If the blue radius below is perpendicular to the green chord and the segment
AB is 8.5 units long, what is the length of the chord?
A
A. 8.5 units
8.5
B
O B. 17 units
O C. 34 units
O D. 4.25 units

The chord is AC and the radius of the circle is perpendicular to the chord at B. AB = 8.5 units. According to the perpendicular bisector theorem, if the radius of a circle is perpendicular to a chord then the radius bisects the chord. This means that chord AC is bisected by the radius of the circle at point B. The length of the circle is calculated using:

[tex]AB=\frac{AC}{2}\\ AC=2*AB\\cross multiplying:\\AC = 2*8.5\ units\\AC = 17 \ units[/tex]

The length of the chord is 17 units.

strangestlily strangestlily · Answer 2 · 2020-12-16T20:54:10+01:00

strangestlily strangestlily

16-12-2020

Answer:

The answer is 17 units :D

Step-by-step explanation:

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If the blue radius below is perpendicular to the green chord and the segment AB is 8.5 units long, what is the length of the chord? A A. 8.5 units 8.5 B O B. 17 units O C. 34 units O D. 4.25 units

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If the blue radius below is perpendicular to the green chord and the segment
AB is 8.5 units long, what is the length of the chord?
A
A. 8.5 units
8.5
B
O B. 17 units
O C. 34 units
O D. 4.25 units