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In this video, let's discuss perpendicular bicyclers of a triangle.

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Let me take a triangle over here.

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This is Triangle ABC.

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Now let's identify the midpoint of B.C..

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This is the midpoint of Sayyid, B.C..

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Now, let me draw a perpendicular line to B.C. through this midpoint.

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That is what we call the perpendicular sector of Sayyid, B.C., So the perpendicular bicycle is a bicycle,

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that is if this is point B or is equal to Ossy and it is perpendicular to the side.

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So that's why we call this a perpendicular bicycle.

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All right.

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Now let's draw the remaining perpendicular bicyclers.

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That is the perpendicular bicycle of side and the perpendicular bisected of side AC.

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You can see that these intersect at a point and this point of intersection is what we call the sock'em

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center of the triangle.

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Now you can draw a circle that touches the three vertices of the triangle.

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Let's draw that with center as the circle center.

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So in this way, we have circumscribed and circle around this triangle and that's what we learn about

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Perpendicular Besiktas.

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This is called the Saken Sakher.

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All right, and this point over here, you can see, is making an equal distance from the tree, what

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is right that has to be sold because the center is the sock'em center and it is touching the tree,

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what it says.

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Right.

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Therefore, all is equal to all be equal to or C is equal to the radius.

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And that radius is called this sock'em radius of the circle circle.

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Remember, the center of the circle circle is a circle center.

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The radius of the circle circle is called the circle radius and this circle circle circle.

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And we get the circle center by finding the point of intersection of the perpendicular besiktas.