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受欢迎的 三角函数 >

sin(θ)=0.6367+0.1*cos(θ)

  • 初等代数
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解答

sin(θ)=0.6367+0.1⋅cos(θ)

解答

θ=2.55514…+2πn,θ=0.78578…+2πn
+1
度数
θ=146.39879…∘+360∘n,θ=45.02238…∘+360∘n
求解步骤
sin(θ)=0.6367+0.1cos(θ)
两边进行平方sin2(θ)=(0.6367+0.1cos(θ))2
两边减去 (0.6367+0.1cos(θ))2sin2(θ)−0.40538689−0.12734cos(θ)−0.01cos2(θ)=0
使用三角恒等式改写
−0.40538689+sin2(θ)−0.01cos2(θ)−0.12734cos(θ)
使用毕达哥拉斯恒等式: cos2(x)+sin2(x)=1sin2(x)=1−cos2(x)=−0.40538689+1−cos2(θ)−0.01cos2(θ)−0.12734cos(θ)
化简 −0.40538689+1−cos2(θ)−0.01cos2(θ)−0.12734cos(θ):−1.01cos2(θ)−0.12734cos(θ)+0.59461311
−0.40538689+1−cos2(θ)−0.01cos2(θ)−0.12734cos(θ)
同类项相加:−cos2(θ)−0.01cos2(θ)=−1.01cos2(θ)=−0.40538689+1−1.01cos2(θ)−0.12734cos(θ)
数字相加/相减:−0.40538689+1=0.59461311=−1.01cos2(θ)−0.12734cos(θ)+0.59461311
=−1.01cos2(θ)−0.12734cos(θ)+0.59461311
0.59461311−0.12734cos(θ)−1.01cos2(θ)=0
用替代法求解
0.59461311−0.12734cos(θ)−1.01cos2(θ)=0
令:cos(θ)=u0.59461311−0.12734u−1.01u2=0
0.59461311−0.12734u−1.01u2=0:u=−2.020.12734+2.41845244​​,u=2.022.41845244​−0.12734​
0.59461311−0.12734u−1.01u2=0
改写成标准形式 ax2+bx+c=0−1.01u2−0.12734u+0.59461311=0
使用求根公式求解
−1.01u2−0.12734u+0.59461311=0
二次方程求根公式:
若 a=−1.01,b=−0.12734,c=0.59461311u1,2​=2(−1.01)−(−0.12734)±(−0.12734)2−4(−1.01)⋅0.59461311​​
u1,2​=2(−1.01)−(−0.12734)±(−0.12734)2−4(−1.01)⋅0.59461311​​
(−0.12734)2−4(−1.01)⋅0.59461311​=2.41845244​
(−0.12734)2−4(−1.01)⋅0.59461311​
使用法则 −(−a)=a=(−0.12734)2+4⋅1.01⋅0.59461311​
使用指数法则: (−a)n=an,若 n 是偶数(−0.12734)2=0.127342=0.127342+4⋅0.59461311⋅1.01​
数字相乘:4⋅1.01⋅0.59461311=2.40223…=0.127342+2.40223…​
0.127342=0.0162154756=0.0162154756+2.40223…​
数字相加:0.0162154756+2.40223…=2.41845244=2.41845244​
u1,2​=2(−1.01)−(−0.12734)±2.41845244​​
将解分隔开u1​=2(−1.01)−(−0.12734)+2.41845244​​,u2​=2(−1.01)−(−0.12734)−2.41845244​​
u=2(−1.01)−(−0.12734)+2.41845244​​:−2.020.12734+2.41845244​​
2(−1.01)−(−0.12734)+2.41845244​​
去除括号: (−a)=−a,−(−a)=a=−2⋅1.010.12734+2.41845244​​
数字相乘:2⋅1.01=2.02=−2.020.12734+2.41845244​​
使用分式法则: −ba​=−ba​=−2.020.12734+2.41845244​​
u=2(−1.01)−(−0.12734)−2.41845244​​:2.022.41845244​−0.12734​
2(−1.01)−(−0.12734)−2.41845244​​
去除括号: (−a)=−a,−(−a)=a=−2⋅1.010.12734−2.41845244​​
数字相乘:2⋅1.01=2.02=−2.020.12734−2.41845244​​
使用分式法则: −b−a​=ba​0.12734−2.41845244​=−(2.41845244​−0.12734)=2.022.41845244​−0.12734​
二次方程组的解是:u=−2.020.12734+2.41845244​​,u=2.022.41845244​−0.12734​
u=cos(θ)代回cos(θ)=−2.020.12734+2.41845244​​,cos(θ)=2.022.41845244​−0.12734​
cos(θ)=−2.020.12734+2.41845244​​,cos(θ)=2.022.41845244​−0.12734​
cos(θ)=−2.020.12734+2.41845244​​:θ=arccos(−2.020.12734+2.41845244​​)+2πn,θ=−arccos(−2.020.12734+2.41845244​​)+2πn
