Math, asked by BINODRAJKUMAR, 5 hours ago

show that the point A (2,7),B(3,0),C(-4,-1) are vertices of triangle and find the length of the base​

Answers

Answered by babalraj1976
0

Answer:

Answer

We know that the distance between the two points (x

1

,y

1

) and (x

2

,y

2

) is

d=

(x

2

−x

1

)

2

+(y

2

−y

1

)

2

Let the given vertices be A=(1,−3), B=(−3,0) and C=(4,1)

We first find the distance between A=(1,−3) and B=(−3,0) as follows:

AB=

(x

2

−x

1

)

2

+(y

2

−y

1

)

2

=

(−3−1)

2

+(0−(−3))

2

=

(−4)

2

+(0+3)

2

=

(−4)

2

+3

2

=

16+9

=

25

=5

Similarly, the distance between B=(−3,0) and C=(4,1) is:

BC=

(x

2

−x

1

)

2

+(y

2

−y

1

)

2

=

(4−(−3))

2

+(1−0)

2

=

(4+3)

2

+1

2

=

7

2

+1

2

=

49+1

=

50

=

5

2

×2

=5

2

Now, the distance between C=(4,1) and A=(1,−3) is:

CA=

(x

2

−x

1

)

2

+(y

2

−y

1

)

2

=

(1−4)

2

+(−3−1)

2

=

(−3)

2

+(−4)

2

=

9+16

=

25

=

5

2

=5

We also know that If any two sides have equal side lengths, then the triangle is isosceles.

Here, since the lengths of the two sides are equal that is AB=CA=5, therefore, ABC is an isosceles triangle.

Now consider,

AB

2

+CA

2

=5

2

+5

2

=25+25=50=(5

2

)

2

=BC

2

Since AB

2

+CA

2

=BC

2

, therefore, ABC is a right angled triangle.

Hence, the given vertices are the vertices of isosceles right angled triangle.

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