A, B and C are three points on the circle. If AB = AC= `7 sqrt2` cm and `angle BAC=90^@`, then the radius is equal to:

A,B,C are three points on the circumference of a circle and if bar(AB) = bar(AC) = 5sqrt(2) cm and /_BAC = 90^@ , find the radius.

In Figure 2,AB and AC are tangents to the circle with centre O such that angle BAC=40 . Then angle BOC is equal to

ABC is a triangle and D is a point on the side BC. If BC = 12 cm, BD = 9 cm and angle ADC = angle BAC, then the length of AC is equal to

In a rectangle ABCD, AB= 15 cm angle BAC = 60^@ then BC is equal to

AB and AC are the two tangets to a circle whose radius is 6cm. If angleBAC=60^(@) , then what is the value (in cm) of sqrt((AB^(2)+AC^(2))) ?

A , B and C are three points such that AB = AC + CB , then A , B and C are "_______" .

Let A, B, C be three points on a circle of radius 1 such that angle ACB=pi/4 . Then the length of the side AB is