cos(θ)=−2.020.12734+2.41845244​​
使用反三角函数性质
cos(θ)=−2.020.12734+2.41845244​​
cos(θ)=−2.020.12734+2.41845244​​的通解cos(x)=−a⇒x=arccos(−a)+2πn,x=−arccos(−a)+2πnθ=arccos(−2.020.12734+2.41845244​​)+2πn,θ=−arccos(−2.020.12734+2.41845244​​)+2πn
θ=arccos(−2.020.12734+2.41845244​​)+2πn,θ=−arccos(−2.020.12734+2.41845244​​)+2πn
cos(θ)=2.022.41845244​−0.12734​:θ=arccos(2.022.41845244​−0.12734​)+2πn,θ=2π−arccos(2.022.41845244​−0.12734​)+2πn
cos(θ)=2.022.41845244​−0.12734​
使用反三角函数性质
cos(θ)=2.022.41845244​−0.12734​
cos(θ)=2.022.41845244​−0.12734​的通解cos(x)=a⇒x=arccos(a)+2πn,x=2π−arccos(a)+2πnθ=arccos(2.022.41845244​−0.12734​)+2πn,θ=2π−arccos(2.022.41845244​−0.12734​)+2πn
θ=arccos(2.022.41845244​−0.12734​)+2πn,θ=2π−arccos(2.022.41845244​−0.12734​)+2πn
合并所有解θ=arccos(−2.020.12734+2.41845244​​)+2πn,θ=−arccos(−2.020.12734+2.41845244​​)+2πn,θ=arccos(2.022.41845244​−0.12734​)+2πn,θ=2π−arccos(2.022.41845244​−0.12734​)+2πn
将解代入原方程进行验证
将它们代入 sin(θ)=0.6367+0.1cos(θ)检验解是否符合
去除与方程不符的解。
检验 arccos(−2.020.12734+2.41845244​​)+2πn的解:真
arccos(−2.020.12734+2.41845244​​)+2πn
代入 n=1arccos(−2.020.12734+2.41845244​​)+2π1
对于 sin(θ)=0.6367+0.1cos(θ)代入θ=arccos(−2.020.12734+2.41845244​​)+2π1sin(arccos(−2.020.12734+2.41845244​​)+2π1)=0.6367+0.1cos(arccos(−2.020.12734+2.41845244​​)+2π1)
整理后得0.55340…=0.55340…
⇒真
检验 −arccos(−2.020.12734+2.41845244​​)+2πn的解:假
−arccos(−2.020.12734+2.41845244​​)+2πn
代入 n=1−arccos(−2.020.12734+2.41845244​​)+2π1
对于 sin(θ)=0.6367+0.1cos(θ)代入θ=−arccos(−2.020.12734+2.41845244​​)+2π1sin(−arccos(−2.020.12734+2.41845244​​)+2π1)=0.6367+0.1cos(−arccos(−2.020.12734+2.41845244​​)+2π1)
整理后得−0.55340…=0.55340…
⇒假
检验 arccos(2.022.41845244​−0.12734​)+2πn的解:真
arccos(2.022.41845244​−0.12734​)+2πn
代入 n=1arccos(2.022.41845244​−0.12734​)+2π1
对于 sin(θ)=0.6367+0.1cos(θ)代入θ=arccos(2.022.41845244​−0.12734​)+2π1sin(arccos(2.022.41845244​−0.12734​)+2π1)=0.6367+0.1cos(arccos(2.022.41845244​−0.12734​)+2π1)
整理后得0.70738…=0.70738…
⇒真
检验 2π−arccos(2.022.41845244​−0.12734​)+2πn的解:假
2π−arccos(2.022.41845244​−0.12734​)+2πn
代入 n=12π−arccos(2.022.41845244​−0.12734​)+2π1
对于 sin(θ)=0.6367+0.1cos(θ)代入θ=2π−arccos(2.022.41845244​−0.12734​)+2π1sin(2π−arccos(2.022.41845244​−0.12734​)+2π1)=0.6367+0.1cos(2π−arccos(2.022.41845244​−0.12734​)+2π1)
整理后得−0.70738…=0.70738…
⇒假
θ=arccos(−2.020.12734+2.41845244​​)+2πn,θ=arccos(2.022.41845244​−0.12734​)+2πn
以小数形式表示解θ=2.55514…+2πn,θ=0.78578…+2πn

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sec(x)+tan(x)=sqrt(3)sec(x)+tan(x)=3​cos(x)= 10/21cos(x)=2110​sqrt(3)tan^2(θ)+2tan(θ)-sqrt(3)=03​tan2(θ)+2tan(θ)−3​=0sec(x)= 25/7sec(x)=725​sin(x/2)= 1/2 sin(x)sin(2x​)=21​sin(x)
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