a) Ta có : OM = ON ( =R )

=> O thuộc trung trực của MN (1)

AM = AN ( tính chất 2 tt cắt nhau )

=> A thuộc trung trực của MN (2)

Từ (1) và (2) => OA là đường trung trực của đoạn thẳng MN

Vậy : \(OA\perp MN\left(đpcm\right)\)

b) Xét tam giác MNC , ta có : MO = NO = OC ( =bk )

\(\Rightarrow MO=\frac{1}{2}NC\Rightarrow\Delta MNC\)vuông tại M

\(\Rightarrow MC\perp MN\left(3\right)\)

Theo ( c/m câu a ) : \(OA\perp MN\left(4\right)\)

Từ (3) và (4) => MC // AO ( đpcm )

c) Áp dụng đlí Py -ta - go cho tam giác AMO vuông tại M , ta có :

\(OA^2=AM^2+MO^2\)

\(AM^2=OA^2-MO^2=5^2-3^2=16\)

\(AM^2=16\Rightarrow AM=4\left(cm\right)\)

Áp dụng hệ thức lượng cho tam giác AMO vuông tại M , đường cao MI :

Ta có : AM . MO = AO . MI

\(MI=\frac{AM.MO}{AO}=\frac{4.3}{5}=2,4\)

\(\Rightarrow MN=2.MI=2.2,4=4,8\)

Vậy : AM = AN = 4cm

         MN = 4,8 cm

a) ta có : AN = AM (tính chất tiếp tuyến)

\(\Rightarrow\) tam giác AMN cân tại A

OA là tia phân giác cũng là đường cao

\(\Rightarrow\) OA \(\perp\) MN (đpcm)

b) đặc H là giao điểm của MN và AO

ta có MH = HN (OA \(\perp\) MN \(\Rightarrow\) H là trung điểm MN)

mà CO = CN = R

\(\Rightarrow\) OH là đường trung bình của tam giác MNC

\(\Rightarrow\) OH // MC \(\Leftrightarrow\) MC // OA (đpcm)

c) OM = ON = R \(\Rightarrow\) ON = 3 (cm)

ta có : ON² + AN² = AO² (pytago) \(\Rightarrow\) AN² = AO² - ON²

= 5² - 3² = 25 - 9 = 16 \(\Rightarrow\) AN = \(\sqrt{16}=4\) (cm)

ta có : AO.HN = AN.NO (hệ thức lượng)

\(\Rightarrow\) 5HN = 4.3 = 12 \(\Rightarrow\) HN = \(\dfrac{12}{5}=2,4\) (cm)

ta có MN = 2HN = 2.2,4 = 4,8 (H là trung điểm MN)

vậy AM = AN = 4(cm) ; MN = 4,8(cm)

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ai giúp mình với mai mình thi toán rùi 

Đề thiếu rồi :(( A đâu?

cắt tiếp tuyến tại M của đường tròn tại điểm A.

mình ghi thiếu

Xét ΔMAO vuông tại M có \(sinMAO=\dfrac{OM}{OA}=\dfrac{1}{2}\)

nên \(\widehat{MAO}=30^0\)

Xét (O) có

AM,AN là các tiếp tuyến

Do đó: AO là phân giác của góc MAN

=>\(\widehat{MAN}=2\cdot\widehat{MAO}=2\cdot30^0=60^0\)

Xét (O) có

AM,AN là các tiếp tuyến

Do đó: AM=AN

Xét ΔAMN có AM=AN và \(\widehat{MAN}=60^0\)

nên ΔAMN đều

ΔOMA vuông tại M

=>\(OM^2+MA^2=OA^2\)

=>\(MA^2=\left(2R\right)^2-R^2=3R^2\)

=>\(MA=R\sqrt{3}\)

Chu vi tam giác AMN là:

\(AM+MN+AN=R\sqrt{3}+R\sqrt{3}+R\sqrt{3}=3R\sqrt{3}\)

ΔMAN đều

=>\(S_{AMN}=AM^2\cdot\dfrac{\sqrt{3}}{4}=\left(R\sqrt{3}\right)^2\cdot\dfrac{\sqrt{3}}{4}=\dfrac{3\sqrt{3}\cdot R^2}{4}\)

dmmmm