Loading - Music Archive

Source File

!dataver 201804
[Info]
N  trigonometric functions
S  天儿
C  科学狂想曲
LA 天儿
MA 天儿
G1 #3949AB
G2 #1976D2
O  https://music.163.com/#/song?id=34380194

[Para N1 段落1]
L 10.4 when you first study math about 1234
L - 当你初学数学中的1234
L 13.0 first study equation about xyzt
L - 初学方程中的XYZT
L 15.1 It will help you to think in a logical way
L - 它将帮助你进行逻辑思考
L 16.9 When you sing sine,cosine,cosine,tangent
L - 当你唱起正弦，余弦，余弦，正切
L 19.2 Sine,cosine,tangent,cotangent
L - 正弦，余弦，正切，余切
L 21.3 Sine,cosine,..,secant,cosecant
L - 正弦，余弦，正割，余割
L 23.5 Let's sing a song about trig-functions
L - 让我们唱起三角函数的歌谣吧

[Para N2 段落2]
L 26.0 sin(2π+α) = sinα
L - sin(2π+α) = sinα
L 27.8 cos(2π+α) = cosα
L - cos(2π+α) = cosα
L 29.9 tan(2π+α) = tanα
L - tan(2π+α) = tanα
L 32.0 which is induction formula1,and induction formula 2
L - 这是诱导公式归类1，下面是诱导公式归类2
L 34.2 sin(π+α) = -sinα
L - sin(π+α) = -sinα
L 36.6 cos(π+α) = -cosα
L - cos(π+α) = -cosα
L 38.7 tan(π+α) = tanα
L - tan(π+α) = tanα
L 40.6 sin(π－α) = sinα
L - sin(π－α) = sinα
L 42.7 cos(π－α) = -cosα
L - cos(π－α) = -cosα
L 45.0 tan(π－α) = -tanα
L - tan(π－α) = -tanα
L 47.0 These are all those "name donot -change"
L - 这些均为“函数名不变”

[Para N3 段落3]
L 49.3 As pi goes to half pi the difference shall be huge
L - 当π成为π/2是变化会很大
L 51.5 sin(π/2+α) = cosα
L - sin(π/2+α) = cosα
L 53.4 cos(π/2-α) = sinα
L - cos(π/2-α) = sinα
L 55.5 sin(π/2-α) = cosα
L - sin(π/2-α) = cosα
L 57.7 cos(π/2+α) = -sinα
L - cos(π/2+α) = -sinα
L 59.9 tan(π/2+α) = -cotα
L - tan(π/2+α) = -cotα
L 62.1 tan(π/2-α) = cotα
L - tan(π/2-α) = cotα

[Para N4 段落4]
L 68.4 That is to say the odds will change, evens are conserved
L - 这就是说 ：奇变偶不变
L 72.7 The notations that they get depend on where they are
L - 符号看象限
L 76.7 But no matter where you are, I've gotta say that
L - 但不论你在哪，我将会说
L 81.3 If you were my sine curve,I'd be your cosine curve
L - 你若为正弦曲线，我愿做余弦曲线
L 85.8 I'll be your derivative,you'll be my negtive one
L - 我将为你的导数，你将为我负导数
L 89.8 As you change you amplitude,I change my phase
L - 当你改变振幅，我改变相位
L 93.9 We can oscillate freely in the external space
L - 我们可在外界空间自由震荡
L 98.4 As we change our period and costant at hand
L - 当我们改变周期和手边常数
L 102.5 We travel from the origin to infinity
L - 我们从原点驶向无尽

[Para N5 段落5]
L 106.7 It's you sine,and you cosine
L - 是你，正弦，余弦
L 111.1 Who make charming music around the world
L - 创造了世间动人的音乐
L 115.3 It's you tangent,cotangent
L - 是你，正切，余切
L 119.5 Who proclaim the true meaning of centrosymmetry
L - 揭示了中心对称的真谛

[Para -- 间奏]
L 124.2 - - - - - - -

[Para N6 段落6]
L 166.7 You wanna measure width of a river,height of a tower
L - 你想测量河宽及塔高
L 169.2 You scratch your head which cost you more than an hour
L - 你抓耳挠腮一个多小时也想不出
L 171.2 You don't need to ask any "gods" or "master" for help
L - 你无需向dalao们请教
L 173.5 This group of formulas are gonna help you solve
L - 这一组公式将帮你解决
L 175.6 sin(α+β) = sinα•cosβ + cosα•sinβ
L - sin(α+β) = sinα•cosβ + cosα•sinβ
L 179.0 cos(α+β) = cosα•cosβ - sinα•sinβ
L - cos(α+β) = cosα•cosβ - sinα•sinβ
L 182.2 tan(α+β) = (tanα + tanβ) / (1 - tanα•tanβ)
L - tan(α+β) = (tanα + tanβ) / (1 - tanα•tanβ)
L 186.0 sin(α-β) = sinα•cosβ - cosα•sinβ
L - sin(α-β) = sinα•cosβ - cosα•sinβ
L 189.8 cos(α-β) = cosα•cosβ + sinα•sinβ
L - cos(α-β) = cosα•cosβ + sinα•sinβ
L 192.9 tan(α-β) = (tanα - tanβ) / (1 + tanα•tanβ)
L - tan(α-β) = (tanα - tanβ)/(1 + tanα•tanβ) 
L 197.8 As you come across a right triangle you fell easy to sovle
L - 当你遇到直角三角形很容易解
L 200.3 But an obtuse triange's gonna make you feel confused
L - 但钝角三角形使你感到困惑
L 202.5 Don't worry about what you do
L - 无须担心
L 203.8 There are always means to solve
L - 总有解决方法
L 204.7 As long as you master the sine cosine law
L - 只要你掌握了正余弦定理

[Para N7 段落7]
L 209.6 At this momnet I've got nothing to say
L - 此刻我无以言表
L 213.9 As trig-functions rain down upon me
L - 当时三角函数犹雨点般落向我
L 218.4 At this moment I've got nothing to say
L - 此刻我无以言表
L 222.5 Let's sing a song about trig-functions
L - 让我们唱起三角函数歌谣吧
L 226.7 Long live the trigonometric functions
L - 三角函数万岁

[Final 233.5]

API Method: Append ?raw for raw content.
Example: GET https://music-archive.sparks-lab.art/0501/code?raw

