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Find the area of triangle ABC whose vertices are A (-5, 7), B (-4, -5) and C (4, 5).

Find the area of triangle ABC whose vertices are A (-5, 7), B (-4, -5) and C (4, 5).
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2 votes
Find the area of triangle ABC whose vertices are
A (-5, 7), B (-4, -5) and C (4, 5).

User Asmmo
by
8.1k points

2 Answers

4 votes

Answer:


Area = 51\:unit^2

Explanation:


Area = √(p(p-a)(p-b)(p-c))\quad and \quad p=(a+b+c)/(2)

Find the distance between three points.


\overline{AB}=√(\left(-4-\left(-5\right)\right)^2+\left(-5-7\right)^2)=12\\\\\overline{BC}=√(\left(4-\left(-4\right)\right)^2+\left(5-\left(-5\right)\right)^2)=12.8\\\\\overline{AC}=√(\left(4-\left(-5\right)\right)^2+\left(5-7\right)^2)=9.2


p=(12+12.5+9.2)/(2)=16.9


Area = √(16.9\left(16.9-12\right)\left(16.9-12.8\right)\left(16.9-9.2\right))\\\\=51\:unit^2

Best Regards!

User Sam Gilbert
by
7.5k points
4 votes

Answer:

53 sq.units

solution,

A(-5,7)--->(X1,y1)

B(-4,-5)-->(x2,y2)

C(4,5)--->(X3,y3)

Now,

Area of triangle:


(1)/(2) (x1(y2 - y3) + x2(y3 - y1) + x3(y1 - y2) \\ = (1)/(2) ( - 5( - 5 - 5) + ( - 4)(5 - 7) + 4(7 - ( - 5) \\ = (1)/(2) ( - 5 * ( - 10) + ( - 4) * ( - 2) + 4 * 12) \\ = (1)/(2) (50 + 8 + 48) \\ = (1)/(2) * 106 \\ = (106)/(2) \\ = 53

hope this helps...

Good luck on your assignment..

User Joel Falcou
by
7.4k points
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