If radii of the two concentric circles are 15 cm and 17 cm, then the length of each chord of - Maths -

Question

If radii of the two concentric circles are 15 cm and 17 cm, then
the length of each chord of one circle which is tangent to other
is:

(a) 8 cm

(b) 16 cm

(c) 30 cm

(d) 17 cm

Global Expert · Accepted Answer

We are given that radii of two concentric circles are 15 cm and 17 cm We have to find the length of each chord of one circle which is tangent to other

Let A be the centre of the two concentric circles Let BC be the chord of bigger circle tangent to smaller at F Therefore AF is the radius of smaller circle

AB is the radius of bigger circle

We know that radius of a circle is perpendicular to its tangent Therefore

We know that a perpendicular from centre of circle to chord of circle bisects the chord Therefore BF = FC = 8 cm

Hence option (b) is correct

If radii of the two concentric circles are 15 cm and 17 cm, then the length of each chord of one circle which is tangent to other is: (a) 8 cm (b) 16 cm (c) 30 cm (d) 17 cm

If radii of the two concentric circles are 15 cm and 17 cm, then the length of each chord of one circle which is tangent to other is:

(a) 8 cm

(b) 16 cm

(c) 30 cm

(d) 17 cm