Math, asked by npp232005, 11 months ago

Mohan has two triangular plots connected to each other as shown in the figure. He thought to give the bigger isosceles triangular part with AC =BC to his daughter and son equally.
(i)How a triangle can be divided into two parts of equal area?
(ii) Also find the value of angleDCE.
(iii) What values he is exibiting by doing so?​

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Answers

Answered by amitnrw
10

Answer:

Draw perpendicular bisector of AB

∠DCE = 84°

Step-by-step explanation:

ABC is isosceles triangle with AC = BC

so to divide  into two parts of equal area

we can draw a perpendicular bisector of AB

which will pass through point C as AC = BC

Let say perpendicular bisector of AB bisect at O

then Area of Δ AOC = Area of Δ BOC = (1/2) Area of Δ ABC

∠DCE = ∠ACB  ( opposite angle)

∠BAC = ∠ABC   ( as AC = BC)

=> ∠BAC = 48°

∠ABC + ∠BAC  + ∠ACB = 180°  ( Sum of Angles of a Triangle)

=> 48° + 48° + ∠ACB = 180°

=> ∠ACB = 84°

∠DCE = 84°

Answered by sonabrainly
5

Answer:

Step-by-step explanation:

Draw perpendicular bisector of AB

∠DCE = 84°

Step-by-step explanation:

ABC is isosceles triangle with AC = BC

so to divide  into two parts of equal area

we can draw a perpendicular bisector of AB

which will pass through point C as AC = BC

Let say perpendicular bisector of AB bisect at O

then Area of Δ AOC = Area of Δ BOC = (1/2) Area of Δ ABC

∠DCE = ∠ACB  ( opposite angle)

∠BAC = ∠ABC   ( as AC = BC)

=> ∠BAC = 48°

∠ABC + ∠BAC  + ∠ACB = 180°  ( Sum of Angles of a Triangle)

=> 48° + 48° + ∠ACB = 180°

=> ∠ACB = 84°

∠DCE = 84°

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