Compilation Results

{"meta":{"N":"trigonometric functions","S":"天儿","LA":"天儿","MA":"天儿","C":"科学狂想曲","A":"3949AB","G1":"3949AB","G2":"1976D2","O":"https://music.163.com/#/song?id=34380194","P":"0501/avatar","X":"2F3FA1"},"lyrics":[{"id":-1,"type":"lyrics","ac":"--","n":"pre","premark":true,"display":true,"title":false,"in":[{"id":-1,"ts":"0","c":"- - - - - - -"}]},{"id":0,"type":"lyrics","ac":"N<sub>1</sub>","n":"段落1","display":true,"title":true,"in":[{"id":0,"ts":104,"c":"when you first study math about 1234"},{"id":1,"ts":1610612736,"c":"当你初学数学中的1234"},{"id":2,"ts":130,"c":"first study equation about xyzt"},{"id":3,"ts":1610612736,"c":"初学方程中的XYZT"},{"id":4,"ts":151,"c":"It will help you to think in a logical way"},{"id":5,"ts":1610612736,"c":"它将帮助你进行逻辑思考"},{"id":6,"ts":169,"c":"When you sing sine,cosine,cosine,tangent"},{"id":7,"ts":1610612736,"c":"当你唱起正弦，余弦，余弦，正切"},{"id":8,"ts":192,"c":"Sine,cosine,tangent,cotangent"},{"id":9,"ts":1610612736,"c":"正弦，余弦，正切，余切"},{"id":10,"ts":213,"c":"Sine,cosine,..,secant,cosecant"},{"id":11,"ts":1610612736,"c":"正弦，余弦，正割，余割"},{"id":12,"ts":235,"c":"Let's sing a song about trig-functions"},{"id":13,"ts":1610612736,"c":"让我们唱起三角函数的歌谣吧"}]},{"id":1,"type":"lyrics","ac":"N<sub>2</sub>","n":"段落2","display":true,"title":true,"in":[{"id":14,"ts":260,"c":"sin(2π+α) = sinα"},{"id":15,"ts":1610612736,"c":"sin(2π+α) = sinα"},{"id":16,"ts":278,"c":"cos(2π+α) = cosα"},{"id":17,"ts":1610612736,"c":"cos(2π+α) = cosα"},{"id":18,"ts":299,"c":"tan(2π+α) = tanα"},{"id":19,"ts":1610612736,"c":"tan(2π+α) = tanα"},{"id":20,"ts":320,"c":"which is induction formula1,and induction formula 2"},{"id":21,"ts":1610612736,"c":"这是诱导公式归类1，下面是诱导公式归类2"},{"id":22,"ts":342,"c":"sin(π+α) = -sinα"},{"id":23,"ts":1610612736,"c":"sin(π+α) = -sinα"},{"id":24,"ts":366,"c":"cos(π+α) = -cosα"},{"id":25,"ts":1610612736,"c":"cos(π+α) = -cosα"},{"id":26,"ts":387,"c":"tan(π+α) = tanα"},{"id":27,"ts":1610612736,"c":"tan(π+α) = tanα"},{"id":28,"ts":406,"c":"sin(π－α) = sinα"},{"id":29,"ts":1610612736,"c":"sin(π－α) = sinα"},{"id":30,"ts":427,"c":"cos(π－α) = -cosα"},{"id":31,"ts":1610612736,"c":"cos(π－α) = -cosα"},{"id":32,"ts":450,"c":"tan(π－α) = -tanα"},{"id":33,"ts":1610612736,"c":"tan(π－α) = -tanα"},{"id":34,"ts":470,"c":"These are all those \"name donot -change\""},{"id":35,"ts":1610612736,"c":"这些均为“函数名不变”"}]},{"id":2,"type":"lyrics","ac":"N<sub>3</sub>","n":"段落3","display":true,"title":true,"in":[{"id":36,"ts":493,"c":"As pi goes to half pi the difference shall be huge"},{"id":37,"ts":1610612736,"c":"当π成为π/2是变化会很大"},{"id":38,"ts":515,"c":"sin(π/2+α) = cosα"},{"id":39,"ts":1610612736,"c":"sin(π/2+α) = cosα"},{"id":40,"ts":534,"c":"cos(π/2-α) = sinα"},{"id":41,"ts":1610612736,"c":"cos(π/2-α) = sinα"},{"id":42,"ts":555,"c":"sin(π/2-α) = cosα"},{"id":43,"ts":1610612736,"c":"sin(π/2-α) = cosα"},{"id":44,"ts":577,"c":"cos(π/2+α) = -sinα"},{"id":45,"ts":1610612736,"c":"cos(π/2+α) = -sinα"},{"id":46,"ts":599,"c":"tan(π/2+α) = -cotα"},{"id":47,"ts":1610612736,"c":"tan(π/2+α) = -cotα"},{"id":48,"ts":621,"c":"tan(π/2-α) = cotα"},{"id":49,"ts":1610612736,"c":"tan(π/2-α) = cotα"}]},{"id":3,"type":"lyrics","ac":"N<sub>4</sub>","n":"段落4","display":true,"title":true,"in":[{"id":50,"ts":684,"c":"That is to say the odds will change, evens are conserved"},{"id":51,"ts":1610612736,"c":"这就是说 ：奇变偶不变"},{"id":52,"ts":727,"c":"The notations that they get depend on where they are"},{"id":53,"ts":1610612736,"c":"符号看象限"},{"id":54,"ts":767,"c":"But no matter where you are, I've gotta say that"},{"id":55,"ts":1610612736,"c":"但不论你在哪，我将会说"},{"id":56,"ts":813,"c":"If you were my sine curve,I'd be your cosine curve"},{"id":57,"ts":1610612736,"c":"你若为正弦曲线，我愿做余弦曲线"},{"id":58,"ts":858,"c":"I'll be your derivative,you'll be my negtive one"},{"id":59,"ts":1610612736,"c":"我将为你的导数，你将为我负导数"},{"id":60,"ts":898,"c":"As you change you amplitude,I change my phase"},{"id":61,"ts":1610612736,"c":"当你改变振幅，我改变相位"},{"id":62,"ts":939,"c":"We can oscillate freely in the external space"},{"id":63,"ts":1610612736,"c":"我们可在外界空间自由震荡"},{"id":64,"ts":984,"c":"As we change our period and costant at hand"},{"id":65,"ts":1610612736,"c":"当我们改变周期和手边常数"},{"id":66,"ts":1025,"c":"We travel from the origin to infinity"},{"id":67,"ts":1610612736,"c":"我们从原点驶向无尽"}]},{"id":4,"type":"lyrics","ac":"N<sub>5</sub>","n":"段落5","display":true,"title":true,"in":[{"id":68,"ts":1067,"c":"It's you sine,and you cosine"},{"id":69,"ts":1610612736,"c":"是你，正弦，余弦"},{"id":70,"ts":1111,"c":"Who make charming music around the world"},{"id":71,"ts":1610612736,"c":"创造了世间动人的音乐"},{"id":72,"ts":1153,"c":"It's you tangent,cotangent"},{"id":73,"ts":1610612736,"c":"是你，正切，余切"},{"id":74,"ts":1195,"c":"Who proclaim the true meaning of centrosymmetry"},{"id":75,"ts":1610612736,"c":"揭示了中心对称的真谛"}]},{"id":5,"type":"lyrics","ac":"--","n":"间奏","display":true,"title":true,"in":[{"id":76,"ts":1242,"c":"- - - - - - -"}]},{"id":6,"type":"lyrics","ac":"N<sub>6</sub>","n":"段落6","display":true,"title":true,"in":[{"id":77,"ts":1667,"c":"You wanna measure width of a river,height of a tower"},{"id":78,"ts":1610612736,"c":"你想测量河宽及塔高"},{"id":79,"ts":1692,"c":"You scratch your head which cost you more than an hour"},{"id":80,"ts":1610612736,"c":"你抓耳挠腮一个多小时也想不出"},{"id":81,"ts":1712,"c":"You don't need to ask any \"gods\" or \"master\" for help"},{"id":82,"ts":1610612736,"c":"你无需向dalao们请教"},{"id":83,"ts":1735,"c":"This group of formulas are gonna help you solve"},{"id":84,"ts":1610612736,"c":"这一组公式将帮你解决"},{"id":85,"ts":1756,"c":"sin(α+β) = sinα•cosβ + cosα•sinβ"},{"id":86,"ts":1610612736,"c":"sin(α+β) = sinα•cosβ + cosα•sinβ"},{"id":87,"ts":1790,"c":"cos(α+β) = cosα•cosβ - sinα•sinβ"},{"id":88,"ts":1610612736,"c":"cos(α+β) = cosα•cosβ - sinα•sinβ"},{"id":89,"ts":1822,"c":"tan(α+β) = (tanα + tanβ) / (1 - tanα•tanβ)"},{"id":90,"ts":1610612736,"c":"tan(α+β) = (tanα + tanβ) / (1 - tanα•tanβ)"},{"id":91,"ts":1860,"c":"sin(α-β) = sinα•cosβ - cosα•sinβ"},{"id":92,"ts":1610612736,"c":"sin(α-β) = sinα•cosβ - cosα•sinβ"},{"id":93,"ts":1898,"c":"cos(α-β) = cosα•cosβ + sinα•sinβ"},{"id":94,"ts":1610612736,"c":"cos(α-β) = cosα•cosβ + sinα•sinβ"},{"id":95,"ts":1929,"c":"tan(α-β) = (tanα - tanβ) / (1 + tanα•tanβ)"},{"id":96,"ts":1610612736,"c":"tan(α-β) = (tanα - tanβ)/(1 + tanα•tanβ)"},{"id":97,"ts":1978,"c":"As you come across a right triangle you fell easy to sovle"},{"id":98,"ts":1610612736,"c":"当你遇到直角三角形很容易解"},{"id":99,"ts":2003,"c":"But an obtuse triange's gonna make you feel confused"},{"id":100,"ts":1610612736,"c":"但钝角三角形使你感到困惑"},{"id":101,"ts":2025,"c":"Don't worry about what you do"},{"id":102,"ts":1610612736,"c":"无须担心"},{"id":103,"ts":2038,"c":"There are always means to solve"},{"id":104,"ts":1610612736,"c":"总有解决方法"},{"id":105,"ts":2047,"c":"As long as you master the sine cosine law"},{"id":106,"ts":1610612736,"c":"只要你掌握了正余弦定理"}]},{"id":7,"type":"lyrics","ac":"N<sub>7</sub>","n":"段落7","display":true,"title":true,"in":[{"id":107,"ts":2096,"c":"At this momnet I've got nothing to say"},{"id":108,"ts":1610612736,"c":"此刻我无以言表"},{"id":109,"ts":2139,"c":"As trig-functions rain down upon me"},{"id":110,"ts":1610612736,"c":"当时三角函数犹雨点般落向我"},{"id":111,"ts":2184,"c":"At this moment I've got nothing to say"},{"id":112,"ts":1610612736,"c":"此刻我无以言表"},{"id":113,"ts":2225,"c":"Let's sing a song about trig-functions"},{"id":114,"ts":1610612736,"c":"让我们唱起三角函数歌谣吧"},{"id":115,"ts":2267,"c":"Long live the trigonometric functions"},{"id":116,"ts":1610612736,"c":"三角函数万岁"}]},{"id":8,"type":"final","ts":2335,"display":false}],"timestamps":{"0":[-1,-1],"104":[0,0],"1610612736":[7,116],"130":[0,2],"151":[0,4],"169":[0,6],"192":[0,8],"213":[0,10],"235":[0,12],"260":[1,14],"278":[1,16],"299":[1,18],"320":[1,20],"342":[1,22],"366":[1,24],"387":[1,26],"406":[1,28],"427":[1,30],"450":[1,32],"470":[1,34],"493":[2,36],"515":[2,38],"534":[2,40],"555":[2,42],"577":[2,44],"599":[2,46],"621":[2,48],"684":[3,50],"727":[3,52],"767":[3,54],"813":[3,56],"858":[3,58],"898":[3,60],"939":[3,62],"984":[3,64],"1025":[3,66],"1067":[4,68],"1111":[4,70],"1153":[4,72],"1195":[4,74],"1242":[5,76],"1667":[6,77],"1692":[6,79],"1712":[6,81],"1735":[6,83],"1756":[6,85],"1790":[6,87],"1822":[6,89],"1860":[6,91],"1898":[6,93],"1929":[6,95],"1978":[6,97],"2003":[6,99],"2025":[6,101],"2038":[6,103],"2047":[6,105],"2096":[7,107],"2139":[7,109],"2184":[7,111],"2225":[7,113],"2267":[7,115],"2335":[-2,-2]}}

