高中数学比修4所有诱导公式 高中数学必修4诱导公式
\u9ad8\u4e00\u6570\u5b66\u5fc5\u4fee4\u7684\u8bf1\u5bfc\u516c\u5f0f\u6709\u54ea\u4e9b\u8bfe\u672c\u91cc\u7684\u8bf1\u5bfc\u516c\u5f0f\u5f88\u591a,\u4e0d\u597d\u8bb0\u5440.
\u6211\u6559\u4f60\u5982\u4f55\u8bb0\u4f4f\u8bf1\u5bfc\u516c\u5f0f\u597d\u4e0d\u597d?\u5982\u679c\u4f60\u80fd\u5b66\u4f1a\u5c31\u4e0d\u518d\u9700\u8981\u8bb0\u8bfe\u672c\u91cc\u9762\u90a3\u4e48\u591a\u516c\u5f0f\u4e86,\u56e0\u4e3a\u5b83\u662f\u628a\u8bfe\u672c\u91cc\u5206\u7c7b\u7684\u516c\u5f0f\u8fdb\u884c\u6574\u5408\u5f97\u5230\u7684.
\u628a\u89d2\u03b1\u8f6c\u5316\u4e3ak\u03c0/2\uff0b\u03b8\u6216\u8005k\u00d790\u00b0\uff0b\u03b8\u7684\u5f62\u5f0f\uff0c
\u7136\u540e\u8bb0\u4f4f\u4e24\u53e5\u53e3\u8bc0\u201c\u5947\u53d8\u5076\u4e0d\u53d8\uff0c\u7b26\u53f7\u770b\u8c61\u9650\u201d
\u201c\u5947\u53d8\u5076\u4e0d\u53d8\u201d\u7684\u610f\u601d\u662f\u8bf4\uff1a
\u2460\u5982\u679ck\u662f\u5076\u6570\uff0c\u90a3\u4e48\u03b1\u524d\u9762\u7684\u4e09\u89d2\u51fd\u6570\u7b26\u53f7\u4e0d\u6539\u53d8\uff0e
\u2461\u5982\u679ck\u662f\u5947\u6570\uff0c\u90a3\u4e48\u03b1\u524d\u9762\u7684\u4e09\u89d2\u51fd\u6570\u7b26\u53f7\u8981\u6539\u53d8\uff0c\u6539\u53d8\u7684\u539f\u5219\u662f\uff1asin\u2192cos;cos\u2192sin;tan\u2192cot,cot\u2192tan.
\u2462\u201c\u7b26\u53f7\u770b\u8c61\u9650\u201d\u7684\u610f\u601d\u662f\u6839\u636e\u89d2\u03b1\u6240\u5728\u7684\u8c61\u9650\u786e\u5b9a\u6700\u540e\u7684\u7b26\u53f7\uff0e
\u6211\u4e3e\u4e00\u4e2a\u4f8b\u5b50\uff1a
sin1730\u00b0\uff1dsin(19\u00d790\u00b0\uff0b20\u00b0)
\u7b2c1\u6b65\uff1a\u8fd9\u91cc\u7684k\uff1d19\u662f\u5947\u6570\uff0c\u6240\u4ee5\u8981\u628asin\u53d8\u4e3acos\uff1b
\u7b2c2\u6b65\uff1a\u786e\u5b9a1730\u00b0\u7684\u7ec8\u8fb9\u5728\u7b2c\u56db\u8c61\u9650\uff0c\u90a3\u4e48\u5c31\u77e5\u9053sin1730\u00b0\u7684\u7b26\u53f7\u662f\u201c\uff0d\u201d.
