how did you obtain
AP=AR
BY SUBTRACTING
XP-AX=TR-AY
How can we construct an angle bisector ??? :P
Triangle BAC is right-angled at A with AB=8 cm;AC = 6 cm ;Find the radius of the in-circle.
what is the properties of two parralel sides
ABQC IS A CYCLIC QUADRILATERAL AQ AND BC INTERSECT AT P SUCH THAT AB = AP PROVE CP = CQ
A , B , E ARE POINTS ON CIRCLE AB IS DIAMETER WITH O AS A CENTRE AC AND BD ARE PERPENDICULARS ON A LINE PQ . BD MEETS THE CIRCLE AT E . PROVE THAT AC = ED
AB IS DIAMETER OF CIRCLE WITH CENTRE O AND AT IS TANGENT . OP IS RADIUS . IF AOP IS = 50atop is quadrilateral but not cyclic
AB and CD are two equal chords of a circle with centre O which intersect each other at right angle at point P. If OM is perpendicular to AB and ON perpendicular to CD; show that OMPN is a square.
The length of common chord of two intersecting circles is 30 cm. If the diameters of these two circles be 50 cm and 34 cm, calculate the distance between their centres.
how to draw hexagon in easy way?
ABCD IS A CYCLIC QUADRILATRAL O IS THE CENTRE OF THE CIRICLE . IF ANG.OAD = 50 FIND ANG. CDB AND BOD IF AB IS DIAMETER.
In a circle with centre O, a cyclic quadrilateral Abcd is drawn with AB as a diameter of the circle and Cd equal to radius of the circle.If AD and BC produced meet at point P;show that angle APB=60.
Calculate the length of a direct common tangent of two circles of radii 3cm and 8cm with thier centres 13cm apart????
ABCD IS QUADRILATERAL INSCRIBED IN A CIRCLE WITH A CENTRE O . CD A CHORD IS PRODUCED TO E . AB , AD , BC ARE CHORD . IF ADE= 70 & OBA =45 . FIND :
two circle intersect AT A AND B . THE CENTRE OF SMALLER CIRCLE IS O AND LIES ON THE CIRCUMFERENCE OF THEE LARGER CIRCLE . XAC AND XBD ARE ST. LINES. CD IS A CHORD ON LARGER CIRCLE AX AND BX ARE CHORD OF SMALLER CURCLE . OA AND OC ARE RADIUS . ANG. AXB = 75 FIND :
how did you obtain
AP=AR
BY SUBTRACTING
XP-AX=TR-AY
How can we construct an angle bisector ??? :P
Triangle BAC is right-angled at A with AB=8 cm;AC = 6 cm ;Find the radius of the in-circle.
what is the properties of two parralel sides
ABQC IS A CYCLIC QUADRILATERAL AQ AND BC INTERSECT AT P SUCH THAT AB = AP PROVE CP = CQ
A , B , E ARE POINTS ON CIRCLE AB IS DIAMETER WITH O AS A CENTRE AC AND BD ARE PERPENDICULARS ON A LINE PQ . BD MEETS THE CIRCLE AT E . PROVE THAT AC = ED
AB IS DIAMETER OF CIRCLE WITH CENTRE O AND AT IS TANGENT . OP IS RADIUS . IF AOP IS = 50atop is quadrilateral but not cyclic
AB and CD are two equal chords of a circle with centre O which intersect each other at right angle at point P. If OM is perpendicular to AB and ON perpendicular to CD; show that OMPN is a square.
The length of common chord of two intersecting circles is 30 cm. If the diameters of these two circles be 50 cm and 34 cm, calculate the distance between their centres.
how to draw hexagon in easy way?
ABCD IS A CYCLIC QUADRILATRAL O IS THE CENTRE OF THE CIRICLE . IF ANG.OAD = 50 FIND ANG. CDB AND BOD IF AB IS DIAMETER.
In a circle with centre O, a cyclic quadrilateral Abcd is drawn with AB as a diameter of the circle and Cd equal to radius of the circle.If AD and BC produced meet at point P;show that angle APB=60.
Calculate the length of a direct common tangent of two circles of radii 3cm and 8cm with thier centres 13cm apart????
ABCD IS QUADRILATERAL INSCRIBED IN A CIRCLE WITH A CENTRE O . CD A CHORD IS PRODUCED TO E . AB , AD , BC ARE CHORD . IF ADE= 70 & OBA =45 . FIND :
two circle intersect AT A AND B . THE CENTRE OF SMALLER CIRCLE IS O AND LIES ON THE CIRCUMFERENCE OF THEE LARGER CIRCLE . XAC AND XBD ARE ST. LINES. CD IS A CHORD ON LARGER CIRCLE AX AND BX ARE CHORD OF SMALLER CURCLE . OA AND OC ARE RADIUS . ANG. AXB = 75 FIND :