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Question 4
ABCD is a rhombus in which altitude from D to side AB bisects AB. Find the angles of the rhombus.
ABCD is a rhombus in which altitude from D to side AB bisects AB. Find the angles of the rhombus.
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Solution
Let sides of a rhombus be AB = BC = CD = DA = x
Now, join DB.
In ΔALD and ΔBLD, ΔDLA=ΔDLB=90∘
[Since, DL is a perpendicular bisector of AB]
AL=BL=x2
and DL=DL [Common side]
∴ΔALD=ΔBLD [By SAS congruence rule]
AD = BD [ By CPCT]
Now, in ΔADB is an equilateral triangle.
∴∠C=∠BDC=∠DBC=60∘
Also, ∠A=∠C
∴∠D=∠B=180∘−60∘=120∘ [Since , sum of interior angles is 180∘]
Let sides of a rhombus be AB = BC = CD = DA = x
Now, join DB. In ΔALD and ΔBLD, ΔDLA=ΔDLB=90∘
[Since, DL is a perpendicular bisector of AB]
AL=BL=x2
and DL=DL [Common side]
∴ΔALD=ΔBLD [By SAS congruence rule]
AD = BD [ By CPCT]
Now, in ΔADB is an equilateral triangle.
∴∠C=∠BDC=∠DBC=60∘
Also, ∠A=∠C
∴∠D=∠B=180∘−60∘=120∘ [Since , sum of interior angles is 180∘]
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