If A, B, C and D are four points such that `angleBAC=30^(@)and angleBDC=60^(@)`,then D is the centre of the circle through A, B and C.

If A, B, C and D are four points such that angleBAC=45^(@) and angleBDC=45^(@) , then A, B, C and D are concyclic.

If A, B, C and D are four numbers such that A:B=2:3,B:C=4:5,C:D=5:8 , then A:D is equal to

If A, B, C and D are four numbers such that A : B = 2 : 3, B : C = 4 : 5, C : D = 5 : 8, then A : D is equal to

In figure, AB is a chord of the circle and AOC is the diameter such that angleACB=50^(@) . If AT is the tangent to the circle at the point A, then angleBAT is equal to : (a) 45^(@) , (b) 60^(@) , (c) 50^(@) , (d) 55^(@)

In the figure, A,B,E,C and D are the points on the circle. If AB=BE and /_ACB =30^(@) , then find /_ADE .

Two circles with centres P and Q intersect at B and C, A, D are points on the circles with centres P and Q respectively such that A, C, D are colliner. If angle APB = 130^(@), and angle BQD = x^(@) , then the value of x is :

ABCD is such a quadrilateral that A is the centre of the circle passing through B,C and D. Prove that /_CBD+/_CDB=(1)/(2)/_BAD

O is the centre of the circle passing through the points A, B and C such that angleBAO=30^@, angleBCO= 40^@ and angleAOC= x^@ . What is the value of x ?

A,B,C and D are 4 points on the circumference of the circle and O is the centre of circle angle OBD - angle CBD = angle BDC - angle ODB find angle A