) Ta có sđ\(_{\text{nh}ỏ} +\)sđ\(_{\text{l}ớ\text{n}} = 36 0^{\circ}\),

mà sđ\(_{\text{l}ớ\text{n}} = 3\)sđ\(_{\text{nh}ỏ}\).

Suy ra sđ\(_{\text{nh}ỏ} = 9 0^{\circ}\);

sđ\(_{\text{l}ớ\text{n}} = 27 0^{\circ}\).

b) Ta có \(\hat{A O B} =\) sđ\(_{\text{nh}ỏ} = 9 0^{\circ}\), mà \(O A = O B = R\).

Suy ra tam giác \(O A B\) vuông cân tại \(O\).

Mặt khác \(OH\bot AB=H\).

Suy ra \(\Delta O H A\) vuông cân tại \(H\) suy ra \(O H = H A = \frac{A B}{2}\)

) Ta có sđ\(_{\text{nh}ỏ} +\)sđ\(_{\text{l}ớ\text{n}} = 36 0^{\circ}\),

mà sđ\(_{\text{l}ớ\text{n}} = 3\)sđ\(_{\text{nh}ỏ}\).

Suy ra sđ\(_{\text{nh}ỏ} = 9 0^{\circ}\);

sđ\(_{\text{l}ớ\text{n}} = 27 0^{\circ}\).

b) Ta có \(\hat{A O B} =\) sđ\(_{\text{nh}ỏ} = 9 0^{\circ}\), mà \(O A = O B = R\).

Suy ra tam giác \(O A B\) vuông cân tại \(O\).

Mặt khác \(OH\bot AB=H\).

Suy ra \(\Delta O H A\) vuông cân tại \(H\) suy ra \(O H = H A = \frac{A B}{2}\)

sđ\(_{\text{l}ớ\text{n}} +\)sđ\(_{\text{nh}ỏ} = 36 0^{\circ}\),

sđ\(_{\text{l}ớ\text{n}} = 2\)sđ\(_{\text{nh}ỏ}\) nên:

sđ\(_{\text{nh}ỏ} = 12 0^{\circ}\).

Suy ra \(\hat{A O B} = 12 0^{\circ}\).

Vẽ \(O H ⊥ A B\), ta có \(\hat{A O H} = \hat{H O B} = 6 0^{\circ}\) và \(A H = H B = \frac{1}{2} A B\).

Tam giác \(A O H\) có \(\hat{A H O} = 9 0^{\circ}\), \(\hat{A O H} = 6 0^{\circ}\) nên

\(O H = \frac{1}{2} A O = \frac{1}{2} R\)

Áp dụng định lí Pythagore ta có:

\(A H^{2} = A O^{2} - O H^{2} = \frac{3 R^{2}}{4}\)

Suy ra \(A H = \frac{R \sqrt{3}}{2}\).

Vậy \(A B = 2 A H = R \sqrt{3}\).

sđ\(_{\text{l}ớ\text{n}} +\)sđ\(_{\text{nh}ỏ} = 36 0^{\circ}\),

sđ\(_{\text{l}ớ\text{n}} = 2\)sđ\(_{\text{nh}ỏ}\) nên:

sđ\(_{\text{nh}ỏ} = 12 0^{\circ}\).

Suy ra \(\hat{A O B} = 12 0^{\circ}\).

Vẽ \(O H ⊥ A B\), ta có \(\hat{A O H} = \hat{H O B} = 6 0^{\circ}\) và \(A H = H B = \frac{1}{2} A B\).

Tam giác \(A O H\) có \(\hat{A H O} = 9 0^{\circ}\), \(\hat{A O H} = 6 0^{\circ}\) nên

\(O H = \frac{1}{2} A O = \frac{1}{2} R\)

Áp dụng định lí Pythagore ta có:

\(A H^{2} = A O^{2} - O H^{2} = \frac{3 R^{2}}{4}\)

Suy ra \(A H = \frac{R \sqrt{3}}{2}\).

Vậy \(A B = 2 A H = R \sqrt{3}\).