已知sinα+3cosα=2,则sinα-cosα⼀sinα+cosα

2024-12-23 06:44:02
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回答1:

sinα+3cosα=2,
∵cosα≠0,两边同除以cosα,
∴tanα+3=2/cosα=2secα,
两边平方,
(tanα)^2+6tan+9=4(secα)^2=4(tanα)^2+4,
3(tanα)^2-6tanα-5=0,
令tanα=t,
3t^2-6t-5=0,
t=(3±2√6),
tanα=3±2√6,
(sinα-cosα)/(sinα+cosα)=(tanα-1)/(tanα+1)
=(3±2√6-1)/(3±2√6+1),
则(sinα-cosα)/(sinα+cosα)=(2+2√6)/(4+2√6)=(4-√6)/2
或:=(2-2√6)/(4-2√6)=(2+√6)/2。
=(2±2√6)/(4±2√6).