Corollaries of inscribed angle theorem `:`
Angle inscribed in the same arc arc contruent
Given `:` (1) A circle with centre O
(2) `/_ABD` and `/_ACD ` are inscribed in arc ABC and intercepts arc APD.
To prove `:` `/_ABD ~= /_ACD `

Prove that, angles inscribed in the same are arc congruent.

Inscribed Angle Theorem The measure of an inscribed angle is half of the measure of the arc intercepted by it. Given : In a circle with centre O, /_BAC is inscribed in an arc BAC. /_BAC intercepts are BXC of the circle. To prove : m /_BAC = (1)/(2) m ( arc BXC ) .

In the figure, O is the centre of the circle. Seg AC is the diameter /_ ABC is inscribed in arc ABC and intercepts arc AMC then prove /_ ABC = 90^(@)

/_ACB is inscribed in arc ACB of a circle with centre O . If /_ACB= 65^(@) , find m ( arc ACB ) .

Prove that, angles inscribed in the same arc are congruent . Given : angle PQR and angle PSR are inscribed in the same arc PXR. PXR is intercepted by the angles. To prove : angle PQR ~= angle PSR Proof : m angle PQR =1/2 m (arc PXR) " "(I) square m angle .........=1/2 m(arc PXR) " "(II) therefore m angle ....... =m angle PSR " " (From I and II) therefore angle PQR ~= angle PSR " " ( Angles equal in measure are congruent )

AB is a diameter of a circle with centre O and radius OD is perpendicular to AB .If C is any point on arc DB, find /_BAD and /_ACD

Prove that, angles inscribed in the same arc are congruent /_PQR and /_PSR are inscribed in the same arc. Arc PXR is intercepted by the angles. To prove : /_PQR ~= /_PSR Proof : m /_ PQR = (1)/(2) m ( arc PXR ) …... square m /_ square = (1)/(2) m (arc PXR ) ....(2) square :. m /_ square = m /_ PSR ......[ From (1) and (2) ] :. /_PQR ~= /_ PSR ...(Angles equal in measure are congrument )

C is a point on the minor arc AB a circle with centre O. If angle AOB = 100^(@) , what is angle ACB ?

In Figure,O is the centre of the circle and the measure of arc ABC is 100^(@). Determine /_ADC and /_ABC