1)F'(x) = Cosx + 2Cos2xSin2x= Cosx + Sin4x
F'(0) = Cos0 + Sin0 = 1
2) F'(x) = -5*1/(2√x *√1 - x²)
F'(1/2) = -5*1/2√0,5*(1 - 0,25)= -5*1/(2√0,375)
3) F'(x) = e^Sinx * Cosx
F'(0) = e^0 * 1 = 1
1+tg²x=1/cos²x
tgx=+-√(1-cos²x)/cosx
sinx=+-√(1-cos²x)
1)x/y²-1/x=(x²-y²)/xy²
2)1/y+1/x=(x+y)/xy
3)(x²-y²)/xy² : (x+y)/xy=(x-y)(x+y)/xy² *xy/(x+y)=(x-y)/y
2х=arctg(-0,2)+пn, n принадлежит Z
x=arctg(-0,2) / 2+ пn/2, n принадлежит Z