作业帮cosα=(2m^2-3)/(3-m) 求m的取值范围
来源:学生作业帮助网 编辑:作业帮 时间:2024/05/13 16:40:54
cosα=(2m^2-3)/(3-m) 求m的取值范围
cosα=(2m^2-3)/(3-m) 求m的取值范围
cosα=(2m^2-3)/(3-m) 求m的取值范围
∵cosα=(2m²-3)/(3-m),且-1≤m≤1,
∴-1≤(2m²-3)/(3-m)≤1.
对于 (2m²-3)/(3-m)≥ -1,
(2m²-3)/(m-3)≤1,
(2m²-3)/(m-3)-1≤0,
(2m²-m)/(m-3)≤0,
m(2m-1)(m-3)≤0,且m≠3,
得m≤0,或1/2≤m3;
∴-2≤m≤0,或1/2≤m≤3/2.
即m的取值范围是-2≤m≤0,或1/2≤m≤3/2.
首先由cosα的有界性得:
cosα=(2m²-3)/(3-m),且-1≤m≤1,
解得:-1≤(2m²-3)/(3-m)≤1.
然后情况一: (2m²-3)/(3-m)≥ -1,
有(2m²-3)/(m-3)≤1,
(2m²-3)/(m-3)-1≤0,
(2m²-m)/(m-3)≤0,
全部展开
首先由cosα的有界性得:
cosα=(2m²-3)/(3-m),且-1≤m≤1,
解得:-1≤(2m²-3)/(3-m)≤1.
然后情况一: (2m²-3)/(3-m)≥ -1,
有(2m²-3)/(m-3)≤1,
(2m²-3)/(m-3)-1≤0,
(2m²-m)/(m-3)≤0,
m(2m-1)(m-3)≤0,且m≠3,
解得m≤0,或1/2≤m<3;
情况二:(2m²-3)/(3-m)≤1
(2m²-3)/(m-3)≥ -1
(2m²-3)/(m-3)+1≥0
(2m²+m-6)/(m-3)≥0
(m+2)(2m-3)(m-3)≥0,且m≠3
解得-2≤m≤3/2,或m>3;
综上所述∴-2≤m≤0,或1/2≤m≤3/2.
收起
cosα=(2m^2-3)/(3-m) 求m的取值范围
若sinθ=m-3/M+5,cosθ=4-2m/M+5,则m=
已知sinα=(m-3)/(m+5) cosα=(4-2m)/(m+5)其中α是第二象限角 则m的取值为
若sinα=(m-3)/m+5,cos=(4-2m)/m+5,π/2<α<π,则m=
已知sinα-√3cosα=(2m-3)/(2-m),求m的取值范围
已知sinθ=(m-3)/(m+5),cosθ=(4-2m)/(m+5)(π/2
已知sin&=m-3/m+5,cos&=4-2m/m+5(pi/2
已知simθ=(m-3)/(m+5),cosθ=(4-2m)/(m+5),其中π/2
若sinа=(m-3)/(m+5),cosа=(4-2m)/(m+5),其中π/2
若sinа=(m-3)/(m+5),cosа=(4-2m)/(m+5),其中π/2
已知sinθ=(m-3)/(m+5),cosθ=(4-2m)/(m+5)(π/2
已知f(x)=tanx+cos(x+m)为奇函数,且m满足m^2-3m-10
已知sinα=m-3/m+5,cosα=4-2m/m+5,若α∈(π/2,π),则tanα/2的值
sinα=m+1/m-3,cosα=m-1/m-3,α为象限角,m=
(m+3m+5m+...+2015m)-(2m+4m+6m+...+2014m)=
m-2m-3m+4m-5m-6m+7m.2004m=?
(m+3m+5m.+2013m)-(2m+4m+6m+.+2012m)=?
若sinθ=(m-3)/(m+5),cosθ=(4-2m)/(m+5),θ∈(π/2,π),则m= ,tanθ =