Answer :
Answer:
Part 1) The measure of arc AB is 50°
Part 2) The measure of angle AOB is 50°
Part 3) The measure of angle BDA is 25°
Step-by-step explanation:
step 1
Find the measure of arc AB
we know that
arc AD+arc BD+arc AB=360° -----> by complete circle
substitute the given values
212°+98°+arc AB=360°
310°+arc AB=360°
arc AB=360°-310°=50°
step 2
Find the measure of angle AOB
we know that
The measure of angle AOB is the same that the measure of arc AB by central angle
so
m∠AOB=arc AB=50°
step 3
Find the measure of angle BDA
we know that
The inscribed angle measures half that of the arc comprising
so
m∠BDA=(1/2)[arc AB]
we have
arc AB=50°
substitute
m∠BDA=(1/2)[50°]=25°
The arc of a circle is defined as the part or segment of the circumference of a circle.
The measure of arc AB is 50 degrees.
An angle of a circle is an angle that is formed between the radii, chords, or tangents of a circle.
The measure of angle AOB is 50 degrees.
The measure of angle BDA is 25 degrees.
We have to determine
The measure of arc AB is
The measure of angle AOB is
The measure of angle BDA is
What is an arc?
The arc of a circle is defined as the part or segment of the circumference of a circle.
What is the angle?
An angle of a circle is an angle that is formed between the radii, chords, or tangents of a circle.
1. The measure of arc AB is,
[tex]\rm Arc \ AD+Arc \ BD+Arc \ AB=360\\\\212+98+Arc\ AB=360\\\\310+Arc \ AB=360\\\\ Arc \ AB=360-310\\\\ Arc\ AB = 50[/tex]
The measure of arc AB is 50 degrees.
2. The measure of angle AOB is,
[tex]\rm m\angle \ AOB=Arc \ AB=50 degrees[/tex]
The measure of angle AOB is 50 degrees.
3. The measure of angle BDA is,
[tex]\rm m \angle BDA=\dfrac{1}{2}\times Arc AB\\\\ m \angle BDA=\dfrac{1}{2}\times 50\\\\ m \angle BDA = 25[/tex]
The measure of angle BDA is 25 degrees.
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