f'(x) = sinx + 0,5 * sin2x = sin x + sin x * cos x = sin x * (1 + cos x) = 0
Y = x*e^(x^2)
y'= (x*e^x^2)' = (x)' * e^x^2 + x * (e^x^2)' = e^x^2 + x * e^x^2 * (x^2)' = (1 + 2x^2)e^x^2
y'(-1) = (1 + 2) * e^1 = 3e
-5х²+9х-4=-5(х-4/5)(х-1)=(4-5х)(х-1)
-5х²+9х-4=0
D=81-80=1
х₁=4/5 х₂=1
49 - 9n² + 6mn - m² = 49 - (9n² - 6mn + m²) = 49 - (3n - m) ² =
= 7² - (3n - m)² = (7 - 3n + m)(7 + 3n - m)