Question
Q%0D%0A𝑄%0D%0A is the midpoint of line segment PM¯¯¯¯¯¯¯¯¯%0D%0A𝑃%0D%0A𝑀%0D%0A¯%0D%0A. Find midpoint Q%0D%0A𝑄%0D%0A.%0D%0A%0D%0A(1 point)%0D%0AResponses%0D%0A%0D%0AQ%0D%0A𝑄%0D%0A is located at (1,−6)%0D%0A(%0D%0A1%0D%0A,%0D%0A−%0D%0A6%0D%0A)%0D%0A.%0D%0Aupper Q is located at left parenthesis 1 comma negative 6 right parenthesis .%0D%0A%0D%0AQ%0D%0A𝑄%0D%0A is located at (0.5,0)%0D%0A(%0D%0A0.5%0D%0A,%0D%0A0%0D%0A)%0D%0A.%0D%0Aupper Q is located at left parenthesis 0.5 comma 0 right parenthesis .%0D%0A%0D%0AQ%0D%0A𝑄%0D%0A is located at (1,0)%0D%0A(%0D%0A1%0D%0A,%0D%0A0%0D%0A)%0D%0A.%0D%0Aupper Q is located at left parenthesis 1 comma 0 right parenthesis .%0D%0A%0D%0AQ%0D%0A𝑄%0D%0A is located at (1,6)%0D%0A(%0D%0A1%0D%0A,%0D%0A6%0D%0A)%0D%0A.
Answers
GPT-4o mini
To find the midpoint \( Q \) of a line segment defined by its endpoints \( P \) and \( M \), you can use the midpoint formula:
\[
Q\left(x_Q, y_Q\right) = \left( \frac{x_P + x_M}{2}, \frac{y_P + y_M}{2} \right)
\]
However, the coordinates of points \( P \) and \( M \) are not provided in your question, so we can't calculate the exact midpoint \( Q \) without that information.
If you can provide the coordinates of points \( P \) and \( M \), I would be happy to calculate the midpoint for you!
\[
Q\left(x_Q, y_Q\right) = \left( \frac{x_P + x_M}{2}, \frac{y_P + y_M}{2} \right)
\]
However, the coordinates of points \( P \) and \( M \) are not provided in your question, so we can't calculate the exact midpoint \( Q \) without that information.
If you can provide the coordinates of points \( P \) and \( M \), I would be happy to calculate the midpoint for you!