已知A,B,C是三角形ABC三个内角,向量m =(-1,根号3),向量n =( cosA, sin A),且向量m 乘以向量 n=1,求角A.
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(-1,根号3)*( cosA, sin A)=-cosA+√3sinA=1
-cosA+√3sinA
=2sin(A-30°)=1
只有A-30°=30°
A=60°
题目少打了吗?
若(1+sin2B)/(cos^2B-sin^2B)=-3,求tanB,tanC.
(1+sin2B)/(cos^2B-sin^2B)=-3
(cos^2B+sin^2B+2sinBcosB)/(cos^2B-sin^2B)=-3
(cosB+sinB)^2/(cosB-sinB)(cosB+sinB)=-3
(cosB+sinB)/(cosB-sinB)=-3
(1+tanB)/(tanB-1)=-3
tanB=1/2
tanC=-tan(A+B)=-3√3-5
若果题目没错,再重新做
-cosA+√3sinA
=2sin(A-30°)=1
只有A-30°=30°
A=60°
题目少打了吗?
若(1+sin2B)/(cos^2B-sin^2B)=-3,求tanB,tanC.
(1+sin2B)/(cos^2B-sin^2B)=-3
(cos^2B+sin^2B+2sinBcosB)/(cos^2B-sin^2B)=-3
(cosB+sinB)^2/(cosB-sinB)(cosB+sinB)=-3
(cosB+sinB)/(cosB-sinB)=-3
(1+tanB)/(tanB-1)=-3
tanB=1/2
tanC=-tan(A+B)=-3√3-5
若果题目没错,再重新做
追问
题目没错!请教
追答
(cos^B-sin^B)不是(cos^2B-sin^2B)吗?
那太麻烦了,对不起啊
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m.n=1
(-1,√3).( cosA, sin A)=1
-cosA+√3sin A =1
(√3sin A)^2 = (1+cosA)^2
2(cosA)^2 + cosA -1 =0
(2cosA-1)(cosA+1)=0
cosA = 1/2 or -1 (rejected)
A = π/3
(1+sin2B)/(cos^B-sin^B)=-3
(1+ sin2B) /cos2B = -3
sec2B+ tan2B = -3
(3+tan2B)^2 = (sec2B)^2
6tan2B+ 9 = 1
tan2B = -4/3
2tanB/(1-(tanB)^2 ) = -4/3
-4+4(tanB)^2 = 6tanB
2(tanB)^2 -3tanB-2 =0
(2tanB+1)(tanB-2) =0
tanB = 2 or -1/2 (rejected)
ie tanB = 2
tanC
= tan(π-A-B)
= tan(2π/3-B)
= (tan2π/3 - tanB)/(1+tanBtan2π/3)
=(-√3-2)/(1-2√3)
= ( √3+2)(2√3+1)/ [(2√3-1)(2√3+1)]
= (8+5√3)/5
(-1,√3).( cosA, sin A)=1
-cosA+√3sin A =1
(√3sin A)^2 = (1+cosA)^2
2(cosA)^2 + cosA -1 =0
(2cosA-1)(cosA+1)=0
cosA = 1/2 or -1 (rejected)
A = π/3
(1+sin2B)/(cos^B-sin^B)=-3
(1+ sin2B) /cos2B = -3
sec2B+ tan2B = -3
(3+tan2B)^2 = (sec2B)^2
6tan2B+ 9 = 1
tan2B = -4/3
2tanB/(1-(tanB)^2 ) = -4/3
-4+4(tanB)^2 = 6tanB
2(tanB)^2 -3tanB-2 =0
(2tanB+1)(tanB-2) =0
tanB = 2 or -1/2 (rejected)
ie tanB = 2
tanC
= tan(π-A-B)
= tan(2π/3-B)
= (tan2π/3 - tanB)/(1+tanBtan2π/3)
=(-√3-2)/(1-2√3)
= ( √3+2)(2√3+1)/ [(2√3-1)(2√3+1)]
= (8+5√3)/5
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m.n=1
(-1,√3).( cosA, sin A)=1
-cosA+√3sin A =1
(√3sin A)^2 = (1+cosA)^2
2(cosA)^2 + cosA -1 =0
(2cosA-1)(cosA+1)=0
cosA = 1/2 or -1 (rejected)
A = π/3
(1+sin2B)/(cos^B-sin^B)=-3
(1+ sin2B) /cos2B = -3
sec2B+ tan2B = -3
(3+tan2B)^2 = (sec2B)^2
6tan2B+ 9 = 1
tan2B = -4/3
2tanB/(1-(tanB)^2 ) = -4/3
-4+4(tanB)^2 = 6tanB
2(tanB)^2 -3tanB-2 =0
(2tanB+1)(tanB-2) =0
tanB = 2 or -1/2 (rejected)
ie tanB = 2
tanC
= tan(π-A-B)
= tan(2π/3-B)
= (tan2π/3 - tanB)/(1+tanBtan2π/3)
=(-√3-2)/(1-2√3)
= ( √3+2)(2√3+1)/ [(2√3-1)(2√3+1)]
= (8+5√3)/5
嘻嘻
(-1,√3).( cosA, sin A)=1
-cosA+√3sin A =1
(√3sin A)^2 = (1+cosA)^2
2(cosA)^2 + cosA -1 =0
(2cosA-1)(cosA+1)=0
cosA = 1/2 or -1 (rejected)
A = π/3
(1+sin2B)/(cos^B-sin^B)=-3
(1+ sin2B) /cos2B = -3
sec2B+ tan2B = -3
(3+tan2B)^2 = (sec2B)^2
6tan2B+ 9 = 1
tan2B = -4/3
2tanB/(1-(tanB)^2 ) = -4/3
-4+4(tanB)^2 = 6tanB
2(tanB)^2 -3tanB-2 =0
(2tanB+1)(tanB-2) =0
tanB = 2 or -1/2 (rejected)
ie tanB = 2
tanC
= tan(π-A-B)
= tan(2π/3-B)
= (tan2π/3 - tanB)/(1+tanBtan2π/3)
=(-√3-2)/(1-2√3)
= ( √3+2)(2√3+1)/ [(2√3-1)(2√3+1)]
= (8+5√3)/5
嘻嘻
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