证明以下等式(tanπ/9)^2+(tan2π/9)^2+(tan4π/9)^2=33[tan(π/9)]^2[tan(2π/9)]^2[tan(4π/9)]^2=3.

来源：学生作业帮助网编辑：作业帮时间：2024/09/08 04:23:38

x��)�{��ٌ�'��>��|m��=�%�y��-5㌴Al#d� �ckl �j��qFZ`�*�Ƶ5ֳI*��bX�X��I�V��ΆξDҢ�lhna��U�El��2�V(E.@��!��:f��BH_��$�+�FQ��Նjd�A��c�.V?d�1�p-�C�� g�K;�p5��=Ovt>m�}�|��5��~O'T��~qAb�(�_�

证明以下等式(tanπ/9)^2+(tan2π/9)^2+(tan4π/9)^2=33[tan(π/9)]^2*[tan(2π/9)]^2*[tan(4π/9)]^2=3.
证明以下等式
(tanπ/9)^2+(tan2π/9)^2+(tan4π/9)^2=33
[tan(π/9)]^2*[tan(2π/9)]^2*[tan(4π/9)]^2=3.

证明以下等式(tanπ/9)^2+(tan2π/9)^2+(tan4π/9)^2=33[tan(π/9)]^2*[tan(2π/9)]^2*[tan(4π/9)]^2=3.
[tan(π/9)]² * [tan(2π/9)]² * [tan(4π/9)]²
= [tan(π/9) * tan(2π/9) * tan(4π/9)]²
= [tan(π/9) * tan(π/3 - π/9) * tan(π/3 + π/9)]²
= [tan(π/9) * (√3 - tanπ/9)/(1 + √3tanπ/9) * (√3 + tanπ/9)/(1 - √3tanπ/9)]²
= {tan(π/9) * [3 - (tanπ/9)²]/[1 - 3(tanπ/9)²]}²
= [3tan(π/9) - (tanπ/9)^3]/[1 - 3(tanπ/9)²]²
= [tan(π/3)]² （三倍角公式）
= 3

证明以下等式(tanπ/9)^2+(tan2π/9)^2+(tan4π/9)^2=33[tan(π/9)]^2*[tan(2π/9)]^2*[tan(4π/9)]^2=3. 证明以下等式, 写出以下等式的证明过程如下证明以下等式?其中x~N(0,1)等式关于三角函数的等式证明求证：三角形ABC中,tan(A/2)·tan(B/2)+tan(B/2)·tan(C/2)+tan(A/2)·tan(C/2)=1 证明tan(α)*tan(β)+tan(β)*tan(γ)+tan(α)*tan(γ)=1 (α+β+γ=π/2)详细一点证明tanαtanβ+tanαtanγ+tanβtanγ=1,α+β+γ=π/2 证明 tanα=2tanβ 已知角A角B角C是三角形ABC的内角,求证,tan(A/2)*tan(B/2)+tan(B/2)*tan(C/2)+ta 证明等式等式证明, tan(x/2+ π4)+tan(x/2- π/4)=2tanx证明证明：tan（α+π/4）+tan（α+3π/4）=2tan2α 证明tanα+secα=tan(α/2+π/4) 证明1+sinx/cosx=tan(π/4+x/2) 证明sec x+tanx=tan(π/4 +x/2) 请证明以下等式可否不用数学归纳法而用演绎法证明：1^2+2^2+3^2+...+n^2=n(n+1)(2n+1) 若tan(α/2)=[tan(β/2)]^3,tanβ=2tanφ,证明α+β=2kπ+2φ(k∈Z)