API Method: Obtain raw json from raw subpage.
Example: GET https://music-archive.sparks-lab.art/0501/raw

Minified LRC File

 [ti:trigonometric functions]
 [ar:天儿]
 [al:科学狂想曲]
 [by:Music Archive]
 [offset:0]
 [00:00.000]trigonometric functions - 天儿
 [00:10.400]when you first study math about 1234
 [00:13.000]当你初学数学中的1234
 [00:13.001]first study equation about xyzt
 [00:15.100]初学方程中的XYZT
 [00:15.101]It will help you to think in a logical way
 [00:16.900]它将帮助你进行逻辑思考
 [00:16.901]When you sing sine,cosine,cosine,tangent
 [00:19.200]当你唱起正弦，余弦，余弦，正切
 [00:19.201]Sine,cosine,tangent,cotangent
 [00:21.300]正弦，余弦，正切，余切
 [00:21.301]Sine,cosine,..,secant,cosecant
 [00:23.500]正弦，余弦，正割，余割
 [00:23.501][03:42.501]Let's sing a song about trig-functions
 [00:26.000]让我们唱起三角函数的歌谣吧
 [00:26.001][00:49.301][01:08.401][01:46.701][02:04.201][02:46.700][03:29.601][03:53.501]
 [00:26.002][00:27.800]sin(2π+α) = sinα
 [00:27.801][00:29.900]cos(2π+α) = cosα
 [00:29.901][00:32.000]tan(2π+α) = tanα
 [00:32.001]which is induction formula1,and induction formula 2
 [00:34.200]这是诱导公式归类1，下面是诱导公式归类2
 [00:34.201][00:36.600]sin(π+α) = -sinα
 [00:36.601][00:38.700]cos(π+α) = -cosα
 [00:38.701][00:40.600]tan(π+α) = tanα
 [00:40.601][00:42.700]sin(π－α) = sinα
 [00:42.701][00:45.000]cos(π－α) = -cosα
 [00:45.001][00:47.000]tan(π－α) = -tanα
 [00:47.001]These are all those "name donot -change"
 [00:49.300]这些均为“函数名不变”
 [00:49.302]As pi goes to half pi the difference shall be huge
 [00:51.500]当π成为π/2是变化会很大
 [00:51.501][00:53.400]sin(π/2+α) = cosα
 [00:53.401][00:55.500]cos(π/2-α) = sinα
 [00:55.501][00:57.700]sin(π/2-α) = cosα
 [00:57.701][00:59.900]cos(π/2+α) = -sinα
 [00:59.901][01:02.100]tan(π/2+α) = -cotα
 [01:02.101][01:08.400]tan(π/2-α) = cotα
 [01:08.402]That is to say the odds will change, evens are conserved
 [01:12.700]这就是说 ：奇变偶不变
 [01:12.701]The notations that they get depend on where they are
 [01:16.700]符号看象限
 [01:16.701]But no matter where you are, I've gotta say that
 [01:21.300]但不论你在哪，我将会说
 [01:21.301]If you were my sine curve,I'd be your cosine curve
 [01:25.800]你若为正弦曲线，我愿做余弦曲线
 [01:25.801]I'll be your derivative,you'll be my negtive one
 [01:29.800]我将为你的导数，你将为我负导数
 [01:29.801]As you change you amplitude,I change my phase
 [01:33.900]当你改变振幅，我改变相位
 [01:33.901]We can oscillate freely in the external space
 [01:38.400]我们可在外界空间自由震荡
 [01:38.401]As we change our period and costant at hand
 [01:42.500]当我们改变周期和手边常数
 [01:42.501]We travel from the origin to infinity
 [01:46.700]我们从原点驶向无尽
 [01:46.702]It's you sine,and you cosine
 [01:51.100]是你，正弦，余弦
 [01:51.101]Who make charming music around the world
 [01:55.300]创造了世间动人的音乐
 [01:55.301]It's you tangent,cotangent
 [01:59.500]是你，正切，余切
 [01:59.501]Who proclaim the true meaning of centrosymmetry
 [02:04.200]揭示了中心对称的真谛
 [02:04.202]- Break -
 [02:46.701]You wanna measure width of a river,height of a tower
 [02:49.200]你想测量河宽及塔高
 [02:49.201]You scratch your head which cost you more than an hour
 [02:51.200]你抓耳挠腮一个多小时也想不出
 [02:51.201]You don't need to ask any "gods" or "master" for help
 [02:53.500]你无需向dalao们请教
 [02:53.501]This group of formulas are gonna help you solve
 [02:55.600]这一组公式将帮你解决
 [02:55.601][02:59.000]sin(α+β) = sinα•cosβ + cosα•sinβ
 [02:59.001][03:02.200]cos(α+β) = cosα•cosβ - sinα•sinβ
 [03:02.201][03:06.000]tan(α+β) = (tanα + tanβ) / (1 - tanα•tanβ)
 [03:06.001][03:09.800]sin(α-β) = sinα•cosβ - cosα•sinβ
 [03:09.801][03:12.900]cos(α-β) = cosα•cosβ + sinα•sinβ
 [03:12.901]tan(α-β) = (tanα - tanβ) / (1 + tanα•tanβ)
 [03:17.800]tan(α-β) = (tanα - tanβ)/(1 + tanα•tanβ)
 [03:17.801]As you come across a right triangle you fell easy to sovle
 [03:20.300]当你遇到直角三角形很容易解
 [03:20.301]But an obtuse triange's gonna make you feel confused
 [03:22.500]但钝角三角形使你感到困惑
 [03:22.501]Don't worry about what you do
 [03:23.800]无须担心
 [03:23.801]There are always means to solve
 [03:24.700]总有解决方法
 [03:24.701]As long as you master the sine cosine law
 [03:29.600]只要你掌握了正余弦定理
 [03:29.602]At this momnet I've got nothing to say
 [03:33.900][03:42.500]此刻我无以言表
 [03:33.901]As trig-functions rain down upon me
 [03:38.400]当时三角函数犹雨点般落向我
 [03:38.401]At this moment I've got nothing to say
 [03:46.700]让我们唱起三角函数歌谣吧
 [03:46.701]Long live the trigonometric functions
 [03:53.500]三角函数万岁
 [03:53.502]- End -
  

