Cho tam giác ABC có diện tích là 126cm2 .Các điểm M, N, P lần lượt là trung điểm của các cạnh AC, AB, BC nối MN, NP, PM. Tính diện hình tam giác MNP
Hãy nhập câu hỏi của bạn vào đây, nếu là tài khoản VIP, bạn sẽ được ưu tiên trả lời.
![](https://rs.olm.vn/images/avt/0.png?1311)
![](https://rs.olm.vn/images/avt/0.png?1311)
M là điểm chính giữa của cạnh AC
=>M là trung điểm của AC
N là điểm chính giữa của cạnh AB
=>N là trung điểm của AB
P là điểm chính giữa của cạnh BC
=>P là trung điểm của BC
Xét ΔAMN và ΔACB có
\(\dfrac{AM}{AC}=\dfrac{AN}{AB}\left(=\dfrac{1}{2}\right)\)
\(\widehat{A}\) chung
Do đó: ΔAMN đồng dạng với ΔACB
=>\(\dfrac{S_{AMN}}{S_{ACB}}=\left(\dfrac{AM}{AC}\right)^2=\dfrac{1}{4}\)
=>\(S_{AMN}=\dfrac{1}{4}\cdot120=30\left(cm^2\right)\)
Xét ΔBNP và ΔBAC có
\(\dfrac{BN}{BA}=\dfrac{BP}{BC}\left(=\dfrac{1}{2}\right)\)
\(\widehat{B}\) chung
Do đó: ΔBNP~ΔBAC
=>\(\dfrac{S_{BNP}}{S_{BAC}}=\left(\dfrac{BN}{BA}\right)^2=\dfrac{1}{4}\)
=>\(S_{BNP}=\dfrac{1}{4}\cdot120=30\left(cm^2\right)\)
Xét ΔCPM và ΔCBA có
\(\dfrac{CP}{CB}=\dfrac{CM}{CA}\left(=\dfrac{1}{2}\right)\)
\(\widehat{C}\) chung
Do đó: ΔCPM~ΔCBA
=>\(\dfrac{S_{CPM}}{S_{CBA}}=\left(\dfrac{CP}{CB}\right)^2=\dfrac{1}{4}\)
=>\(S_{CPM}=\dfrac{1}{4}\cdot120=30\left(cm^2\right)\)
Ta có: \(S_{ANM}+S_{BNP}+S_{NMP}+S_{MPC}=S_{ABC}\)
=>\(S_{MPN}+30+30+30=120\)
=>\(S_{MPN}=30\left(cm^2\right)\)
![](https://rs.olm.vn/images/avt/0.png?1311)
Nối AP vì P là truing điểm của BC nên BP = PC .
Tương tự AN = NC; AM = MB
Hai tam giác ABP và APC có đáy bằng nhau và chung chiều cao nên diện tích của chúng bằng nhau và bằng : 240 : 2 = 120 ( cm2 )
Hai tam giác PAN và PNC có đáy bằng nhau và chung chiều cao nên \(S_{PAN}=S_{PNC}=120:2=60\left(cm^2\right)\)
Tương tự ta cũng có \(S_{PAM}=S_{PBM}=60cm^2\)
Như vậy,ta có : \(S_{PNC}=S_{PBM}=60cm^2\)
Nối BN, lí luận tương tự được : \(S_{PNC}=S_{MAN}=60cm^2\)
Ta có : \(S_{MNP}=S_{ABC}-\left(S_{PNC}+S_{MAN}+S_{PMB}\right)=240-\left(60+60+60\right)=60cm^2\)
Vậy 4 tam giác có diện tích bằng nhau và bằng 60cm2
![](https://rs.olm.vn/images/avt/0.png?1311)
- tôi yêu đảng / yêu nước việt nam / ánh sáng của đảng dẫn đường chỉ lôi cho chúng ta
.![](data:image/png;base64,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)
Đúng không?