\u56e0\u6b64\uff0csin1730\u00b0\uff1dsin(19\u00d790\u00b0\uff0b20\u00b0)\uff1d\uff0dcos20\u00b0
\u81f3\u4e8e\u5404\u79cd\u4e09\u89d2\u51fd\u6570\u5728\u56db\u4e2a\u8c61\u9650\u7684\u7b26\u53f7\u5982\u4f55\u5224\u65ad\uff0c\u4e5f\u53ef\u4ee5\u8bb0\u4f4f\u53e3\u8bc0\u201c\u4e00\u5168\u6b63\uff1b\u4e8c\u6b63\u5f26\uff1b\u4e09\u4e3a\u5207\uff1b\u56db\u4f59\u5f26\u201d\uff0e
\u8fd9\u5341\u4e8c\u5b57\u53e3\u8bc0\u7684\u610f\u601d\u5c31\u662f\u8bf4\uff1a
\u7b2c1\u8c61\u9650\u5185\u4efb\u4f55\u4e00\u4e2a\u89d2\u7684\u56db\u79cd\u4e09\u89d2\u51fd\u6570\u503c\u90fd\u662f\u201c\uff0b\u201d\uff1b
\u7b2c2\u8c61\u9650\u5185\u53ea\u6709\u6b63\u5f26\u662f\u201c\uff0b\u201d\uff0c\u5176\u4f59\u5168\u90e8\u662f\u201c\uff0d\u201d\uff1b
\u7b2c3\u8c61\u9650\u5185\u5207\u51fd\u6570\u662f\u201c\uff0b\u201d\uff0c\u5f26\u51fd\u6570\u662f\u201c\uff0d\u201d\uff1b
\u7b2c4\u8c61\u9650\u5185\u53ea\u6709\u4f59\u5f26\u662f\u201c\uff0b\u201d\uff0c\u5176\u4f59\u5168\u90e8\u662f\u201c\uff0d\u201d\uff0e
\u5982\u679c\u4f60\u80fd\u9886\u4f1a\u8fd9\u6bb5\u6587\u5b57\u7684\u610f\u601d\uff0c\u90a3\u4e48\u8bf1\u5bfc\u516c\u5f0f\u5b9e\u9645\u4e0a\u53ea\u6709\u4e00\u4e2a\uff0e\u6211\u5728\u6559\u5b66\u5f53\u4e2d\u4ece\u6765\u4e0d\u8981\u6c42\u6211\u7684\u5b66\u751f\u8bb0\u8bfe\u672c\u7684\u8bf1\u5bfc\u516c\u5f0f\uff0c\u8981\u6c42\u4ed6\u4eec\u6309\u4e0a\u9762\u8fd9\u6bb5\u8bdd\u7406\u89e3\u8bf1\u5bfc\u516c\u5f0f\uff0c\u6548\u679c\u5f88\u597d\u7684\uff0c\u4f60\u4e5f\u8bd5\u8bd5\u5427\uff0e
1.sin\uff08\u03c0-\u03b1\uff09=sin\u03b1\uff0csin\uff08\u03c0+\u03b1\uff09=-sin\u03b1\uff0csin\uff083\u03c0/2-\u03b1\uff09=-cos\u03b1\uff0csin\uff083\u03c0/2+\u03b1\uff09=-cos\u03b1
\u5219sin163\u00b0=sin\uff08180\u00b0-17\u00b0\uff09=sin17\u00b0\uff0c
sin223\u00b0=sin\uff08180\u00b0+43\u00b0\uff09=-sin43\u00b0\uff0c
sin253\u00b0=sin\uff08270\u00b0-17\u00b0\uff09=-cos17\u00b0\uff0c
sin313\u00b0=sin\uff08270\u00b0+43\u00b0\uff09=-cos43\u00b0
\u6240\u4ee5\uff0csin163\u00b0sin223\u00b0+sin253\u00b0sin313\u00b0=-sin17\u00b0sin43\u00b0+cos17\u00b0cos43\u00b0
=cos\uff0843\u00b0-17\u00b0\uff09=cos26\u00b0
