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Is the triangle obtuse, acute, equilateral or right?

Is the triangle obtuse, acute, equilateral or right?-example-1
User Janah
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2 Answers

6 votes
Obtuse Bc Ik it is so ye lol
User Gpap
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9514 1404 393

Answer:

obtuse

Explanation:

The law of cosines tells you ...

b² = a² +c² -2ac·cos(B)

Substituting for a²+c² using the given equation, we have ...

b² = b²·cos(B)² -2ac·cos(B)

We can subtract b² to get a quadratic in standard form for cos(B).

b²·cos(B)² -2ac·cos(B) -b² = 0

Solving this using the quadratic formula gives ...


\cos(B)=(-(-2ac)\pm√((-2ac)^2-4(b^2)(-b^2)))/(2b^2)\\\\\cos(B)=(ac)/(b^2)\pm\sqrt{\left((ac)/(b^2)\right)^2+1}

The fraction ac/b² is always positive, so the term on the right (the square root) is always greater than 1. The value of cos(B) cannot be greater than 1, so the only viable value for cos(B) is ...


\cos(B)=(ac)/(b^2)-\sqrt{\left((ac)/(b^2)\right)^2+1}

The value of the radical is necessarily greater than ac/b², so cos(B) is necessarily negative. When cos(B) < 0, B > 90°. The triangle is obtuse.

User Dhiwakar Ravikumar
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