Standard contents only, with minified lines.
API Method: Append ?raw&lrc=minified&delta=#&comment=#&precision=# for raw content.
Example: GET https://music-archive.sparks-lab.art/0501/code?raw&lrc=minified&delta=0&comment=0.7&precision=0.1

Extended LRC File

 [ti:trigonometric functions]
 [ar:天儿]
 [txmp_la:天儿]
 [txmp_ma:天儿]
 [al:科学狂想曲]
 [by:Music Archive]
 [offset:0]
 [00:00.000]trigonometric functions - 天儿
 [txmp_para:N1 段落1]
 [00:10.400]when you first study math about 1234
 [00:13.000]当你初学数学中的1234
 [00:13.001]first study equation about xyzt
 [00:15.100]初学方程中的XYZT
 [00:15.101]It will help you to think in a logical way
 [00:16.900]它将帮助你进行逻辑思考
 [00:16.901]When you sing sine,cosine,cosine,tangent
 [00:19.200]当你唱起正弦，余弦，余弦，正切
 [00:19.201]Sine,cosine,tangent,cotangent
 [00:21.300]正弦，余弦，正切，余切
 [00:21.301]Sine,cosine,..,secant,cosecant
 [00:23.500]正弦，余弦，正割，余割
 [00:23.501]Let's sing a song about trig-functions
 [00:26.000]让我们唱起三角函数的歌谣吧
 [00:26.001]
 [txmp_para:N2 段落2]
 [00:26.002]sin(2π+α) = sinα
 [00:27.800]sin(2π+α) = sinα
 [00:27.801]cos(2π+α) = cosα
 [00:29.900]cos(2π+α) = cosα
 [00:29.901]tan(2π+α) = tanα
 [00:32.000]tan(2π+α) = tanα
 [00:32.001]which is induction formula1,and induction formula 2
 [00:34.200]这是诱导公式归类1，下面是诱导公式归类2
 [00:34.201]sin(π+α) = -sinα
 [00:36.600]sin(π+α) = -sinα
 [00:36.601]cos(π+α) = -cosα
 [00:38.700]cos(π+α) = -cosα
 [00:38.701]tan(π+α) = tanα
 [00:40.600]tan(π+α) = tanα
 [00:40.601]sin(π－α) = sinα
 [00:42.700]sin(π－α) = sinα
 [00:42.701]cos(π－α) = -cosα
 [00:45.000]cos(π－α) = -cosα
 [00:45.001]tan(π－α) = -tanα
 [00:47.000]tan(π－α) = -tanα
 [00:47.001]These are all those "name donot -change"
 [00:49.300]这些均为“函数名不变”
 [00:49.301]
 [txmp_para:N3 段落3]
 [00:49.302]As pi goes to half pi the difference shall be huge
 [00:51.500]当π成为π/2是变化会很大
 [00:51.501]sin(π/2+α) = cosα
 [00:53.400]sin(π/2+α) = cosα
 [00:53.401]cos(π/2-α) = sinα
 [00:55.500]cos(π/2-α) = sinα
 [00:55.501]sin(π/2-α) = cosα
 [00:57.700]sin(π/2-α) = cosα
 [00:57.701]cos(π/2+α) = -sinα
 [00:59.900]cos(π/2+α) = -sinα
 [00:59.901]tan(π/2+α) = -cotα
 [01:02.100]tan(π/2+α) = -cotα
 [01:02.101]tan(π/2-α) = cotα
 [01:08.400]tan(π/2-α) = cotα
 [01:08.401]
 [txmp_para:N4 段落4]
 [01:08.402]That is to say the odds will change, evens are conserved
 [01:12.700]这就是说 ：奇变偶不变
 [01:12.701]The notations that they get depend on where they are
 [01:16.700]符号看象限
 [01:16.701]But no matter where you are, I've gotta say that
 [01:21.300]但不论你在哪，我将会说
 [01:21.301]If you were my sine curve,I'd be your cosine curve
 [01:25.800]你若为正弦曲线，我愿做余弦曲线
 [01:25.801]I'll be your derivative,you'll be my negtive one
 [01:29.800]我将为你的导数，你将为我负导数
 [01:29.801]As you change you amplitude,I change my phase
 [01:33.900]当你改变振幅，我改变相位
 [01:33.901]We can oscillate freely in the external space
 [01:38.400]我们可在外界空间自由震荡
 [01:38.401]As we change our period and costant at hand
 [01:42.500]当我们改变周期和手边常数
 [01:42.501]We travel from the origin to infinity
 [01:46.700]我们从原点驶向无尽
 [01:46.701]
 [txmp_para:N5 段落5]
 [01:46.702]It's you sine,and you cosine
 [01:51.100]是你，正弦，余弦
 [01:51.101]Who make charming music around the world
 [01:55.300]创造了世间动人的音乐
 [01:55.301]It's you tangent,cotangent
 [01:59.500]是你，正切，余切
 [01:59.501]Who proclaim the true meaning of centrosymmetry
 [02:04.200]揭示了中心对称的真谛
 [02:04.201]
 [txmp_para:-- 间奏]
 [02:04.202]- Break -
 [02:46.700]
 [txmp_para:N6 段落6]
 [02:46.701]You wanna measure width of a river,height of a tower
 [02:49.200]你想测量河宽及塔高
 [02:49.201]You scratch your head which cost you more than an hour
 [02:51.200]你抓耳挠腮一个多小时也想不出
 [02:51.201]You don't need to ask any "gods" or "master" for help
 [02:53.500]你无需向dalao们请教
 [02:53.501]This group of formulas are gonna help you solve
 [02:55.600]这一组公式将帮你解决
 [02:55.601]sin(α+β) = sinα•cosβ + cosα•sinβ
 [02:59.000]sin(α+β) = sinα•cosβ + cosα•sinβ
 [02:59.001]cos(α+β) = cosα•cosβ - sinα•sinβ
 [03:02.200]cos(α+β) = cosα•cosβ - sinα•sinβ
 [03:02.201]tan(α+β) = (tanα + tanβ) / (1 - tanα•tanβ)
 [03:06.000]tan(α+β) = (tanα + tanβ) / (1 - tanα•tanβ)
 [03:06.001]sin(α-β) = sinα•cosβ - cosα•sinβ
 [03:09.800]sin(α-β) = sinα•cosβ - cosα•sinβ
 [03:09.801]cos(α-β) = cosα•cosβ + sinα•sinβ
 [03:12.900]cos(α-β) = cosα•cosβ + sinα•sinβ
 [03:12.901]tan(α-β) = (tanα - tanβ) / (1 + tanα•tanβ)
 [03:17.800]tan(α-β) = (tanα - tanβ)/(1 + tanα•tanβ)
 [03:17.801]As you come across a right triangle you fell easy to sovle
 [03:20.300]当你遇到直角三角形很容易解
 [03:20.301]But an obtuse triange's gonna make you feel confused
 [03:22.500]但钝角三角形使你感到困惑
 [03:22.501]Don't worry about what you do
 [03:23.800]无须担心
 [03:23.801]There are always means to solve
 [03:24.700]总有解决方法
 [03:24.701]As long as you master the sine cosine law
 [03:29.600]只要你掌握了正余弦定理
 [03:29.601]
 [txmp_para:N7 段落7]
 [03:29.602]At this momnet I've got nothing to say
 [03:33.900]此刻我无以言表
 [03:33.901]As trig-functions rain down upon me
 [03:38.400]当时三角函数犹雨点般落向我
 [03:38.401]At this moment I've got nothing to say
 [03:42.500]此刻我无以言表
 [03:42.501]Let's sing a song about trig-functions
 [03:46.700]让我们唱起三角函数歌谣吧
 [03:46.701]Long live the trigonometric functions
 [03:53.500]三角函数万岁
 [03:53.501]
 [txmp_final:03:53.500]
 [03:53.502]- End -
  

