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Condition for Three Vectors to Form a Triangle

If x and y ar...

Question

If $\to x$ and $\to y$ are two non-parallel vectors and $A B C$ is a triangle with side lengths $a, b$ and $c$ satisfying $(20 a - 15 b) \to x + (15 b - 12 c) \to y + (12 c - 20 a) (\to x \times \to y) = \to 0$ , then triangle $A B C$ is

A

an acute-angled triangle

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B

an obtuse-angled triangle

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C

a right-angled triangle

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D

an isosceles triangle

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Solution

The correct option is C a right-angled triangle
Since, $\to x, \to y$ and $\to x \times \to y$ are linearly independent, we have
$20 a - 15 b = 15 b - 12 c = 12 c - 20 a = 0$
$\Rightarrow \frac{a}{3} = \frac{b}{4} = \frac{c}{5}$
$\Rightarrow c^{2} = a^{2} + b^{2}$
Hence, $△ A B C$ is right angled.

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Similar questions

\to x

\to y

are two non-parallel vectors and

A B C

is a triangle with side lengths

a, b

c

(20 a - 15 b) \to x + (15 b - 12 c) \to y + (12 c - 20 a) (\to x \times \to y) = \to 0

, then triangle

A B C

\to x

\to y

are two non-parallel vectors and

A B C

is a triangle with side lengths

a, b

c

(20 a - 15 b) \to x + (15 b - 12 c) \to y + (12 c - 20 a) (\to x \times \to y) = \to 0

, then triangle

A B C

\to x

\to y

are two non-collinear vectors and

A B C

is a triangle with sides

a, b, c

(20 a - 15 b) \to x + (15 b - 12 c) \to y + (12 c - 20 a)

(\to x \times \to y) = \to 0

, then the triangle

A B C

¯ x

¯ y

are two non-collinear vectors and ABC is a triangle with sides a, b, c satisfying

(20 a - 15 b) ¯ x + (15 b - 20 c) ¯ y + (12 c - 20 a) (¯ x \times ¯ y) = ¯ 0

, then the triangle ABC is,

\to x

\to y

are two non-collinear vectors and

A B C

is a triangle with side lengths

a, b

c

(20 a - 15 b) \to x + (15 b - 12 c) \to y + (12 c - 20 a) (\to x \times \to y) = \to 0

, then triangle

A B C

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Condition for Three Vectors to Form a Triangle

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