Tham khảo:

a) Ta có: \(\widehat {AMB} + \widehat {AMC} = {180^o}\)

\( \Rightarrow \cos \widehat {AMB} =  - \cos \widehat {AMC}\)

Hay \(\cos \widehat {AMB} + \cos \widehat {AMC} = 0\)

b) Áp dụng định lí cos trong tam giác AMB ta có:

 \(\begin{array}{l}A{B^2} = M{A^2} + M{B^2} - 2MA.MB\;\cos \widehat {AMB}\\ \Leftrightarrow M{A^2} + M{B^2} - A{B^2} = 2MA.MB\;\cos \widehat {AMB}\;\;(1)\end{array}\)

Tương tự, Áp dụng định lí cos trong tam giác AMB ta được:

\(\begin{array}{l}A{C^2} = M{A^2} + M{C^2} - 2MA.MC\;\cos \widehat {AMC}\\ \Leftrightarrow M{A^2} + M{C^2} - A{C^2} = 2MA.MC\;\cos \widehat {AMC}\;\;(2)\end{array}\)

c) Từ (1), suy ra \(M{A^2} = A{B^2} - M{B^2} + 2MA.MB\;\cos \widehat {AMB}\;\)

Từ (2), suy ra \(M{A^2} = A{C^2} - M{C^2} + 2MA.MC\;\cos \widehat {AMC}\;\)

Cộng vế với vế ta được:

\(2M{A^2} = \left( {A{B^2} - M{B^2} + 2MA.MB\;\cos \widehat {AMB}} \right)\; + \left( {A{C^2} - M{C^2} + 2MA.MC\;\cos \widehat {AMC}} \right)\;\)

\( \Leftrightarrow 2M{A^2} = A{B^2} + A{C^2} - M{B^2} - M{C^2} + 2MA.MB\;\cos \widehat {AMB} + 2MA.MC\;\cos \widehat {AMC}\)

Mà: \(MB = MC = \frac{{BC}}{2}\) (do AM là trung tuyến)

\( \Rightarrow 2M{A^2} = A{B^2} + A{C^2} - {\left( {\frac{{BC}}{2}} \right)^2} - {\left( {\frac{{BC}}{2}} \right)^2} + 2MA.MB\;\cos \widehat {AMB} + 2MA.MB\;\cos \widehat {AMC}\)

\( \Leftrightarrow 2M{A^2} = A{B^2} + A{C^2} - 2.{\left( {\frac{{BC}}{2}} \right)^2} + 2MA.MB\;\left( {\cos \widehat {AMB} + \;\cos \widehat {AMC}} \right)\)

\( \Leftrightarrow 2M{A^2} = A{B^2} + A{C^2} - {\frac{{BC}}{2}^2}\)

\(\begin{array}{l} \Leftrightarrow M{A^2} = \frac{{A{B^2} + A{C^2} - {{\frac{{BC}}{2}}^2}}}{2}\\ \Leftrightarrow M{A^2} = \frac{{2\left( {A{B^2} + A{C^2}} \right) - B{C^2}}}{4}\end{array}\) (đpcm)

Cách 2:

Theo ý a, ta có: \(\cos \widehat {AMC} =  - \cos \widehat {AMB}\)

Từ đẳng thức (1): suy ra \(\cos \widehat {AMB} = \frac{{M{A^2} + M{B^2} - A{B^2}}}{{2.MA.MB}}\)

 \( \Rightarrow \cos \widehat {AMC} =  - \cos \widehat {AMB} =  - \frac{{M{A^2} + M{B^2} - A{B^2}}}{{2.MA.MB}}\)

Thế \(\cos \widehat {AMC}\)vào biểu thức (2), ta được:

\(M{A^2} + M{C^2} - A{C^2} = 2MA.MC.\left( { - \frac{{M{A^2} + M{B^2} - A{B^2}}}{{2.MA.MB}}} \right)\)

Lại có: \(MB = MC = \frac{{BC}}{2}\) (do AM là trung tuyến)

\(\begin{array}{l} \Rightarrow M{A^2} + {\left( {\frac{{BC}}{2}} \right)^2} - A{C^2} = 2MA.MB.\left( { - \frac{{M{A^2} + M{B^2} - A{B^2}}}{{2.MA.MB}}} \right)\\ \Leftrightarrow M{A^2} + {\left( {\frac{{BC}}{2}} \right)^2} - A{C^2} =  - \left( {M{A^2} + M{B^2} - A{B^2}} \right)\\ \Leftrightarrow M{A^2} + {\left( {\frac{{BC}}{2}} \right)^2} - A{C^2} + M{A^2} + {\left( {\frac{{BC}}{2}} \right)^2} - A{B^2} = 0\\ \Leftrightarrow 2M{A^2} - A{B^2} - A{C^2} + {\frac{{BC}}{2}^2} = 0\\ \Leftrightarrow 2M{A^2} = A{B^2} + A{C^2} - {\frac{{BC}}{2}^2}\\ \Leftrightarrow M{A^2} = \frac{{A{B^2} + A{C^2} - {{\frac{{BC}}{2}}^2}}}{2}\\ \Leftrightarrow M{A^2} = \frac{{2\left( {A{B^2} + A{C^2}} \right) - B{C^2}}}{4}\end{array}\)

tau chịu

f/

\(sin2A+sin2B+sin2C=2sin\left(A+B\right).cos\left(A-B\right)+2sinC.cosC\)