2.\u56e0\u4e3a\u03b1\uff0c\u03b2\u662f\u9510\u89d2\uff0c\u6240\u4ee50\uff1c\u03b1\uff0c\u03b2\uff1c\u03c0/2\uff0c\u52190\uff1c\u03b1+\u03b2\uff1c\u03c0\uff0c\u6240\u4ee5sin\u03b1\uff0csin(\u03b1+\u03b2)\u90fd\uff1e0
\u7531sin²\u03b1+cos²\u03b1=1\u53ef\u77e5\uff0csin\u03b1=3/5\uff0csin(\u03b1+\u03b2)=27/65
\u6240\u4ee5\uff0ccos\u03b2=cos(\u03b1+\u03b2-\u03b1)=cos(\u03b1+\u03b2)cos\u03b1+sin(\u03b1+\u03b2)sin\u03b2=17/325
3.\u6839\u636e2\u4e2d\u5206\u6790\u53ef\u77e5\uff0c0\uff1c\u03b1\uff0c\u03b2\uff1c\u03c0/2\uff0c\u52190\uff1c\u03b1+\u03b2\uff1c\u03c0
\u56e0\u4e3asinx\u5728(0,\u03c0)\u4e0a\u6ca1\u6709\u5355\u8c03\u6027\uff0c\u800ccosx\u5728(0,\u03c0)\u6709\u5355\u8c03\u6027\uff0c\u56e0\u6b64\u53ef\u4ee5\u901a\u8fc7\u6c42cos(\u03b1-\u03b2)\u6765\u786e\u5b9a\u03b1-\u03b2
\u56e0\u4e3a0\uff1c\u03b1\uff0c\u03b2\uff1c\u03c0/2\uff0c\u6839\u636esin²\u03b1+cos²\u03b1=1\u53ef\u5f97\uff0ccos\u03b1=2\u6839\u53f75/5\uff0csin\u03b2=3\u6839\u53f710/10
\u5219cos(\u03b1-\u03b2)=cos\u03b1cos\u03b2+sin\u03b1sin\u03b2=\u6839\u53f72/2
\u6240\u4ee5\uff0c\u03b1-\u03b2=\u03c0/4
4.\u8bb0sin\u03b1-sin\u03b2=-1/2\u4e3a\u7b49\u5f0f\uff081\uff09\uff0c\u8bb0cos\u03b1-cos\u03b2=1/2\u4e3a\u7b49\u5f0f\uff082\uff09
\uff081\uff09²+\uff082\uff09²\u53ef\u5f97\uff0csin²\u03b1+cos²\u03b1+sin²\u03b2+cos²\u03b2-2(cos\u03b1cos\u03b2+sin\u03b1sin\u03b2)=1/2
\u53732-2(cos\u03b1cos\u03b2+sin\u03b1sin\u03b2)=1/2
\u6240\u4ee5\uff0ccos\u03b1cos\u03b2+sin\u03b1sin\u03b2=3/4\uff0c\u5373cos(\u03b1-\u03b2)=3/4
\u56e0\u4e3a\u03b1\uff0c\u03b2\u2208(0,\u03c0/2)\uff0c\u6240\u4ee5-\u03c0/2\uff1c\u03b1-\u03b2\uff1c\u03c0/2
\u800csin\u03b1-sin\u03b2=-1/2\uff1c0\uff0c\u5219sin\u03b1\uff1csin\u03b2\uff0c\u6839\u636ey=sinx\u5728x\u2208(0,\u03c0/2)\u4e0a\u5355\u8c03\u9012\u589e\u53ef\u77e5\uff0c\u03b1\uff1c\u03b2
\u6240\u4ee5\uff0c-\u03c0/2\uff1c\u03b1-\u03b2\uff1c0
\u2234sin(\u03b1-\u03b2)=-\u6839\u53f7[1-cos²(\u03b1-\u03b2)]=-\u6839\u53f77/4
5.sin2A=2sinAcosA=2/3
\u5219(sinA+cosA)²=sin²A+cos²A+2sinAcosA=1+2\u00b72/3=7/3
\u6240\u4ee5\uff0csinA+cosA=\u00b1\u6839\u53f721/3
6.\u5df2\u77e5cos2\u03b8=\u6839\u53f7\u4e8c/3\uff0c\u5219sin\u56db\u6b21\u65b9\u03b8+cos\u56db\u6b21\u65b9\u03b8\u7684\u503c\u4e3a____
