求证tanx+1/tan[(π/4)+X/2]=1/COSX

来源:学生作业帮助网 编辑:作业帮 时间:2024/07/17 03:32:06
求证tanx+1/tan[(π/4)+X/2]=1/COSX
xSMJ@A&0AP0pSjqM EUQZTڅ RB*b A:iI&It&3y/oތV<8=|`賍5MBn:8K[Ϙ1$u4\A C^hڹ> _O#&^&5[>0$ TvN(r|B66@U$YSJb 6ke\!Th^YLg.NtU[U9zuYgΞ(«}9F IX :%*cL\.^ ttG'~`K"2%MbHMĉzwHj4ZEP]0eb~

求证tanx+1/tan[(π/4)+X/2]=1/COSX
求证tanx+1/tan[(π/4)+X/2]=1/COSX

求证tanx+1/tan[(π/4)+X/2]=1/COSX
tan[(π/4)+X/2]= (tanπ/4+tan X/2)/(1- tanπ/4*tan X/2)
=(1+ tan X/2)/(1- tan X/2)
分子分母同乘以cosx/2可得
=(cosx/2+sinx/2)/( cosx/2-sinx/2)
=[(cosx/2+sinx/2) (cosx/2-sinx/2)]/( cosx/2-sinx/2) ²
=(cos²x/2-sin²x/2) /( cosx/2-sinx/2) ²
=cosx/(1-sinx),
所以1/tan[(π/4)+X/2]= (1-sinx)/cosx,
tanx+1/tan[(π/4)+X/2]= tanx+(1-sinx)/cosx
=sinx/cosx+(1-sinx)/cosx=1/cosx,
∴等式成立.

tanx+1/tan[(π/4)+x/2]\
= tanx +1/[(tanπ/4+tanx/2)/(1-tanπ/4tanx/2)]
= tanx + 1/[(1+tanx/2)/(1-tanx/2)]
=tanx + (1-tanx/2)/(1+tanx/2)
= 2tanx/2/(1-tanx/2) + (1-tanx/2)/(1+tanx/2)
=...

全部展开

tanx+1/tan[(π/4)+x/2]\
= tanx +1/[(tanπ/4+tanx/2)/(1-tanπ/4tanx/2)]
= tanx + 1/[(1+tanx/2)/(1-tanx/2)]
=tanx + (1-tanx/2)/(1+tanx/2)
= 2tanx/2/(1-tanx/2) + (1-tanx/2)/(1+tanx/2)
= [2tanx/2(1+tanx/2) + (1-tanx/2)^2]/ ( 1-(tanx/2)^2)
=[(tanx/2)^2+1] /( 1-(tanx/2)^2)
= (secx/2)^2 (cosx/2)^2/[(cosx/2)^2 - (sinx/2)^2]
= 1/[(cosx/2)^2 - (sinx/2)^2]
= 1/cosx

收起

求证:secx - tanx = tan(π/4 - x/2) 求证tanx+1/tan[(π/4)+X/2]=1/COSX 求证:tan(x/2+π/4)+tan(x/2-π/4)=2tanx 证明:tan(x+圆周率/4)=1+tanx/1-tanx tan(x+pai/4)=1+tanx/1-tanx tan(x+π/4)=-1/7求tanx 已知tan(π/4+x)=1/2,求tanx 如果(1-tanx)/(1+tanx)=4+√5 则tan(π/4+x)=? 已知tanx-(1/tanx)=-4,求tan(π/4-2x), tan(π/4-x) 化简rt 答案为(1-tanx)/(1+tanx)求过程. tan(π/4 - x)为什么等于(1-tanx)/(1+tanx)? 化简tanx+tan(45-x)(1+tanx) 求证:tan(x/2+派/4)+tan(x/2-派/4)=2tanx 求证:tan(x/2+派/4)+tan(x/2-派/4)=2tanx{[tan(x/2)+1]^2-[1-tan(x/2)]^2}=4tan(x/2)具体怎么得到 tan x /(1-cot x) + cot x /(1-tanx) = 1+ sec x csc x求证! y=(1+tanx)/(1-tanx)化简方法=(1+tanx)/(1-tanx) =(tanπ/4+tanx)/(1-tanπ/4tanx) =tan(π/4+x).y=(1+tanx)/(1-tanx)的最小正周期是(π) 这个过程看不懂 关于一道三角恒等变换的题求证:tan(x/2+π/4)+tan(x/2-π/4)=2tanx 证明sec x+tanx=tan(π/4 +x/2)