Express lyrics precisely.
API Method: Append ?raw&lrc=fancy&delta=#&comment=#&precision=# for raw content.
Example: GET https://music-archive.sparks-lab.art/0501/code?raw&lrc=fancy&delta=0&comment=0.7&precision=0.1

Source File

 !dataver 201804
 [Info]
 N  trigonometric functions
 S  天儿
 C  科学狂想曲
 LA 天儿
 MA 天儿
 G1 #3949AB
 G2 #1976D2
 O  https://music.163.com/#/song?id=34380194
  
 [Para N1 段落1]
 L 10.4 when you first study math about 1234
 L - 当你初学数学中的1234
 L 13.0 first study equation about xyzt
 L - 初学方程中的XYZT
 L 15.1 It will help you to think in a logical way
 L - 它将帮助你进行逻辑思考
 L 16.9 When you sing sine,cosine,cosine,tangent
 L - 当你唱起正弦，余弦，余弦，正切
 L 19.2 Sine,cosine,tangent,cotangent
 L - 正弦，余弦，正切，余切
 L 21.3 Sine,cosine,..,secant,cosecant
 L - 正弦，余弦，正割，余割
 L 23.5 Let's sing a song about trig-functions
 L - 让我们唱起三角函数的歌谣吧
  
 [Para N2 段落2]
 L 26.0 sin(2π+α) = sinα
 L - sin(2π+α) = sinα
 L 27.8 cos(2π+α) = cosα
 L - cos(2π+α) = cosα
 L 29.9 tan(2π+α) = tanα
 L - tan(2π+α) = tanα
 L 32.0 which is induction formula1,and induction formula 2
 L - 这是诱导公式归类1，下面是诱导公式归类2
 L 34.2 sin(π+α) = -sinα
 L - sin(π+α) = -sinα
 L 36.6 cos(π+α) = -cosα
 L - cos(π+α) = -cosα
 L 38.7 tan(π+α) = tanα
 L - tan(π+α) = tanα
 L 40.6 sin(π－α) = sinα
 L - sin(π－α) = sinα
 L 42.7 cos(π－α) = -cosα
 L - cos(π－α) = -cosα
 L 45.0 tan(π－α) = -tanα
 L - tan(π－α) = -tanα
 L 47.0 These are all those "name donot -change"
 L - 这些均为“函数名不变”
  
 [Para N3 段落3]
 L 49.3 As pi goes to half pi the difference shall be huge
 L - 当π成为π/2是变化会很大
 L 51.5 sin(π/2+α) = cosα
 L - sin(π/2+α) = cosα
 L 53.4 cos(π/2-α) = sinα
 L - cos(π/2-α) = sinα
 L 55.5 sin(π/2-α) = cosα
 L - sin(π/2-α) = cosα
 L 57.7 cos(π/2+α) = -sinα
 L - cos(π/2+α) = -sinα
 L 59.9 tan(π/2+α) = -cotα
 L - tan(π/2+α) = -cotα
 L 62.1 tan(π/2-α) = cotα
 L - tan(π/2-α) = cotα
  
 [Para N4 段落4]
 L 68.4 That is to say the odds will change, evens are conserved
 L - 这就是说 ：奇变偶不变
 L 72.7 The notations that they get depend on where they are
 L - 符号看象限
 L 76.7 But no matter where you are, I've gotta say that
 L - 但不论你在哪，我将会说
 L 81.3 If you were my sine curve,I'd be your cosine curve
 L - 你若为正弦曲线，我愿做余弦曲线
 L 85.8 I'll be your derivative,you'll be my negtive one
 L - 我将为你的导数，你将为我负导数
 L 89.8 As you change you amplitude,I change my phase
 L - 当你改变振幅，我改变相位
 L 93.9 We can oscillate freely in the external space
 L - 我们可在外界空间自由震荡
 L 98.4 As we change our period and costant at hand
 L - 当我们改变周期和手边常数
 L 102.5 We travel from the origin to infinity
 L - 我们从原点驶向无尽
  
 [Para N5 段落5]
 L 106.7 It's you sine,and you cosine
 L - 是你，正弦，余弦
 L 111.1 Who make charming music around the world
 L - 创造了世间动人的音乐
 L 115.3 It's you tangent,cotangent
 L - 是你，正切，余切
 L 119.5 Who proclaim the true meaning of centrosymmetry
 L - 揭示了中心对称的真谛
  
 [Para -- 间奏]
 L 124.2 - - - - - - -
  
 [Para N6 段落6]
 L 166.7 You wanna measure width of a river,height of a tower
 L - 你想测量河宽及塔高
 L 169.2 You scratch your head which cost you more than an hour
 L - 你抓耳挠腮一个多小时也想不出
 L 171.2 You don't need to ask any "gods" or "master" for help
 L - 你无需向dalao们请教
 L 173.5 This group of formulas are gonna help you solve
 L - 这一组公式将帮你解决
 L 175.6 sin(α+β) = sinα•cosβ + cosα•sinβ
 L - sin(α+β) = sinα•cosβ + cosα•sinβ
 L 179.0 cos(α+β) = cosα•cosβ - sinα•sinβ
 L - cos(α+β) = cosα•cosβ - sinα•sinβ
 L 182.2 tan(α+β) = (tanα + tanβ) / (1 - tanα•tanβ)
 L - tan(α+β) = (tanα + tanβ) / (1 - tanα•tanβ)
 L 186.0 sin(α-β) = sinα•cosβ - cosα•sinβ
 L - sin(α-β) = sinα•cosβ - cosα•sinβ
 L 189.8 cos(α-β) = cosα•cosβ + sinα•sinβ
 L - cos(α-β) = cosα•cosβ + sinα•sinβ
 L 192.9 tan(α-β) = (tanα - tanβ) / (1 + tanα•tanβ)
 L - tan(α-β) = (tanα - tanβ)/(1 + tanα•tanβ) 
 L 197.8 As you come across a right triangle you fell easy to sovle
 L - 当你遇到直角三角形很容易解
 L 200.3 But an obtuse triange's gonna make you feel confused
 L - 但钝角三角形使你感到困惑
 L 202.5 Don't worry about what you do
 L - 无须担心
 L 203.8 There are always means to solve
 L - 总有解决方法
 L 204.7 As long as you master the sine cosine law
 L - 只要你掌握了正余弦定理
  
