Объяснение:
1) f(x)=2e^x+3x² f'(x)=2e^x+6x
2) f(x)= x sinx. f'(x)= sinx+xcosx
3) у = (3х – 1)(2 – х) y'=3(2 – х)+(3х – 1)×(-1)=6-3x-3x+1=-6x+7
4) y=9x²-cosx y'= 18x+sinx
5) y=e^x-x^7 y'= e^x-7x^6
7) f '(1), f(x)=3x2-2x+1. f'(x)=6x-2; f'(1)=6-2=4
8) у = х²(3х^5 – 2) ; х0 = – 1. у' =(3x^7-2x²)'=21x^6-4x
y'(-1)=21+4=25
9) f '( ), f(x)=(2x-1)cosx=2cosx-(2x-1)sinx
10) f '(1), f(x)=(3-x²)(x²+6)= -2x(x²+6)+2x(3-x²) = -4x³ -6x
11) f '(1), f(x)=(x^4-3)(x²+2), f'(x)=3x³ (x²+2)+2x(x^4-3)=5x^5+6x³-6x
1. u = 7-2v
(7-2v)^2 + 4v - 13 =0
49 - 28v + 4v^2 + 4v - 13 = 0
4v^2 - 24v + 36 = 0 (:4)
v^2 - 6v + 9 = 0
(v - 3)^2 = 0
v =3
u = 7 - 2*3 = 7-6=1
ответ : v=3, u=1
2. z = -3+y^2
y^2 + 3*(y^2-3)-7=0
y^2 +3y^2 - 9-7 = 0
4y^2 - 16 = 0
4*(y^2-4)=0
y = 2 y=-2
z = 4-3=1 z = 4-3=0
ответ : y = 2, z=1; y=-2, z=1
3. m = 7+2n
(7+2n)^2 +5n + 14 = 0
49 + 28n + 4n^2 + 5n + 14 = 0
4n^2 + 33n + 65 = 0
D = 1089 - 1040 = 49
n1 = -33+7/8 = -26/8 = -3,25
n2= -33-7/8 = -40/8 = -5
m1 = 7 - 2 * 26/8 = 7-6,5 = 0,5
m2 = 7 - 2*5 = 7-10 = -3
ответ : n=-3,25,m=0,5 ; n=-5, m=-3
4. 2k = 7+2t^2
k = 7+2t^2/2
3*(7+2t^2/2) + 5t - 20 = 0
6t^2 + 10t - 19 = 0
D = 784
t1 = 1,5
t2 = -19/6
k1 = 5,75
k2 = 13 19/36
