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Let's revise what we have learned so far.

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We have discussed altitude's medians, perpendicular bicyclers and angled bicyclers.

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Now all the dudes are the heights median is the line.

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Joining a vertex to the midpoint of the opposite side and perpendicular by sector of a side divides

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the side into two equal halves and also is perpendicular to that side.

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Right.

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And the angle by sector is the sector of one of the angles of that triangle.

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All right.

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Now we have seen that the altitude's the three altitude's meet at the auto center.

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We have seen that the three medians of a triangle meet at the centroid.

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We have seen that the three perpendicular bicyclers of a triangle meet at the Sock'Em Center.

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And we have seen that the triangle bicyclers meet at the in center.

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All right.

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Now, we have seen that the centroid divides the oilor line in the ratio.

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Two is two.

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One, right.

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So what is the order line?

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It's the line that's joining the auto center and the circle center.

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And we have seen that these three centres will be in one lane.

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Right.

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The auto center, central and circle center of a triangle will be in one lane.

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Now, that's called the alternate lane.

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Now, we have seen that if the distance between the auto center and centroid is X and if the distance

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between the centroid and Sock'Em Center is Y, then.

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X divided by Y will give you two by one all.

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We have also seen that with the Sock'Em Center as the radius, you can draw a circle that's circumscribing

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the triangle.

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Right.

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And that circle is called the Circle Circle.

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And the radius of that circle is called a circle radius.

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Similarly, using the inner center, you can inscribe a circle inside a triangle.

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Right.

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And that circle is called the inner circle.

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And the radius of that circle is called the in radius.

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Remember, what we have learned about the oilor line is true for a non equilateral triangle, because

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in the case of an equilateral triangle, the auto center centroid Cellcom Center and in center coincide.