在△ABC中内角A=3 pai

利用正弦定理：AC/sinx=BC/sinA故,AC＝BC*sinx/sinAAC＝2根号3*sinx/根号3/2＝4sinxAB＝BC*sin[180-(∏/3+x)]/sinAAB＝2根号3*si

a=150度tana=（-根号3）/3

（1）利用正弦定理a/sinA=b/sinB=c/sinC∴√3/sin(π/3)=b/sinx=c/sin(2π/3-x)即2=b/sinx=c/sin(2π/3-x)∴b=2sinx,c=2sin

根据正弦定理,b/sinB=a/sinA,a=2√3,A=π/3,B=x,b=4sinx,c/sinC=a/sinA,c=2√3/(√3/2)*sinC=4sinC=4sin(A+B)=4sin(π/

1)AC=BC*sinx/sinA=4sinxAB=BC*sin(120°-x)/sinA=4sin(120°-x)y=2√3+4[sinx+sin(120°-x)]=2√3+4√3[√3/2*sin

1、tan(A-B)=(tanA-tanB)/(1+tanAtanB),tanA-tanB=tan(A-B)*(1+tanAtanB),tanA-tanB=(√3/3)*(1+tanAtanB),ta

1.根据正弦定理：b/sinB=c/sinC∵B=C∴b=c∵2b=√3a∴a=2b/√3余弦定理：cosA=(b^2+c^2-a^2)/2bc=[b^2+b^2-(2b/√3)^2]/2b*b=1/

(1).∵a,b,c成等比数列,∴b²=ac∵b²=a²+c²-2accosB∴ac=a²+c²-3ac/2即a=2c或者c=2a不妨设a=

因为cosB=3/4,0

△ABC中，∵b2=ac，a+c=3，cosB=34，∴b2=a2+c2-2ac•cosB=（a+c）2-72ac=9-72b2，∴b2=2．则AB•BC=ca•cos（π-B）=b2 （-

利用正弦定理BC/sinA=AC/sinB=AB/sinCBC/sinA=4=AC/sinx=AB/sin(2/3π-x)f(x)=AB+BC+AC=2根号3+4sinx+4sin(2/3π-x)定义

RtΔABC,C为直角.sinC=1

由于正弦定理.BC/SINA=AB/SINC=AC/SINB所以,AC/SINB=AB/SINC=4,AC=4SINX,AB=4SIN(pai-pai/3-x)即AB=4SIN(2pai/3-x)所以

1.S三角形面积=1/2*sinC*ab=√3,ab=4,cosC=(a^2+b^2-c^2)/2ab=1/2.a^2+b^2=8,(a+b)^2=16,a+b=4,ab=4,a=2,b=2.2.si

角A=60度角B=X角C=180-60-X=120-XSIN角A:BC=SIN角B:AC=SIN角C:AB=根号3/2:2根号3=1:4AC=4*SINXAB=SIN(120-X)*4Y=2根号3+4

设∠A=2x则∠B=3x∠C=2x+402x+3x+2x+40=1807x=140x=20∠A=40∠B=60∠C=80（x+y）²=4（x-y）²=6两式相加x²+2x

2√3/sin60°=AC/sinxAC=（2√3/sin60°）sinx2√3/sin60°=AB/sin（180°-60°x）AB=（2√3/sin60°）sin（180°-60°-x）AB=（2

思路是sinB是正的所以可以求出cosB2A+C=A+(A+C)=A+(π-B)cos（2A+C）=cosAcos（A+C）-sinAsin(A+C)代入计算一下就好了用一下这个公式(sinA)^2+

sinC=sin(A+B)=sinAcosB+sinBcosA=2cosAsinB+sinBcosA=3cosAsinB∴cosA=sinC/3sinB=c/3b(正弦定理)余弦定理cosA=(c&s