Converse of BPT
Trending Questions
Q. Question 4
If in two and ΔABC and ΔPQR, ABQR=BCPR=CAPQ, then
(A) ΔPQR∼ΔCAB
(B) ΔPQR∼ΔABC
(C) ΔCBA∼ΔPQR
(D) ΔBCA∼ΔPQR
If in two and ΔABC and ΔPQR, ABQR=BCPR=CAPQ, then
(A) ΔPQR∼ΔCAB
(B) ΔPQR∼ΔABC
(C) ΔCBA∼ΔPQR
(D) ΔBCA∼ΔPQR
Q.
In below shown figure, PSSQ= PTTR and∠PST= ∠PRQ. Then ΔPQR is a/an
Q.
Given △ABC ~ △XZY. Which of the following is true?
=
=
=
None of these
Q.
In ΔABC, ADDB=AEEC and ∠ADE = ∠ACB. Then ΔABC is
In ΔABC, ADDB=AEEC and ∠ADE = ∠ACB. Then ΔABC is
- a right angled triangle.
- a scalene triangle.
- an isosceles triangle.
- an equilateral triangle.
Q.
In ΔABC, if DE divides AB and AC in the same ratio, then which of the following options is true?
AD = DB
DE and BC are parallel
DE is half of BC
AD = AE
Q. In Δ ABC, a line DE is drawn joining the midpoints of AB and BC. Which of the following statements is true?
- DE intersects AC outside Δ ABC
- DE is parallel to BC
- DE is parallel to AC
- DE intersects AC inside Δ ABC
Q.
Two isosceles triangles have equal vertical angles and their areas are in the ratio 16 : 25. Find the ratio of their corresponding heights. [4 MARKS]
Q. In figure, if AB ∥ CD, CD ∥ EF and y : z = 3 : 7, then find x.
- 126∘
- 112∘
- 116∘
- 96∘
Q. Let PQRS be a kite such that PQ>PS. Prove that ∠PSR>∠PQR ( Hint: Join QS)