ABCD is a rhombus diagonal DB.
If p is any point on DB, then prove
that Ap=CP
Answers
Step-by-step explanation:
ABCD is parallelogram AD=DP=PC=CB
To check
(i) AP bisect angle A
(ii) BP bisects angle B
(iii) ∠DAP−∠CBP=∠APS
⇒ (i) ABCD is parallelogram
AB∣∣DC⇒AB∣∣DP and AB∣∣PC.
Now, InΔADP
AD=DP
∴∠DPA=∠DAP
∠3=∠1 __(1) [Angles opposite to equal sides of a triangle are equal]
also, ∠3=∠2 __(2) [AP acts as transversal for AB∣∣DP]
From (1) and (2) [So, alternate interior angles are equal]
∴AP bisects angle ∠DAB
(ii) In ΔPCB,
CB=PC
∠4=∠5 __(3) [Angles opposite to equal sides of a triangle are equal]
Also, PC∣∣AB
∴PB acts as transversal.
Alternate interior angles are equal.
∠4=∠6 ___(4)
From (3) and (4),
∠5=∠6
∴PB bisects angle B.
A rhombus is a parallelogram with all four sides
congruent. So, Then, is an
isosceles triangle. Therefore,
If a parallelogram is a rhombus, then each diagonal
bisects a pair of opposite angles. So,
Therefore,
ANSWER:
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