O IS THE CENTRE OF CIRCLE . ANG. AOE = 150 & DAO = 51 . ADEB IS A CYCLIC QUADRILATERAL . DE & AB (CHORDS )IS PRODUCED TO C . CALCUELATE THE SIZES OF ANGLES CEB &CB
AB IS DIAMETER OF CIRCLE APBR . APQ & RBQ ARE STRAIGHT LINES , ANG. A = 35 Q = 25 AP AND RB ARE CHORD .
if a DIAMETER OF A CIRCLE IS PERPENDICULAR TO ONE OF TWO PARALLEL CHORDS OF THE CIRCLE , PROVE THAT IT IS PERPENDICULAR TO OHTER AND BISECTS IT.
the line joining mid point of two chords of a circle passes through its centre . prove that the chords are parallel
ABCD IS A CYCLIC QUADRILATERAL O IS CENTRE .ANG. COD =40 AND CBE =100 FIND ANG 1. ADC 2. DAC 3. ODA 4. OCA
ABCD IS A QUADRILATERAL INSCRIBED IN A CIRCLE WITH CENTRE O . CD IS A CHORD PRODUCED TO E . IF ANG. ADE =70 AND OBA =45 CALCULATE ANG. BAC
abcd is a cyclicquadrilateral . prove that the quadrilateral pqrs formed by angle bisectors of ABCD IS ALSO CYCLIC
the length of the common chord of two interacting circles is 30 cm . if the radii of the two circles are 25 and 17 cm . find the distance between theur centres
I just wanted to know the proof or theorms, after constucting a circle with radius of 5.5cm in three different ways but how do i explain by proving that how can i reach the centre of the three circles. In a simple explaination, i have to proof by constructing a circle with radius 5.5cm in different ways and also i have mention that how i reached the centre (they shouldn't be similar).
Draw a circle of radius 5.5cm use a theorem on a circle to locate the center. State the theorem and mention how you reached the center of the circle,
I want to ask a question but the question includes an image, I tried to paste the image in this box but it didn't came , so what to do to bring it in this box.?
why there is no vedio for it????.............
ab is a line segment and m is its mid point . three semi - circle are drawn with am , mb and ab as diameter on the same side of the line ab . a circle with radius r unit is drawn so that it touches all the three semi circles
two circles with centres a and b have radii 5 cm and 3 cm,touch each other internally . if the perpendicular bisector of the segment ab meet the bigger circle at p and q .find length of pq
O IS THE CENTRE OF CIRCLE . ANG. AOE = 150 & DAO = 51 . ADEB IS A CYCLIC QUADRILATERAL . DE & AB (CHORDS )IS PRODUCED TO C . CALCUELATE THE SIZES OF ANGLES CEB &CB
AB IS DIAMETER OF CIRCLE APBR . APQ & RBQ ARE STRAIGHT LINES , ANG. A = 35 Q = 25 AP AND RB ARE CHORD .
if a DIAMETER OF A CIRCLE IS PERPENDICULAR TO ONE OF TWO PARALLEL CHORDS OF THE CIRCLE , PROVE THAT IT IS PERPENDICULAR TO OHTER AND BISECTS IT.
the line joining mid point of two chords of a circle passes through its centre . prove that the chords are parallel
ABCD IS A CYCLIC QUADRILATERAL O IS CENTRE .ANG. COD =40 AND CBE =100 FIND ANG 1. ADC 2. DAC 3. ODA 4. OCA
ABCD IS A QUADRILATERAL INSCRIBED IN A CIRCLE WITH CENTRE O . CD IS A CHORD PRODUCED TO E . IF ANG. ADE =70 AND OBA =45 CALCULATE ANG. BAC
abcd is a cyclicquadrilateral . prove that the quadrilateral pqrs formed by angle bisectors of ABCD IS ALSO CYCLIC
the length of the common chord of two interacting circles is 30 cm . if the radii of the two circles are 25 and 17 cm . find the distance between theur centres
I just wanted to know the proof or theorms, after constucting a circle with radius of 5.5cm in three different ways but how do i explain by proving that how can i reach the centre of the three circles. In a simple explaination, i have to proof by constructing a circle with radius 5.5cm in different ways and also i have mention that how i reached the centre (they shouldn't be similar).
Draw a circle of radius 5.5cm use a theorem on a circle to locate the center. State the theorem and mention how you reached the center of the circle,
Draw a circle of radius 5.5cm use a theorem on a circle to locate the center. State the theorem and mention how you reached the center of the circle,
I want to ask a question but the question includes an image, I tried to paste the image in this box but it didn't came , so what to do to bring it in this box.?
why there is no vedio for it????.............
ab is a line segment and m is its mid point . three semi - circle are drawn with am , mb and ab as diameter on the same side of the line ab . a circle with radius r unit is drawn so that it touches all the three semi circles
two circles with centres a and b have radii 5 cm and 3 cm,touch each other internally . if the perpendicular bisector of the segment ab meet the bigger circle at p and q .find length of pq