 [Para N7 段落7]
 L 209.6 At this momnet I've got nothing to say
 L - 此刻我无以言表
 L 213.9 As trig-functions rain down upon me
 L - 当时三角函数犹雨点般落向我
 L 218.4 At this moment I've got nothing to say
 L - 此刻我无以言表
 L 222.5 Let's sing a song about trig-functions
 L - 让我们唱起三角函数歌谣吧
 L 226.7 Long live the trigonometric functions
 L - 三角函数万岁
  
 [Final 233.5]
  

Compilation Info

 0501/lyric.txt @ L1-L2 
1> !dataver 201804
· Notice: Line 1 - The version of file is 201804, while the latest is 201805. This probably means that the file is outdated.
2> [Info]

1\|	[ti:trigonometric functions]
2\|	[ar:天儿]
3\|	[al:科学狂想曲]
4\|	[by:Music Archive]
5\|	[offset:0]
6\|	[00:00.000]trigonometric functions - 天儿
7\|	[00:10.400]when you first study math about 1234
8\|	[00:13.000]当你初学数学中的1234
9\|	[00:13.001]first study equation about xyzt
10\|	[00:15.100]初学方程中的XYZT
11\|	[00:15.101]It will help you to think in a logical way
12\|	[00:16.900]它将帮助你进行逻辑思考
13\|	[00:16.901]When you sing sine,cosine,cosine,tangent
14\|	[00:19.200]当你唱起正弦，余弦，余弦，正切
15\|	[00:19.201]Sine,cosine,tangent,cotangent
16\|	[00:21.300]正弦，余弦，正切，余切
17\|	[00:21.301]Sine,cosine,..,secant,cosecant
18\|	[00:23.500]正弦，余弦，正割，余割
19\|	[00:23.501][03:42.501]Let's sing a song about trig-functions
20\|	[00:26.000]让我们唱起三角函数的歌谣吧
21\|	[00:26.001][00:49.301][01:08.401][01:46.701][02:04.201][02:46.700][03:29.601][03:53.501]
22\|	[00:26.002][00:27.800]sin(2π+α) = sinα
23\|	[00:27.801][00:29.900]cos(2π+α) = cosα
24\|	[00:29.901][00:32.000]tan(2π+α) = tanα
25\|	[00:32.001]which is induction formula1,and induction formula 2
26\|	[00:34.200]这是诱导公式归类1，下面是诱导公式归类2
27\|	[00:34.201][00:36.600]sin(π+α) = -sinα
28\|	[00:36.601][00:38.700]cos(π+α) = -cosα
29\|	[00:38.701][00:40.600]tan(π+α) = tanα
30\|	[00:40.601][00:42.700]sin(π－α) = sinα
31\|	[00:42.701][00:45.000]cos(π－α) = -cosα
32\|	[00:45.001][00:47.000]tan(π－α) = -tanα
33\|	[00:47.001]These are all those "name donot -change"
34\|	[00:49.300]这些均为“函数名不变”
35\|	[00:49.302]As pi goes to half pi the difference shall be huge
36\|	[00:51.500]当π成为π/2是变化会很大
37\|	[00:51.501][00:53.400]sin(π/2+α) = cosα
38\|	[00:53.401][00:55.500]cos(π/2-α) = sinα
39\|	[00:55.501][00:57.700]sin(π/2-α) = cosα
40\|	[00:57.701][00:59.900]cos(π/2+α) = -sinα
41\|	[00:59.901][01:02.100]tan(π/2+α) = -cotα
42\|	[01:02.101][01:08.400]tan(π/2-α) = cotα
43\|	[01:08.402]That is to say the odds will change, evens are conserved
44\|	[01:12.700]这就是说：奇变偶不变
45\|	[01:12.701]The notations that they get depend on where they are
46\|	[01:16.700]符号看象限
47\|	[01:16.701]But no matter where you are, I've gotta say that
48\|	[01:21.300]但不论你在哪，我将会说
49\|	[01:21.301]If you were my sine curve,I'd be your cosine curve
50\|	[01:25.800]你若为正弦曲线，我愿做余弦曲线
51\|	[01:25.801]I'll be your derivative,you'll be my negtive one
52\|	[01:29.800]我将为你的导数，你将为我负导数
53\|	[01:29.801]As you change you amplitude,I change my phase
54\|	[01:33.900]当你改变振幅，我改变相位
55\|	[01:33.901]We can oscillate freely in the external space
56\|	[01:38.400]我们可在外界空间自由震荡
57\|	[01:38.401]As we change our period and costant at hand
58\|	[01:42.500]当我们改变周期和手边常数
59\|	[01:42.501]We travel from the origin to infinity
60\|	[01:46.700]我们从原点驶向无尽
61\|	[01:46.702]It's you sine,and you cosine
62\|	[01:51.100]是你，正弦，余弦
63\|	[01:51.101]Who make charming music around the world
64\|	[01:55.300]创造了世间动人的音乐
65\|	[01:55.301]It's you tangent,cotangent
66\|	[01:59.500]是你，正切，余切
67\|	[01:59.501]Who proclaim the true meaning of centrosymmetry
68\|	[02:04.200]揭示了中心对称的真谛
69\|	[02:04.202]- Break -
70\|	[02:46.701]You wanna measure width of a river,height of a tower
71\|	[02:49.200]你想测量河宽及塔高
72\|	[02:49.201]You scratch your head which cost you more than an hour
73\|	[02:51.200]你抓耳挠腮一个多小时也想不出
74\|	[02:51.201]You don't need to ask any "gods" or "master" for help
75\|	[02:53.500]你无需向dalao们请教
76\|	[02:53.501]This group of formulas are gonna help you solve
77\|	[02:55.600]这一组公式将帮你解决
78\|	[02:55.601][02:59.000]sin(α+β) = sinα•cosβ + cosα•sinβ
79\|	[02:59.001][03:02.200]cos(α+β) = cosα•cosβ - sinα•sinβ
80\|	[03:02.201][03:06.000]tan(α+β) = (tanα + tanβ) / (1 - tanα•tanβ)
81\|	[03:06.001][03:09.800]sin(α-β) = sinα•cosβ - cosα•sinβ
82\|	[03:09.801][03:12.900]cos(α-β) = cosα•cosβ + sinα•sinβ
83\|	[03:12.901]tan(α-β) = (tanα - tanβ) / (1 + tanα•tanβ)
84\|	[03:17.800]tan(α-β) = (tanα - tanβ)/(1 + tanα•tanβ)
85\|	[03:17.801]As you come across a right triangle you fell easy to sovle
86\|	[03:20.300]当你遇到直角三角形很容易解
87\|	[03:20.301]But an obtuse triange's gonna make you feel confused
88\|	[03:22.500]但钝角三角形使你感到困惑
89\|	[03:22.501]Don't worry about what you do
90\|	[03:23.800]无须担心
91\|	[03:23.801]There are always means to solve
92\|	[03:24.700]总有解决方法
93\|	[03:24.701]As long as you master the sine cosine law
94\|	[03:29.600]只要你掌握了正余弦定理
95\|	[03:29.602]At this momnet I've got nothing to say
96\|	[03:33.900][03:42.500]此刻我无以言表
97\|	[03:33.901]As trig-functions rain down upon me
98\|	[03:38.400]当时三角函数犹雨点般落向我
99\|	[03:38.401]At this moment I've got nothing to say
100\|	[03:46.700]让我们唱起三角函数歌谣吧
101\|	[03:46.701]Long live the trigonometric functions
102\|	[03:53.500]三角函数万岁
103\|	[03:53.502]- End -
104\|

