) √ 20 = 2√5
4) √5*( 6√3 - 2√5 ) = 6√15 - 2*5 = 6√15 - 10
5) 12 + 6√15 - ( 6√15 - 10 ) = 12 + 6√15 - 6√15 + 10 = 22
Ответ 22
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2)
1) √ 24 = 2√6
2) √ 99 = 3√11
3) √6( 0,5*2√6 - 8√11 ) = 6 - 8√66
4) 4√11( 3√11 - 2√6 ) = 12*11 - 8√66 = 132 - 8√66
5) 6 - 8√66 - ( 132 - 8√66 ) = 6 - 8√66 - 132 + 8√66 = - 126
Ответ ( - 126 )
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3)
1) √162 = √( 36*4,5 ) = 6√4,5
2) √2( 6√4,5 - 10√5 ) = 6√9 - 10√10 = 18 - 10√10
3) ( 5 + √10 )² = 25 + 10√10 + 10 = 35 + 10√10
4) 18 - 10√10 + 35 + 10<span>√10 = 53
Ответ 53
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4)
1) ( 17 - </span>√21 )² = 289 - 34√21 + 21 = 310 - 34√21
2) 4√27 = 12√3
3) 5√3( 12√3 - 6,8√7 ) = 180 - 34√21
4) 310 - 34√21 - ( 180 - 34<span>√21 ) = 310 - 34</span>√21 - 180 + 34√21 = 130
Ответ 130
Решение
<span>sin α = -4/5 и α ∈(3/2π;2π)
</span>sin²(α/2) = (1 - cosα)/2
cosα = √(1 - sin²α) = √(1 - (-4/5)²) = √9/25 = 3/5
sin²(α/2) = (1 - 3/5)/2
<span>sin²(α/2) = (2/5) : 2
</span><span>sin²(α/2) = 1/5
</span>sin(α/2) = √(1/5); sin(α/2) = √5/5
sin(α/2) = - √(1/5); <span>sin(α/2) = - </span>√5/5
1)сложим два уравнения
3x+5x=13
2)выразим из 1-ого x и подставим во 2-ое