\u56e0\u4e3acos2\u03b8=\u6839\u53f72/3\uff0c\u6240\u4ee5sin²2\u03b8=1-cos²2\u03b8=7/9
sin^4\u03b8+cos^4\u03b8=(sin²\u03b8+cos²\u03b8)²-2sin²\u03b8cos²\u03b8=1-1/2(2sin\u03b8cos\u03b8)²=1-1/2sin²2\u03b8=1-1/2\u00b77/9=11/18
设α为任意角,终边相同的角的同一三角函数的值相等:
sin(2kπ+α)= sinα
cos(2kπ+α)= cosα
tan(2kπ+α)= tanα
cot(2kπ+α)= cotα
公式二:
设α为任意角,π+α的三角函数值与α的三角函数值之间的关系:
sin(π+α)= -sinα
cos(π+α)= -cosα
tan(π+α)= tanα
cot(π+α)= cotα
公式三:
任意角α与 -α的三角函数值之间的关系:
sin(-α)= -sinα
cos(-α)= cosα
tan(-α)= -tanα
cot(-α)= -cotα
公式四:
利用公式二和公式三可以得到π-α与α的三角函数值之间的关系:
sin(π-α)= sinα
cos(π-α)= -cosα
tan(π-α)= -tanα
cot(π-α)= -cotα
公式五:
利用公式-和公式三可以得到2π-α与α的三角函数值之间的关系:
sin(2π-α)= -sinα
cos(2π-α)= cosα
tan(2π-α)= -tanα
cot(2π-α)= -cotα
公式六:
π/2±α及3π/2±α与α的三角函数值之间的关系:
sin(π/2+α)= cosα
cos(π/2+α)= -sinα
tan(π/2+α)= -cotα
cot(π/2+α)= -tanα
sin(π/2-α)= cosα
cos(π/2-α)= sinα
tan(π/2-α)= cotα
cot(π/2-α)= tanα
sin(3π/2+α)= -cosα
cos(3π/2+α)= sinα
tan(3π/2+α)= -cotα
cot(3π/2+α)= -tanα
sin(3π/2-α)= -cosα
cos(3π/2-α)= -sinα
tan(3π/2-α)= cotα
cot(3π/2-α)= tanα
(以上k∈Z)
总之奇变偶不变,正负看象限
公式一:
设α为任意角,终边相同的角的同一三角函数的值相等:
sin(2kπ+α)= sinα
cos(2kπ+α)= cosα
tan(2kπ+α)= tanα
cot(2kπ+α)= cotα
公式二:
设α为任意角,π+α的三角函数值与α的三角函数值之间的关系:
sin(π+α)= -sinα
cos(π+α)= -cosα
tan(π+α)= tanα
cot(π+α)= cotα
公式三:
任意角α与 -α的三角函数值之间的关系:
sin(-α)= -sinα
cos(-α)= cosα
tan(-α)= -tanα
cot(-α)= -cotα
公式四:
利用公式二和公式三可以得到π-α与α的三角函数值之间的关系:
sin(π-α)= sinα
cos(π-α)= -cosα
tan(π-α)= -tanα
cot(π-α)= -cotα
公式五:
利用公式-和公式三可以得到2π-α与α的三角函数值之间的关系:
sin(2π-α)= -sinα
cos(2π-α)= cosα
tan(2π-α)= -tanα
cot(2π-α)= -cotα
公式六:
π/2±α及3π/2±α与α的三角函数值之间的关系:
sin(π/2+α)= cosα
cos(π/2+α)= -sinα
tan(π/2+α)= -cotα
cot(π/2+α)= -tanα
sin(π/2-α)= cosα
cos(π/2-α)= sinα
tan(π/2-α)= cotα
cot(π/2-α)= tanα
sin(3π/2+α)= -cosα
cos(3π/2+α)= sinα
tan(3π/2+α)= -cotα
cot(3π/2+α)= -tanα
sin(3π/2-α)= -cosα
cos(3π/2-α)= -sinα
tan(3π/2-α)= cotα
cot(3π/2-α)= tanα
(以上k∈Z)
百度有的吧1
绛旓細1.sin锛埾-伪锛=sin伪锛宻in锛埾+伪锛=-sin伪锛宻in锛3蟺/2-伪锛=-cos伪锛宻in锛3蟺/2+伪锛=-cos伪 鍒檚in163掳=sin锛180掳-17掳锛=sin17掳锛宻in223掳=sin锛180掳+43掳锛=-sin43掳锛宻in253掳=sin锛270掳-17掳锛=-cos17掳锛宻in313掳=sin锛270掳+43掳锛=-cos43掳 鎵浠ワ紝sin163掳...
