We have to draw a circle centered at O and two chords AB and CD

We will follow the following steps of construction

STEP1: With centre O, draw a circle of any radius.

STEP2: Draw any two chords AB and CD, such that the two chords are not parallel.

STEP3: With centre B and taking any radius (more than half of AB), draw two arcs, one on each side of the chord AB.

STEP4: With centre A, and taking the same radius, draw two arcs, one on each side of the chord AB, cutting the previous arcs in E and F respectively.

STEP5: Draw a line segment with E and F as end-points. It passes through centre O.

STEP6: With centre C and taking any radius (more than half of CD), draw two arcs, one on each side of the chord CD.

STEP7: With centre D, and taking the same radius as in STEP 6, draw two arcs, one on each side of the chord CD, cutting the previous arcs in G and H respectively.

STEP 8: Draw a line segment with G and H as end-points. This also passes through centre O. It is clear that perpendicular bisectors EF and GH intersect at point O, which is the centre of the circle.