1.三角形,三中線長為3,5,6,則此三角形之面積為?
2.三角形ABC中,aa-cc=bc且角B=51度,求角C=?
3.[(√3+i)/2]^7+1=Z,求|Z|及ArgZ
數學三問
版主: thepiano
Re: 數學三問
第 1 題
參考
http://forum.nta.org.tw/oldphpbb2/viewtopic.php?t=11910
http://forum.nta.org.tw/oldphpbb2/viewtopic.php?t=17368
第 2 題
a^2 - c^2 = bc
由正弦定理
(sinA)^2 - (sinC)^2 = sinBsinC
sin(A + C)sin(A - C) = sinBsinC
sin(A + C) = sinB
sin(A - C) = sinC
A - C = C 或 A - C = 180 - C(不合)
......
第 3 題
Z = [cos(π/6) + isin(π/6)]^7 + 1
= 1 + cos(7π/6) + isin(7π/6)
= 2cos(7π/12)[cos(7π/12) + isin(7π/12)]
= 2cos(7π/12)[-cos(5π/12) + isin(5π/12)]
= [-2cos(7π/12)][cos(5π/12) - isin(5π/12)]
= [-2cos(7π/12)][cos(19π/12) + isin(19π/12)]
參考
http://forum.nta.org.tw/oldphpbb2/viewtopic.php?t=11910
http://forum.nta.org.tw/oldphpbb2/viewtopic.php?t=17368
第 2 題
a^2 - c^2 = bc
由正弦定理
(sinA)^2 - (sinC)^2 = sinBsinC
sin(A + C)sin(A - C) = sinBsinC
sin(A + C) = sinB
sin(A - C) = sinC
A - C = C 或 A - C = 180 - C(不合)
......
第 3 題
Z = [cos(π/6) + isin(π/6)]^7 + 1
= 1 + cos(7π/6) + isin(7π/6)
= 2cos(7π/12)[cos(7π/12) + isin(7π/12)]
= 2cos(7π/12)[-cos(5π/12) + isin(5π/12)]
= [-2cos(7π/12)][cos(5π/12) - isin(5π/12)]
= [-2cos(7π/12)][cos(19π/12) + isin(19π/12)]
Re: 數學三問
我來幫 thepiano 老師回一下,
第 2 題
a^2 - c^2 = bc
由正弦定理
(sinA)^2 - (sinC)^2 = sinBsinC
sin(A + C)sin(A - C) = sinBsinC
sin(A + C) = sinB
sin(A - C) = sinC
A - C = C 或 A - C = 180 - C(不合)
......
首先這邊用到二個觀念,第一是正弦定理: a/sinA = b/sinB = c/sinC = 2R, R 是三角形 ABC 的外接圓半徑
第二是用到和角公式展開 sin(A+C) sin(A-C) 並利用平方關係代換可以推得 (sinA)^2 - (sinC)^2.
第三是因為 π - (A+B) = C 所以 sinC = sin[π - (A+B)] = sin(A+B). 得到 A = 2C 時就可以用一元一次方程式得答案.
第 2 題
a^2 - c^2 = bc
由正弦定理
(sinA)^2 - (sinC)^2 = sinBsinC
sin(A + C)sin(A - C) = sinBsinC
sin(A + C) = sinB
sin(A - C) = sinC
A - C = C 或 A - C = 180 - C(不合)
......
首先這邊用到二個觀念,第一是正弦定理: a/sinA = b/sinB = c/sinC = 2R, R 是三角形 ABC 的外接圓半徑
第二是用到和角公式展開 sin(A+C) sin(A-C) 並利用平方關係代換可以推得 (sinA)^2 - (sinC)^2.
第三是因為 π - (A+B) = C 所以 sinC = sin[π - (A+B)] = sin(A+B). 得到 A = 2C 時就可以用一元一次方程式得答案.