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绛旓細[sin(180掳+伪)*cos(360掳+伪)]/[cot(-伪-180掳)*sin(-180掳-伪)].=[-sin(伪)*cos(伪)]/[-cot(伪)*sin(伪)].=[cos(伪)]/[cot(伪)].=sin(伪)[sin(2蟺-伪)*tan(蟺+伪)*cot(-伪-蟺)]/[cos(蟺-伪)*tan(3蟺-伪)].=[-sin(伪)*tan(伪)*cot(-伪)]/[-cos(伪...
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绛旓細鍥
绛旓細鍦ㄎ辩粓婧愯竟涓婂彇涓鐐筆(x,y),閭d箞P鍏充簬鍘熺偣鐨2113瀵圭О鐐筆'(-x,-y)鍦ㄏ5261+伪缁堣竟涓4102锛屼笖r=|OP|=|OP'| 鏍规嵁涓夎鍑芥暟瀹1653涔夛細sin伪=y/r,sin(蟺+伪)=-y/r=-sin伪 cos伪=x/r,cos(蟺+伪)=-x/r=-cos伪 tan伪=y/x,tan(蟺+伪)=-y/(-x)=y/x=tan伪 ...
绛旓細鍥惧儚 | sin^2(x) sin(x^2) | x = 0 to 1
绛旓細sin[(蟺/2)+伪]=sin[(蟺/2)-(-伪)]=cos(-伪)=cos伪 cos[(蟺/2)+伪]=cos[(蟺/2)-(-伪)]=sin(-伪)= - sin伪
绛旓細锛嬧濓紝鍏朵綑鍏ㄩ儴鏄滐紞鈥濓紱绗3璞¢檺鍐呭垏鍑芥暟鏄滐紜鈥濓紝寮﹀嚱鏁版槸鈥滐紞鈥濓紱绗4璞¢檺鍐呭彧鏈変綑寮︽槸鈥滐紜鈥濓紝鍏朵綑鍏ㄩ儴鏄滐紞鈥濓紟濡傛灉浣犺兘棰嗕細杩欐鏂囧瓧鐨勬剰鎬濓紝閭d箞璇卞鍏紡瀹為檯涓婂彧鏈変竴涓紟鎴戝湪鏁欏褰撲腑浠庢潵涓嶈姹傛垜鐨勫鐢熻璇炬湰鐨勮瀵煎叕寮忥紝瑕佹眰浠栦滑鎸変笂闈㈣繖娈佃瘽鐞嗚В璇卞鍏紡锛屾晥鏋滃緢濂界殑锛屼綘涔熻瘯璇曞惂锛
绛旓細涓婇潰杩欎簺璇卞鍏紡鍙互姒傛嫭涓:瀵逛簬k路蟺/2卤伪(k鈭圸)鐨勪釜涓夎鍑芥暟鍊,鈶犲綋k鏄伓鏁版椂,寰楀埌伪鐨勫悓鍚嶅嚱鏁板,鍗冲嚱鏁板悕涓嶆敼鍙;鈶″綋k鏄鏁版椂,寰楀埌伪鐩稿簲鐨勪綑鍑芥暟鍊,鍗硈in鈫抍os;cos鈫抯in;tan鈫抍ot,cot鈫抰an.(濂囧彉鍋朵笉鍙)鐒跺悗鍦ㄥ墠闈㈠姞涓婃妸伪鐪嬫垚閿愯鏃跺師鍑芥暟鍊肩殑绗﹀彿銆(绗﹀彿鐪嬭薄闄)渚嬪:sin(2蟺-伪)=sin(4...
