1.化简f(a)={[sin(π-α)cos(2π-α)cot(3π+α)]/[cot(-π-α)sin(-π-α)]}
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1.化简f(a)={[sin(π-α)cos(2π-α)cot(3π+α)]/[cot(-π-α)sin(-π-α)]}得:f(a)得值是多少?(过程要详细 注意括号)
解答如下:
f(a)={[sin(π-α)cos(2π-α)cot(3π+α)]/[cot(-π-α)sin(-π-α)]}
={[sinαcosacot(2π+π+α)]/[cot(2π-π-α)sin(2π-π-α)]}
={[sinαcosacot(π+α)]/[cot(π-α)sin(π-α)]}
={-[sinαcosacot(α)]/-[cot(α)sinα]}
={[sinαcosacot(α)]/[cot(α)sinα]}
=cosa
2.已知f(x)=αsin2x+βtanx+1,且f(-2)=-2007,那么f(π-2)的值是多少?(详细过程)
解答如下:
f(-2)=αsin2(-2)+βtan(-2)+1
=-αsin4-βtan(2)+1
f(π-2)=αsin2(π-2)+βtan(π-2)+1
=αsin(2π-4)+βtan(π-2)+1
=-αsin4-βtan(2)+1=-2007;
3.求cos(π/5)+cos(2π/5)+cos(3π/5)+cos(4π/5)的值.(过程越详细越好)
解答如下:
原式=cos(π/5)+cos(3π/5)+cos(2π/5)+cos(4π/5)
=2cos(2π/5)sin(-π/5)+2cos(3π/5)sin(-π/5)
=-2sin(π/5)*[cos(2π/5)+cos(3π/5)]
=-2sin(π/5)*2cos(π/2)sin(-π/10)
=0
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