Class 10 || Circles Ex :- 10.2 || Question no.11 Prove that the parallelogram circumscribing a circle is an rhombus.
Ex :- 10.1
Basic information of circle and Theorem 10.1 • Chapter 10 || Circles ...
Theorem 10.2 • Class 10 || Chapter 10...
Question no.1,2 • Class 10 || Circles Ex...
Question no.3 • A tangent PQ at a poin...
Question no.4 • Draw a circle and two ...
Ex :- 10.2
Question no.1 • From a point Q, the le...
Question no.2 • In Fig. 10.11, if TP a...
Question no.3 • If tangents 'PA' and '...
Question no.4 • Prove that the tangent...
Question no.5 • Prove that the perpend...
Question no.6 • The length of a tangen...
Question no.7 • Two concentric circles...
Question no.8 • A quadrilateral ABCD i...
Question no.9 • In Fig.10.13, XY and X...
Question no.10 • Prove that the angle b...
Question no.11 • Prove that the paralle...
Question no.12 • A triangle ABC is draw...
Question no.13 • Prove that opposite si...
#circles
Негізгі бет Prove that the parallelogram circumscribing a circle is an rhombus.
Пікірлер: 137