1) ∫x²dx = x³/3 + C
1 = 2³/3 + C
C = 1 - 8/3 = - 5/3
2) ∫40dx = = 40x + C
2 = 40×5 + C
C = 2 - 200 = -198
3) ∫sin(x)dx = - cos(x) + C
-1 = -cos(π) + C
C = cos(π) - 1 = -1 - 1 = -2
(1/5с+1/10с) •с^2/6=(2/10с+1/10с)•с^2/6=3/10с•с^2/6=1/10с • с^2/2=1/10•с/2=с/20
2*!3/2-!3/2:1/2=!3-!3=0
!-корень
F '(x) >0;
4x^3 - 8x >0;
4x(x^2 - 2) >0;
4x(x-sgrt2)(x + sgrt 2) >0;
x∈(0; -sgrt2; 0) U(sgrt2; + бесконечность)
5х-12х-42=13-х-1
5х-12х+х=13-1+42
-6х=54
х=-9