Question 1

Find the midpoint of the line segment with these endpoints. (2, -3) and (4, -1)

Question 2

Answer:

$\huge{ \fbox{ \sf{( \: 3 \: , \: - 2)}}}$

Explanation:

$\star{ \: \sf{ \: Let \: the \: points \: be \: A \: and \: B}}$

$\star{ \sf{ \: Let \: A(2, -3) \: be \: (x1 \:, y1) \: and \: B(4, -1) \: be \: (x2 ,\: y2)}}$

$\underline{ \sf{Finding \: the \: midpoint}} :$

$\boxed{ \sf{Midpoint = ( (x1 + x2)/(2) \: , \: (y1 + y2)/(2)) }}$

$\mapsto{ \sf{Midpoint = ( (2 + 4)/(2) \: , \: ( - 3 + ( - 1))/(2) }})$

$\underline{ \text{Remember!}} : \sf{( + ) * ( - ) = ( - )}$

$\mapsto{ \sf{Midpoint = ( (2 + 4)/(2) \: , \: ( - 3 - 1)/(2) }})$

$\underline{ \text{Remember!}} : \sf{The \: negative \: integers \: are \: always \: added \: but \: posses \: the \: negative( - ) \: sign.}$

$\mapsto{ \sf{Midpoint = ( (6)/(2) \: , \: ( - 4)/(2) }})$

$\underline{ \text{Remember!}} : \sf{Dividing \: a \: negative \: integer \: by \: a \: positive \: integer\: gives \: a \: negative \: integer.}$

$\mapsto{ \boxed{ \sf{Midpoint = ( \: 3 \: , \: - 2})}}$

Hope I helped!

Best regards! :D

~TheAnimeGirl

Question 3

The midpoint of the line segment is (3,-2)

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