Ответ:
x={π/4+kπ; arctg(1/4)+kπ}, k∈Z
Объяснение:
2sin²x-5sinxcosx=cos²x-2
2sin²x-5sinxcosx=cos²x-2(cos²x+sin²x)
2sin²x-5sinxcosx=cos²x-2cos²x-2sin²x
4sin²x-5sinxcosx+cos²x=0
(4sin²x-5sinxcosx+cos²x)/cos²x=0
4tg²x-5tgx+1=0
tgx=y
4y²-5y+1=0
4y²-4y-y+1=0
4y(y-1)-(y-1)=0
(y-1)(4y-1)=0
1) y-1=0
y=1
tgx=1
x=π/4+kπ, k∈Z
2) 4y-1=0
y=1/4
tgx=1/4
x=arctg(1/4)+kπ, k∈Z
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Answers & Comments
Ответ:
x={π/4+kπ; arctg(1/4)+kπ}, k∈Z
Объяснение:
2sin²x-5sinxcosx=cos²x-2
2sin²x-5sinxcosx=cos²x-2(cos²x+sin²x)
2sin²x-5sinxcosx=cos²x-2cos²x-2sin²x
4sin²x-5sinxcosx+cos²x=0
(4sin²x-5sinxcosx+cos²x)/cos²x=0
4tg²x-5tgx+1=0
tgx=y
4y²-5y+1=0
4y²-4y-y+1=0
4y(y-1)-(y-1)=0
(y-1)(4y-1)=0
1) y-1=0
y=1
tgx=1
x=π/4+kπ, k∈Z
2) 4y-1=0
y=1/4
tgx=1/4
x=arctg(1/4)+kπ, k∈Z