①(2cosα+3sinα)/(3cosα+sinα) (2+3tanα)/(3+tanα)2(sinα)^2+sinαcosα-3(cosα)^2②tanα√((1/((sinα)^2))-1)第二个可以看图:
网友回答
(2cosα+3sinα)/(3cosα+sinα) 分子分母同时除以cosa就可得到答案
2(sinα)^2+sinαcosα-3(cosα)^2
因为sinαcosα=1/2 sin2a
2(sinα)^2= - (1-2(sina)^2)+1= - cos2a+1
-3(cosα)^2=-3/2(2(cosα)^2-1)-3/2=-3/2 cos2a-3/2
所以原式=1/2 sin 2a-5/2 cos 2a-1/2=√26/2sin(2a-b) (tanb=5)
tanα√((1/((sinα)^2))-1)
根号内:通分得
(1-(sina)^2)/(sina)^2,因为1=(sina)^2+(cosa)^2
所以得(cosa)^2/(sina)^2
带上根号得[cota]
所以原式=1或-1
======以下答案可供参考======
供参考答案1:
(1)(2cosα+3sinα)/(3cosα+sinα)
=(2cosα/cosα+3sinα/cosα)/(3cosα/cosα+sinα/cosα)
=(2+3tanα)/(3+tanα)
2(sinα)^2+sinαcosα-3(cosα)^2
=(2sinα+3cosα)(sinα-cosα)
(2)tanα√((1/((sinα)^2))-1)
=tanα√[(1-(sinα)^2)/(sinα)^2]
=tanα√[(cosα)^2/(sinα)^2]
=tanα*|cotα|
=1或-1供参考答案2:
①(2cosα+3sinα)/(3cosα+sinα)
分子分母同除以cosα,结果就是答案了。
2(sinα)^2+sinαcosα-3(cosα)^2
=1/2sin2α+2-5(cosα)^2
∵2(cosα)^2-1=cos2α
∴1/2sin2α+2-5(cosα)^2=1/2sin2α-5/2cos2α-1/2=1/2(sin2α-5cos2α-1)
②tanα√((1/((sinα)^2))-1)