Answer:
One point of Median will be at B and another will join Mid-Point of AC
Mid Point of AC =
= (4,4)
Distance =
= 7.61 units
If you find my answer good enough kindly mark it as Brainliest.
Answer: One point of Median will be at B and another will join Mid-Point of AC
Mid Point of AC = \frac{ (9 - 1)}{2} \: and \: \frac{( - 2 + 10)}{2}
Distance = \sqrt{ {(4 - ( - 3))}^{2} + {(4 - 7)}^{2} }
= \sqrt{ {7}^{2} + { - 3}^{2} }
= \sqrt{49 + 9}
= \sqrt{58}
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Answers & Comments
Answer:
One point of Median will be at B and another will join Mid-Point of AC
Mid Point of AC =![\frac{ (9 - 1)}{2} \: and \: \frac{( - 2 + 10)}{2} \frac{ (9 - 1)}{2} \: and \: \frac{( - 2 + 10)}{2}](https://tex.z-dn.net/?f=%20%5Cfrac%7B%20%289%20-%201%29%7D%7B2%7D%20%5C%3A%20%20and%20%5C%3A%20%20%5Cfrac%7B%28%20-%202%20%2B%2010%29%7D%7B2%7D%20)
= (4,4)
Distance =![\sqrt{ {(4 - ( - 3))}^{2} + {(4 - 7)}^{2} } \sqrt{ {(4 - ( - 3))}^{2} + {(4 - 7)}^{2} }](https://tex.z-dn.net/?f=%20%5Csqrt%7B%20%7B%284%20-%20%28%20-%203%29%29%7D%5E%7B2%7D%20%2B%20%20%7B%284%20-%207%29%7D%5E%7B2%7D%20%20%7D%20)
= 7.61 units
If you find my answer good enough kindly mark it as Brainliest.
Answer: One point of Median will be at B and another will join Mid-Point of AC
Mid Point of AC = \frac{ (9 - 1)}{2} \: and \: \frac{( - 2 + 10)}{2}
= (4,4)
Distance = \sqrt{ {(4 - ( - 3))}^{2} + {(4 - 7)}^{2} }
= \sqrt{ {7}^{2} + { - 3}^{2} }
= \sqrt{49 + 9}
= \sqrt{58}
= 7.61 units