if arc axb and arc ayb are corresponding arcs and m(arc axb) = 120° then m(arc ayb) =? step by step explanation plz
Answers
Answer:
240°
Step-by-step explanation:
Given,
m(arc axb) = 120°
Measure of major arc = 360° - measure of corresponding minor arc
m (arc ayb) = 360 - m (arc axb)
m (arc ayb) = 360 - 120
m (arc AYB) = 240°
Hope it helps!
If arc AXB and arc AYB are corresponding arcs and m(arc AXB) = 120° then m(arc AYB) = 240°
Given :
arc AXB and arc AYB are corresponding arcs and m(arc AXB) = 120°
To find :
m(arc AYB)
Formula :
Measure of major arc
= 360° – measure of corresponding minor arc
Solution :
Step 1 of 2 :
Write down the given angle
Here it is given that arc AXB and arc AYB are corresponding arcs
m(arc AXB) = 120°
Step 2 of 2 :
Find m(arc AYB)
Since Measure of major arc = 360° – measure of corresponding minor arc
Hence m (arc AYB)
= 360° – m (arc AXB)
= 360° – 120°
= 240°
━━━━━━━━━━━━━━━━
Learn more from Brainly :-
If ∠A and ∠B are two adjacent angles of a parallelogram. If ∠A = 70°, then ∠B = ?
https://brainly.in/question/18539197
2. The measure of each angle of an equilateral triangle is
https://brainly.in/question/23122603