sinx+cosx=cos2x,x∈[-π,π]求解三角方程
1个回答
展开全部
因为 sinx + cosx = cos2x = (cosx))^2 - (sinx))^2 = (cosx - sinx )(cosx + sinx )
(1) 当 sinx + cosx =( 根2)sin(x + π/4)= 0 时,方程有意义,恒成立
此时 x + π/4 = kπ + π/2 ,k∈Z,因为 x∈[-π,π] ,所以 x = π/4 ,或 x = - 3π/4
(2)当sinx + cosx不等于 0 时 ,
sinx + cosx = cos2x = (cosx))^2 - (sinx))^2 = (cosx - sinx )(cosx + sinx ) 可化简为
1 = cosx - sinx = -( 根2)sin(x - π/4) 即 sin(x - π/4)= - ( 根2)/2
所以 x - π/4 = 2 kπ - π/4 或 x - π/4 = 2 kπ - 3π/4 ,(k∈Z)
又因为 x∈[-π,π] 所以 x = - π/4 或 x = - 3π/4
综上 方程sinx+cosx=cos2x,x∈[-π,π]的解为{ x | x = π/4 或 x = - π/4 或 x = - 3π/4}
(1) 当 sinx + cosx =( 根2)sin(x + π/4)= 0 时,方程有意义,恒成立
此时 x + π/4 = kπ + π/2 ,k∈Z,因为 x∈[-π,π] ,所以 x = π/4 ,或 x = - 3π/4
(2)当sinx + cosx不等于 0 时 ,
sinx + cosx = cos2x = (cosx))^2 - (sinx))^2 = (cosx - sinx )(cosx + sinx ) 可化简为
1 = cosx - sinx = -( 根2)sin(x - π/4) 即 sin(x - π/4)= - ( 根2)/2
所以 x - π/4 = 2 kπ - π/4 或 x - π/4 = 2 kπ - 3π/4 ,(k∈Z)
又因为 x∈[-π,π] 所以 x = - π/4 或 x = - 3π/4
综上 方程sinx+cosx=cos2x,x∈[-π,π]的解为{ x | x = π/4 或 x = - π/4 或 x = - 3π/4}
已赞过
已踩过<
评论
收起
你对这个回答的评价是?
推荐律师服务:
若未解决您的问题,请您详细描述您的问题,通过百度律临进行免费专业咨询