1\|	[ti:trigonometric functions]
2\|	[ar:天儿]
3\|	[txmp_la:天儿]
4\|	[txmp_ma:天儿]
5\|	[al:科学狂想曲]
6\|	[by:Music Archive]
7\|	[offset:0]
8\|	[00:00.000]trigonometric functions - 天儿
9\|	[txmp_para:N1 段落1]
10\|	[00:10.400]when you first study math about 1234
11\|	[00:13.000]当你初学数学中的1234
12\|	[00:13.001]first study equation about xyzt
13\|	[00:15.100]初学方程中的XYZT
14\|	[00:15.101]It will help you to think in a logical way
15\|	[00:16.900]它将帮助你进行逻辑思考
16\|	[00:16.901]When you sing sine,cosine,cosine,tangent
17\|	[00:19.200]当你唱起正弦，余弦，余弦，正切
18\|	[00:19.201]Sine,cosine,tangent,cotangent
19\|	[00:21.300]正弦，余弦，正切，余切
20\|	[00:21.301]Sine,cosine,..,secant,cosecant
21\|	[00:23.500]正弦，余弦，正割，余割
22\|	[00:23.501]Let's sing a song about trig-functions
23\|	[00:26.000]让我们唱起三角函数的歌谣吧
24\|	[00:26.001]
25\|	[txmp_para:N2 段落2]
26\|	[00:26.002]sin(2π+α) = sinα
27\|	[00:27.800]sin(2π+α) = sinα
28\|	[00:27.801]cos(2π+α) = cosα
29\|	[00:29.900]cos(2π+α) = cosα
30\|	[00:29.901]tan(2π+α) = tanα
31\|	[00:32.000]tan(2π+α) = tanα
32\|	[00:32.001]which is induction formula1,and induction formula 2
33\|	[00:34.200]这是诱导公式归类1，下面是诱导公式归类2
34\|	[00:34.201]sin(π+α) = -sinα
35\|	[00:36.600]sin(π+α) = -sinα
36\|	[00:36.601]cos(π+α) = -cosα
37\|	[00:38.700]cos(π+α) = -cosα
38\|	[00:38.701]tan(π+α) = tanα
39\|	[00:40.600]tan(π+α) = tanα
40\|	[00:40.601]sin(π－α) = sinα
41\|	[00:42.700]sin(π－α) = sinα
42\|	[00:42.701]cos(π－α) = -cosα
43\|	[00:45.000]cos(π－α) = -cosα
44\|	[00:45.001]tan(π－α) = -tanα
45\|	[00:47.000]tan(π－α) = -tanα
46\|	[00:47.001]These are all those "name donot -change"
47\|	[00:49.300]这些均为“函数名不变”
48\|	[00:49.301]
49\|	[txmp_para:N3 段落3]
50\|	[00:49.302]As pi goes to half pi the difference shall be huge
51\|	[00:51.500]当π成为π/2是变化会很大
52\|	[00:51.501]sin(π/2+α) = cosα
53\|	[00:53.400]sin(π/2+α) = cosα
54\|	[00:53.401]cos(π/2-α) = sinα
55\|	[00:55.500]cos(π/2-α) = sinα
56\|	[00:55.501]sin(π/2-α) = cosα
57\|	[00:57.700]sin(π/2-α) = cosα
58\|	[00:57.701]cos(π/2+α) = -sinα
59\|	[00:59.900]cos(π/2+α) = -sinα
60\|	[00:59.901]tan(π/2+α) = -cotα
61\|	[01:02.100]tan(π/2+α) = -cotα
62\|	[01:02.101]tan(π/2-α) = cotα
63\|	[01:08.400]tan(π/2-α) = cotα
64\|	[01:08.401]
65\|	[txmp_para:N4 段落4]
66\|	[01:08.402]That is to say the odds will change, evens are conserved
67\|	[01:12.700]这就是说：奇变偶不变
68\|	[01:12.701]The notations that they get depend on where they are
69\|	[01:16.700]符号看象限
70\|	[01:16.701]But no matter where you are, I've gotta say that
71\|	[01:21.300]但不论你在哪，我将会说
72\|	[01:21.301]If you were my sine curve,I'd be your cosine curve
73\|	[01:25.800]你若为正弦曲线，我愿做余弦曲线
74\|	[01:25.801]I'll be your derivative,you'll be my negtive one
75\|	[01:29.800]我将为你的导数，你将为我负导数
76\|	[01:29.801]As you change you amplitude,I change my phase
77\|	[01:33.900]当你改变振幅，我改变相位
78\|	[01:33.901]We can oscillate freely in the external space
79\|	[01:38.400]我们可在外界空间自由震荡
80\|	[01:38.401]As we change our period and costant at hand
81\|	[01:42.500]当我们改变周期和手边常数
82\|	[01:42.501]We travel from the origin to infinity
83\|	[01:46.700]我们从原点驶向无尽
84\|	[01:46.701]
85\|	[txmp_para:N5 段落5]
86\|	[01:46.702]It's you sine,and you cosine
87\|	[01:51.100]是你，正弦，余弦
88\|	[01:51.101]Who make charming music around the world
89\|	[01:55.300]创造了世间动人的音乐
90\|	[01:55.301]It's you tangent,cotangent
91\|	[01:59.500]是你，正切，余切
92\|	[01:59.501]Who proclaim the true meaning of centrosymmetry
93\|	[02:04.200]揭示了中心对称的真谛
94\|	[02:04.201]
95\|	[txmp_para:-- 间奏]
96\|	[02:04.202]- Break -
97\|	[02:46.700]
98\|	[txmp_para:N6 段落6]
99\|	[02:46.701]You wanna measure width of a river,height of a tower
100\|	[02:49.200]你想测量河宽及塔高
101\|	[02:49.201]You scratch your head which cost you more than an hour
102\|	[02:51.200]你抓耳挠腮一个多小时也想不出
103\|	[02:51.201]You don't need to ask any "gods" or "master" for help
104\|	[02:53.500]你无需向dalao们请教
105\|	[02:53.501]This group of formulas are gonna help you solve
106\|	[02:55.600]这一组公式将帮你解决
107\|	[02:55.601]sin(α+β) = sinα•cosβ + cosα•sinβ
108\|	[02:59.000]sin(α+β) = sinα•cosβ + cosα•sinβ
109\|	[02:59.001]cos(α+β) = cosα•cosβ - sinα•sinβ
110\|	[03:02.200]cos(α+β) = cosα•cosβ - sinα•sinβ
111\|	[03:02.201]tan(α+β) = (tanα + tanβ) / (1 - tanα•tanβ)
112\|	[03:06.000]tan(α+β) = (tanα + tanβ) / (1 - tanα•tanβ)
113\|	[03:06.001]sin(α-β) = sinα•cosβ - cosα•sinβ
114\|	[03:09.800]sin(α-β) = sinα•cosβ - cosα•sinβ
115\|	[03:09.801]cos(α-β) = cosα•cosβ + sinα•sinβ
116\|	[03:12.900]cos(α-β) = cosα•cosβ + sinα•sinβ
117\|	[03:12.901]tan(α-β) = (tanα - tanβ) / (1 + tanα•tanβ)
118\|	[03:17.800]tan(α-β) = (tanα - tanβ)/(1 + tanα•tanβ)
119\|	[03:17.801]As you come across a right triangle you fell easy to sovle
120\|	[03:20.300]当你遇到直角三角形很容易解
121\|	[03:20.301]But an obtuse triange's gonna make you feel confused
122\|	[03:22.500]但钝角三角形使你感到困惑
123\|	[03:22.501]Don't worry about what you do
124\|	[03:23.800]无须担心
125\|	[03:23.801]There are always means to solve
126\|	[03:24.700]总有解决方法
127\|	[03:24.701]As long as you master the sine cosine law
128\|	[03:29.600]只要你掌握了正余弦定理
129\|	[03:29.601]
130\|	[txmp_para:N7 段落7]
131\|	[03:29.602]At this momnet I've got nothing to say
132\|	[03:33.900]此刻我无以言表
133\|	[03:33.901]As trig-functions rain down upon me
134\|	[03:38.400]当时三角函数犹雨点般落向我
135\|	[03:38.401]At this moment I've got nothing to say
136\|	[03:42.500]此刻我无以言表
137\|	[03:42.501]Let's sing a song about trig-functions
138\|	[03:46.700]让我们唱起三角函数歌谣吧
139\|	[03:46.701]Long live the trigonometric functions
140\|	[03:53.500]三角函数万岁
141\|	[03:53.501]
142\|	[txmp_final:03:53.500]
143\|	[03:53.502]- End -
144\|

