Math, asked by maddybang8, 5 months ago

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If a+b+= 7, abc=-72,
ab^2 +ba²+bc^2+cb^2+ac^2+a²c=
-246, then a² +b²+c^=?​

Answers

Answered by samarthgoel102
4

Answer:

method 1 :-

three points be collinear when area of triangle formed by meeting of all three points = 0

The points A(a , a²) , B( b, b²) and C( c, c²) are given.

so, area of triangle ABC = 1/2[a( b² - c²) + b(c² - a²) + c(a² - b²)]

= 1/2[ab² - ac² + bc² - ba² + ca² - cb² ]

= 1/2 [ ab(b - a) + bc(c - b) + ca(a - c)]

Here it is clear that area of triangle be zero when a = b = c . but a ≠ b ≠ c , so, area of triangle can't be zero. That's why all the given three points are never be collinear.

method 2 :-

points A , B , C be collinear when ,

slope of AB = slope of BC = slope of CA

slope of AB = (b² - a²)/(b - a) = (b-a)(b + a)/(b-a)

= a + b

similarly,

slope of BC = (c² - b²)/(c - b) = b + c

slope of CA = c + a

here it is clear that ,

slope of AB ≠ slope of BC ≠ slope of CA

so, points A, B , C are never be collinear .

Step-by-step explanation:

Answered by samarthgoel103
1

Answer:

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Step-by-step explanation:

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