求值:tan(2π-a)cos(3/2π-a)cos(6π-a)/sin(a+3/2π)cos(a+3/2π)
求值:tan(2π-a)cos(3/2π-a)cos(6π-a)/sin(a+3/2π)cos(a+3/2π)
数学人气:157 ℃时间:2020-04-30 19:37:03
优质解答
tan(2π-a)cos(3/2π-a)cos(6π-a)/sin(a+3/2π)cos(a+3/2π)=tanacos(-1/2π-a)cos(-a)/sin(a-1/2π)cos(a-1/2π)=-tanacos(1/2π+a)cosa/sin(1/2π-a)cos(1/2π-a)=-tanasinacosa/cosasin...
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