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The vertices of triangle ABC are (0,3).(5,6).(-5,3) then its centroid​

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Answered by knightgamers2006
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The coordinates of the vertices of a triangle are (0,1),(2,3) and (3,5):

(a) Find centroid of the triangle.

(b) Find circumcentre and the circumradius.

(c) Find Orthocentre of the triangle.

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ANSWER

Lets coordinate of a triangle are A(x

1

,y

1

),B(x

2

,y

2

),C(x

3

,y

3

)

Here A(0,1),B(2,3),C(3,5)

(a) Centroid of the triangle=(x

c

,y

c

)

x

c

=

3

x

1

+x

2

+x

3

,y

c

=

3

y

1

+y

2

+y

3

x

c

=

3

0+2+3

=

3

5

,y

c

=

3

1+3+5

=3

So the centroid is (

3

5

,3).

(b) To find out the circumcenter we have to solve any two bisector equations and find out the intersection points.

So, mid point of AB =(

2

0+2

,

2

1+3

)=F(1,2)

Slope of AB=

3−1

2−0

=1

Slope of the bisector is the negative reciprocal of the given slope.

So, the slope of the perpendicular bisector =−1

Equation of line with slope −1 and the coordinates F(1,2) is,

(y−2)=−1(x−1)

x+y=3………………(1)

Similarly, for AC

Mid point of AC =(

2

0+3

,

2

1+5

)=E(

2

3

,3)

Slope of AC=

3−0

5−1

=

3

4

Slope of the bisector is the negative reciprocal of the given slope.

So, the slope of the perpendicular bisector =−

4

3

Equation of line with slope −

4

3

and the coordinates E(

2

3

,3) is,

(y−3)=−

4

3

(x−

2

3

)

y−3=−

4

3

x+

8

9

4

3

x+y=

8

33

………………(2)

By solving equation (1) and (2),

(1)−(2)⇒

4

x

=3−

8

33

;x=−

2

9

Substitute the value of x in to (1)

2

9

−y=3

y=−

2

15

So the circumcenter is (−

2

9

,−

2

15

)

(c) Let perpendicular bisectors from A,B,C of triangle be F (on side AB), E (on side AC),D(on side BC)

We know, slope of AB=1

Slope of CF = Perpendicular slope of AB

=−

Slope of AB

1

=−1

The equation of CF is given as,

y−5=−1(x−3)

x+y=8 ………………(1)

Slope of AC=

3

4

Slope of AD = Perpendicular slope of BC

=−

Slope of BC

1

=−

4

3

The equation of BE is given as,

y−3=−

4

3

(x−2)

y−3=−

4

3

x+

2

3

4

3

x+y=

2

9

………………(2)

By solving equation (1) and (2),

(1)−(2)⇒

4

x

=8−

2

9

;x=14

Substitute the value of x in to (1)

14+y=8

y=−6

So the Orthocenter is (14,−6)

Step-by-step explanation:

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