1\|	!dataver 201804
2\|	[Info]
3\|	N trigonometric functions
4\|	S 天儿
5\|	C 科学狂想曲
6\|	LA 天儿
7\|	MA 天儿
8\|	G1 #3949AB
9\|	G2 #1976D2
10\|	O https://music.163.com/#/song?id=34380194
11\|
12\|	[Para N1 段落1]
13\|	L 10.4 when you first study math about 1234
14\|	L - 当你初学数学中的1234
15\|	L 13.0 first study equation about xyzt
16\|	L - 初学方程中的XYZT
17\|	L 15.1 It will help you to think in a logical way
18\|	L - 它将帮助你进行逻辑思考
19\|	L 16.9 When you sing sine,cosine,cosine,tangent
20\|	L - 当你唱起正弦，余弦，余弦，正切
21\|	L 19.2 Sine,cosine,tangent,cotangent
22\|	L - 正弦，余弦，正切，余切
23\|	L 21.3 Sine,cosine,..,secant,cosecant
24\|	L - 正弦，余弦，正割，余割
25\|	L 23.5 Let's sing a song about trig-functions
26\|	L - 让我们唱起三角函数的歌谣吧
27\|
28\|	[Para N2 段落2]
29\|	L 26.0 sin(2π+α) = sinα
30\|	L - sin(2π+α) = sinα
31\|	L 27.8 cos(2π+α) = cosα
32\|	L - cos(2π+α) = cosα
33\|	L 29.9 tan(2π+α) = tanα
34\|	L - tan(2π+α) = tanα
35\|	L 32.0 which is induction formula1,and induction formula 2
36\|	L - 这是诱导公式归类1，下面是诱导公式归类2
37\|	L 34.2 sin(π+α) = -sinα
38\|	L - sin(π+α) = -sinα
39\|	L 36.6 cos(π+α) = -cosα
40\|	L - cos(π+α) = -cosα
41\|	L 38.7 tan(π+α) = tanα
42\|	L - tan(π+α) = tanα
43\|	L 40.6 sin(π－α) = sinα
44\|	L - sin(π－α) = sinα
45\|	L 42.7 cos(π－α) = -cosα
46\|	L - cos(π－α) = -cosα
47\|	L 45.0 tan(π－α) = -tanα
48\|	L - tan(π－α) = -tanα
49\|	L 47.0 These are all those "name donot -change"
50\|	L - 这些均为“函数名不变”
51\|
52\|	[Para N3 段落3]
53\|	L 49.3 As pi goes to half pi the difference shall be huge
54\|	L - 当π成为π/2是变化会很大
55\|	L 51.5 sin(π/2+α) = cosα
56\|	L - sin(π/2+α) = cosα
57\|	L 53.4 cos(π/2-α) = sinα
58\|	L - cos(π/2-α) = sinα
59\|	L 55.5 sin(π/2-α) = cosα
60\|	L - sin(π/2-α) = cosα
61\|	L 57.7 cos(π/2+α) = -sinα
62\|	L - cos(π/2+α) = -sinα
63\|	L 59.9 tan(π/2+α) = -cotα
64\|	L - tan(π/2+α) = -cotα
65\|	L 62.1 tan(π/2-α) = cotα
66\|	L - tan(π/2-α) = cotα
67\|
68\|	[Para N4 段落4]
69\|	L 68.4 That is to say the odds will change, evens are conserved
70\|	L - 这就是说：奇变偶不变
71\|	L 72.7 The notations that they get depend on where they are
72\|	L - 符号看象限
73\|	L 76.7 But no matter where you are, I've gotta say that
74\|	L - 但不论你在哪，我将会说
75\|	L 81.3 If you were my sine curve,I'd be your cosine curve
76\|	L - 你若为正弦曲线，我愿做余弦曲线
77\|	L 85.8 I'll be your derivative,you'll be my negtive one
78\|	L - 我将为你的导数，你将为我负导数
79\|	L 89.8 As you change you amplitude,I change my phase
80\|	L - 当你改变振幅，我改变相位
81\|	L 93.9 We can oscillate freely in the external space
82\|	L - 我们可在外界空间自由震荡
83\|	L 98.4 As we change our period and costant at hand
84\|	L - 当我们改变周期和手边常数
85\|	L 102.5 We travel from the origin to infinity
86\|	L - 我们从原点驶向无尽
87\|
88\|	[Para N5 段落5]
89\|	L 106.7 It's you sine,and you cosine
90\|	L - 是你，正弦，余弦
91\|	L 111.1 Who make charming music around the world
92\|	L - 创造了世间动人的音乐
93\|	L 115.3 It's you tangent,cotangent
94\|	L - 是你，正切，余切
95\|	L 119.5 Who proclaim the true meaning of centrosymmetry
96\|	L - 揭示了中心对称的真谛
97\|
98\|	[Para -- 间奏]
99\|	L 124.2 - - - - - - -
100\|
101\|	[Para N6 段落6]
102\|	L 166.7 You wanna measure width of a river,height of a tower
103\|	L - 你想测量河宽及塔高
104\|	L 169.2 You scratch your head which cost you more than an hour
105\|	L - 你抓耳挠腮一个多小时也想不出
106\|	L 171.2 You don't need to ask any "gods" or "master" for help
107\|	L - 你无需向dalao们请教
108\|	L 173.5 This group of formulas are gonna help you solve
109\|	L - 这一组公式将帮你解决
110\|	L 175.6 sin(α+β) = sinα•cosβ + cosα•sinβ
111\|	L - sin(α+β) = sinα•cosβ + cosα•sinβ
112\|	L 179.0 cos(α+β) = cosα•cosβ - sinα•sinβ
113\|	L - cos(α+β) = cosα•cosβ - sinα•sinβ
114\|	L 182.2 tan(α+β) = (tanα + tanβ) / (1 - tanα•tanβ)
115\|	L - tan(α+β) = (tanα + tanβ) / (1 - tanα•tanβ)
116\|	L 186.0 sin(α-β) = sinα•cosβ - cosα•sinβ
117\|	L - sin(α-β) = sinα•cosβ - cosα•sinβ
118\|	L 189.8 cos(α-β) = cosα•cosβ + sinα•sinβ
119\|	L - cos(α-β) = cosα•cosβ + sinα•sinβ
120\|	L 192.9 tan(α-β) = (tanα - tanβ) / (1 + tanα•tanβ)
121\|	L - tan(α-β) = (tanα - tanβ)/(1 + tanα•tanβ)
122\|	L 197.8 As you come across a right triangle you fell easy to sovle
123\|	L - 当你遇到直角三角形很容易解
124\|	L 200.3 But an obtuse triange's gonna make you feel confused
125\|	L - 但钝角三角形使你感到困惑
126\|	L 202.5 Don't worry about what you do
127\|	L - 无须担心
128\|	L 203.8 There are always means to solve
129\|	L - 总有解决方法
130\|	L 204.7 As long as you master the sine cosine law
131\|	L - 只要你掌握了正余弦定理
132\|
133\|	[Para N7 段落7]
134\|	L 209.6 At this momnet I've got nothing to say
135\|	L - 此刻我无以言表
136\|	L 213.9 As trig-functions rain down upon me
137\|	L - 当时三角函数犹雨点般落向我
138\|	L 218.4 At this moment I've got nothing to say
139\|	L - 此刻我无以言表
140\|	L 222.5 Let's sing a song about trig-functions
141\|	L - 让我们唱起三角函数歌谣吧
142\|	L 226.7 Long live the trigonometric functions
143\|	L - 三角函数万岁
144\|
145\|	[Final 233.5]
146\|

1>	!dataver 201804
·	Notice: Line 1 - The version of file is 201804, while the latest is 201805. This probably means that the file is outdated.
2>	[Info]