Question

If the vertices of a triangle ABC are(-5,2)(9-3)(-3,5)then find the area of the triangle formed by the mid points of sides of triangle ABC

Answer 1

Step-by-step explanation:

MATHS

Find the area of the triangle formed by joining the midpoints of the sides of the triangle whose vertices are (2,2), (4,4) and (2,6).

January 17, 2020avatar

Kanishka Londhe

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ANSWER

Let A(2,2),B(4,4) and C(2,6) be the vertices of a given triangle ABC.

Let D, E, and F be the midpoints of AB, BC and CA respectively.

Mid point of two points (x

1

,y

1

) and (x

2

,y

2

) is calculated by the formula (

2

x

1

+x

2

,

2

y

1

+y

2

)

Using this formula,the coordinates of D, E, and F are given as D(

2

2+4

,

2

2+4

),E(

2

4+2

,

2

4+6

) and F(

2

2+2

,

2

2+6

)

i.e., D(3,3),E(3,5)andF(2,4)

Area of a triangle with vertices (x

1

,y

1

) ; (x

2

,y

2

) and (x

3

,y

3

) is

∣

∣

∣

∣

∣

2

x

1

(y

2

−y

3

)+x

2

(y

3

−y

1

)+x

3

(y

1

−y

2

)

∣

∣

∣

∣

∣

Hence, substituting the points (x

1

,y

1

)=(3,3) ; (x

2

,y

2

)=(3,5) and (x

3

,y

3

)=(2,4)

in the area formula, we get

Area of triangle DEF =

∣

∣

∣

∣

∣

2

3(5−4)+(3)(4−3)+2(3−5)

∣

∣

∣

∣

∣

=

∣

∣

∣

∣

∣

2

3+3−4

∣

∣

∣

∣

∣

=

2

2

=1 sq units

Answer 2

Answer:

Find the area of the triangle formed by joining the midpoints of the sides of the triangle whose vertices are (2,2), (4,4) and (2,6).

January 17, 2020avatar

Kanishka Londhe

SHARE

ANSWER

Let A(2,2),B(4,4) and C(2,6) be the vertices of a given triangle ABC.

Let D, E, and F be the midpoints of AB, BC and CA respectively.

Mid point of two points (x

1

,y

1

) and (x

2

,y

2

) is calculated by the formula (

2

x

1

+x

2

,

2

y

1

+y

2

)

Using this formula,the coordinates of D, E, and F are given as D(

2

2+4

,

2

2+4

),E(

2

4+2

,

2

4+6

) and F(

2

2+2

,

2

2+6

)

i.e., D(3,3),E(3,5)andF(2,4)

Area of a triangle with vertices (x

1

,y

1

) ; (x

2

,y

2

) and (x

3

,y

3

) is

∣

∣

∣

∣

∣

2

x

1

(y

2

−y

3

)+x

2

(y

3

−y

1

)+x

3

(y

1

−y

2

)

∣

∣

∣

∣

∣

Hence, substituting the points (x

1

,y

1

)=(3,3) ; (x

2

,y

2

)=(3,5) and (x

3

,y

3

)=(2,4)

in the area formula, we get

Area of triangle DEF =

∣

∣

∣

∣

∣

2

3(5−4)+(3)(4−3)+2(3−5)

∣

∣

∣

∣

∣

=

∣

∣

∣

∣

∣

2

3+3−4

∣

∣

∣

∣

∣

=

2

2

=1 sq units