Объяснение:
y=(4·x-9)^5
((4·x-9)^5)' = 20(4·x-9^)4
Поскольку:
((4·x-9)5)' = 5·(4·x-9)^5-^1((4·x-9))' = 20(4·x-9)^4
(4·x-9)' = 4
20(4·x-9)^4
y=(x2-3x+1)7
((x2-3x+1)7)' = (-7·3x·ln(3)+14·x)(x2-3x+1)6
((x2-3x+1)7)' = 7·(x2-3x+1)7-1((x2-3x+1))' = (-7·3x·ln(3)+14·x)(x2-3x+1)6
(x2-3x+1)' = (x2)' + (-3x)' + (1)' = 2·x + (-3x·ln(3)) = -3x·ln(3)+2·x
(x2)' = 2·x2-1(x)' = 2·x
(x)' = 1
Здесь:
Решение ищем по формуле:
(af(x))' = af(x)*ln(a)*f(x)'
(-3x)' = -3x·ln(3)(x)' = -3x·ln(3)
(-7·3x·ln(3)+14·x)(x2-3x+1)6
y=(sin(x))^3
(sin(x)^3)' = 3·sin(x)^2·cos(x)
(sin(x)^3)' = 3·(sin(x))^3-1((sin(x)))' = 3·sin(x)^2·cos(x)
(sin(x))' = cos(x)
3·sin(x)2·cos(x)
Объяснение:
1) Решениеy=(4·x-9)^5
((4·x-9)^5)' = 20(4·x-9^)4
Поскольку:
((4·x-9)5)' = 5·(4·x-9)^5-^1((4·x-9))' = 20(4·x-9)^4
(4·x-9)' = 4
20(4·x-9)^4
y=(x2-3x+1)7
2) Решение:((x2-3x+1)7)' = (-7·3x·ln(3)+14·x)(x2-3x+1)6
Поскольку:
((x2-3x+1)7)' = 7·(x2-3x+1)7-1((x2-3x+1))' = (-7·3x·ln(3)+14·x)(x2-3x+1)6
(x2-3x+1)' = (x2)' + (-3x)' + (1)' = 2·x + (-3x·ln(3)) = -3x·ln(3)+2·x
(x2)' = 2·x2-1(x)' = 2·x
(x)' = 1
Здесь:
Решение ищем по формуле:
(af(x))' = af(x)*ln(a)*f(x)'
(-3x)' = -3x·ln(3)(x)' = -3x·ln(3)
(x)' = 1
(-7·3x·ln(3)+14·x)(x2-3x+1)6
3) Решение:y=(sin(x))^3
(sin(x)^3)' = 3·sin(x)^2·cos(x)
Поскольку:
(sin(x)^3)' = 3·(sin(x))^3-1((sin(x)))' = 3·sin(x)^2·cos(x)
(sin(x))' = cos(x)
3·sin(x)2·cos(x)
Высота на продолжения BC
AH =AC/2 =5 (<ACH =180 - <ACB = 180° -150°=30° ).
2) CH =√(BC² - BH²) =√(15² -12²) =9 ;
CH ² =AH *BH⇒AH = CH²/BH =81/12 =27/4 .
или BC² =AB*BH;
15² =(12+AH)*12⇒AH = 15²/12 -12 =81/12 =27/4.
3) CH = AC*cos(180° - <ACB) =4*( -cos<ACB) =4*0,8 =3,2.
4) AH= √(AC² -CH²) =√(27² -21,6²) =16,2.
***√(27 -21,6)(27+21,6) =√5,4*48,6 =√9*0,6*0,6*81=3*9*0,6 =16,2***
AC² =AB*AH =AH(AH +HB) ;
27² =16,2(16,2+HB) ⇒HB = 27²/16,2 -16,2² =28,8.
AB = AH +HB =16,2+28,8 =45.
BC = √(AB² -AC)² =√(45² -27²) =√(45 -27)(45 +27) =√(18*72) =√(9*2*2*36) =3*2*6 =36.
BC =36.