\(=2sinC.cos\left(A-B\right)+2sinC.cosC\)

\(=2sinC\left(cos\left(A-B\right)+cosC\right)\)

\(=2sinC\left[cos\left(A-B\right)-cos\left(A+B\right)\right]\)

\(=4sinC.sinA.sinB\)

g/

\(cos^2A+cos^2B+cos^2C=\frac{1}{2}+\frac{1}{2}cos2A+\frac{1}{2}+\frac{1}{2}cos2B+cos^2C\)

\(=1+\frac{1}{2}\left(cos2A+cos2B\right)+cos^2C\)

\(=1+cos\left(A+B\right).cos\left(A-B\right)+cos^2C\)

\(=1-cosC.cos\left(A-B\right)+cos^2C\)

\(=1-cosC\left(cos\left(A-B\right)-cosC\right)\)

\(=1-cosC\left[cos\left(A-B\right)+cos\left(A+B\right)\right]\)

\(=1-2cosC.cosA.cosB\)

d/ \(sinA+sinB+sinC=2sin\frac{A+B}{2}cos\frac{A-B}{2}+2sin\frac{C}{2}.cos\frac{C}{2}\)

\(=2cos\frac{C}{2}.cos\frac{A-B}{2}+2sin\frac{C}{2}.cos\frac{C}{2}\)

\(=2cos\frac{C}{2}\left(cos\frac{A-B}{2}+sin\frac{C}{2}\right)\)

\(=2cos\frac{C}{2}\left(cos\frac{A-B}{2}+cos\frac{A+B}{2}\right)\)

\(=4cos\frac{C}{2}.cos\frac{A}{2}.cos\frac{B}{2}\)

e/

\(cosA+cosB+cosC=2cos\frac{A+B}{2}cos\frac{A-B}{2}+1-2sin^2\frac{C}{2}\)

\(=1+2sin\frac{C}{2}.cos\frac{A-B}{2}-2sin^2\frac{C}{2}\)

\(=1+2sin\frac{C}{2}\left(cos\frac{A-B}{2}-sin\frac{C}{2}\right)\)

\(=1+2sin\frac{C}{2}\left(cos\frac{A-B}{2}-cos\frac{A+B}{2}\right)\)

\(=1+4sin\frac{C}{2}.sin\frac{A}{2}sin\frac{B}{2}\)

Ta có: `\hat{A}+\hat{B}+\hat{C}=180^o`

   `=>\hat{C}-\hat{B}=180^o-\hat{A}-2\hat{B}`

   `=>[\hat{C}-\hat{B}]/2=90^o - [\hat{A}+2\hat{B}]/2`

`=>sin` `[\hat{A}+2\hat{B}]/2 = cos` `[\hat{C}-\hat{B}]/2`

   `=>đpcm`.

Vì A+B+C=180^{\circ}A+B+C=180∘ nên V T=\dfrac{\sin ^{3} \dfrac{B}{2}}{\cos \left(\dfrac{180^{\circ}-B}{2}\right)}+\dfrac{\cos ^{3} \dfrac{B}{2}}{\sin \left(\dfrac{180^{\circ}-B}{2}\right)}-\dfrac{\cos \left(180^{\circ}-B\right)}{\sin B} \cdot \tan BVT=cos(2180∘−B​)sin32B​​+sin(2180∘−B​)cos32B​​−sinBcos(180∘−B)​⋅tanB.

V T=\dfrac{\sin ^{3} \dfrac{B}{2}}{\cos \left(\dfrac{180^{\circ}-B}{2}\right)}+\dfrac{\cos ^{3} \dfrac{B}{2}}{\sin \left(\dfrac{180^{\circ}-B}{2}\right)}-\dfrac{\cos \left(180^{\circ}-B\right)}{\sin B} \cdot \tan BVT=cos(2180∘−B​)sin32B​​+sin(2180∘−B​)cos32B​​−sinBcos(180∘−B)​⋅tanB =\dfrac{\sin ^{3} \dfrac{B}{2}}{\sin \dfrac{B}{2}}+\dfrac{\cos ^{3} \dfrac{B}{2}}{\cos \dfrac{B}{2}}-\dfrac{-\cos B}{\sin B} \cdot \tan B=\sin ^{2} \dfrac{B}{2}+\cos ^{2} \dfrac{B}{2}+1=2=V P=sin2B​sin32B​​+cos2B​cos32B​​−sinB−cosB​⋅tanB=sin22B​+cos22B​+1=2=VP

Suy ra điều phải chứng minh.

Ta có : \(a\left(bcosC-ccosB\right)=abcosC-accosB\)

\(=\dfrac{a^2+b^2-c^2}{2}-\dfrac{a^2+c^2-b^2}{2}=\dfrac{2b^2-2c^2}{2}\)

\(=b^2-c^2\)

Vậy \(b^2-c^2=a\left(bcosC-ccosB\right)\)

A, B , C là ba góc của ΔABC nên ta có: A + B + C = 180º

a) sin A = sin (180º – A) = sin (B + C)

b) cos A = – cos (180º – A) = –cos (B + C)